d-p-q-r-tests.Rout.save

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> ####	d|ensity
> ####	p|robability (cumulative)
> ####	q|uantile
> ####	r|andom number generation
> ####
> ####	Functions for  ``d/p/q/r''
> 
> .ptime <- proc.time()
> F <- FALSE
> T <- TRUE
> 
> ###-- these are identical in ./arith-true.R ["fixme": use source(..)]
> opt.conformance <- 0
> Meps <- .Machine $ double.eps
> xMax <- .Machine $ double.xmax
> options(rErr.eps = 1e-30)
> rErr <- function(approx, true, eps = .Options$rErr.eps)
+ {
+     if(is.null(eps)) { eps <- 1e-30; options(rErr.eps = eps) }
+     ifelse(Mod(true) >= eps,
+ 	   1 - approx / true, # relative error
+ 	   true - approx)     # absolute error (e.g. when true=0)
+ }
> ## Numerical equality: Here want "rel.error" almost always:
> All.eq <- function(x,y)
+     all.equal.numeric(x,y, tolerance= 64*.Machine$double.eps,
+                       scale = {r <- mean(abs(x),na.rm=TRUE)
+                                if(r > 0) r else 0})
> 
> if(!interactive())
+     .Random.seed <- c(0,rep(7654, 3))
> 
> ## The prefixes of ALL the PDQ & R functions
> PDQRinteg <- c("binom", "geom", "hyper", "nbinom", "pois","signrank","wilcox")
> PDQR <- c(PDQRinteg, "beta", "cauchy", "chisq", "exp", "f", "gamma",
+ 	  "lnorm", "logis", "norm", "t","unif","weibull")
> PQonly <- c("tukey")
> 
> ###--- Discrete Distributions --- Consistency Checks  pZZ = cumsum(dZZ)
> 
> ##for(pre in PDQRinteg) { n <- paste("d",pre,sep=""); cat(n,": "); str(get(n))}
> 
> ##__ 1. Binomial __
> 
> ## Cumulative Binomial '==' Cumulative F :
> ## Abramowitz & Stegun, p.945-6;  26.5.24  AND	26.5.28 :
> n0 <- 50; n1 <- 16; n2 <- 20; n3 <- 8
> for(n in rbinom(n1, size = 2*n0, p = .4)) {
+     cat("n=",n,": ")
+     for(p in c(0,1,rbeta(n2, 2,4))) {
+ 	cat(".")
+ 	for(k in rbinom(n3, size = n,  prob = runif(1))) {
+ 	    ## For X ~ Bin(n,p), compute 1 - P[X > k] = P[X <= k] in three ways:
+ 	    tst1 <- all.equal(	     pbinom(0:k, size = n, prob = p),
+ 			      cumsum(dbinom(0:k, size = n, prob = p)))
+ 	    tst <- all.equal(if(k==n || p==0) 1 else
+ 			     pf((k+1)/(n-k)*(1-p)/p, df1=2*(n-k), df2=2*(k+1)),
+ 			     sum(dbinom(0:k, size = n, prob = p)))
+ 	    if(!isTRUE(tst1) || !isTRUE(tst)) {
+ 		cat("n=", n,"; p =",format(p),".  k =",k)
+ 		if(!isTRUE(tst1)) cat("; tst1=",tst1)
+ 		if(!isTRUE(tst )) cat("; tst=", tst)
+ 		cat("\n")
+ 	    }
+ 	}
+     }
+     cat("\n")
+ }
n= 45 : ......................
n= 35 : ......................
n= 32 : ......................
n= 46 : ......................
n= 42 : ......................
n= 42 : ......................
n= 35 : ......................
n= 46 : ......................
n= 42 : ......................
n= 33 : ......................
n= 33 : ......................
n= 47 : ......................
n= 37 : ......................
n= 34 : ......................
n= 51 : ......................
n= 48 : ......................
> 
> ##__ 2. Geometric __
> for(pr in seq(1e-10,1,len=15)) { # p=0 is not a distribution
+     print(All.eq((dg <- dgeom(0:10, pr)),
+ 		 pr * (1-pr)^(0:10)))
+     print(All.eq(cumsum(dg), pgeom(0:10, pr)))
+ }
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
> 
> ##__ 3. Hypergeometric __
> 
> m <- 10; n <- 7
> for(k in 2:m) {
+     x <- 0:(k+1)
+     print(All.eq(phyper(x, m, n, k), cumsum(dhyper(x, m, n, k))))
+ }
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
> 
> ##__ 4. Negative Binomial __
> 
> ## PR #842
> for(size in seq(0.8,2, by=.1))
+     print(all.equal(cumsum(dnbinom(0:7, size, .5)),
+ 			   pnbinom(0:7, size, .5)))
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
> All.eq(pnbinom(c(1,3), .9, .5), c(0.777035760338812, 0.946945347071519))
[1] TRUE
> 
> ##__ 5. Poisson __
> 
> all(dpois(0:5,0)	   == c(1, rep(0,5)))
[1] TRUE
> all(dpois(0:5,0, log=TRUE) == c(0, rep(-Inf, 5)))
[1] TRUE
> 
> ## Cumulative Poisson '==' Cumulative Chi^2 :
> ## Abramowitz & Stegun, p.941 :	 26.4.21 (26.4.2)
> n1 <- 20; n2 <- 16
> for(lambda in rexp(n1))
+     for(k in rpois(n2, lambda)) {
+ 	tst <- all.equal(1 - pchisq(2*lambda, 2*(1+ 0:k)),
+ 			 pp <- cumsum(dpois(0:k, lambda=lambda)), tol= 100*Meps)
+ 	if(!isTRUE(tst))
+ 	    cat("lambda=", format(lambda),".  k =",k, " --> tst=", tst,"\n")
+ 	tst2 <- all.equal(pp, ppois(0:k, lambda=lambda), tol = 100*Meps)
+ 	if(!isTRUE(tst2))
+ 	    cat("lambda=", format(lambda),".  k =",k, " --> tst2=", tst2,"\n")
+ 	tst3 <- all.equal(1 - pp, ppois(0:k, lambda=lambda, lower.tail=FALSE))
+ 	if(!isTRUE(tst3))
+ 	    cat("lambda=", format(lambda),".  k =",k, " --> tst3=", tst3,"\n")
+     }
> 
> 
> ##__ 6. SignRank __
> for(n in rpois(32, lam=8)) {
+     x <- -1:(n + 4)
+     if(!isTRUE(eq <- All.eq(psignrank(x, n), cumsum(dsignrank(x, n)))))
+         print(eq)
+ }
> 
> ##__ 7. Wilcoxon (symmetry & cumulative) __
> is.sym <- TRUE
> for(n in rpois(5, lam=6))
+     for(m in rpois(15, lam=8)) {
+ 	x <- -1:(n*m + 1)
+ 	fx <- dwilcox(x, n, m)
+ 	Fx <- pwilcox(x, n, m)
+ 	is.sym <- is.sym & all(fx == dwilcox(x, m, n))
+ 	if(!isTRUE(eq <- All.eq(Fx, cumsum(fx))))
+             print(eq)
+     }
> is.sym
[1] TRUE
> 
> 
> ###-------- Continuous Distributions ----------
> 
> ##---  Gamma (incl. central chi^2) Density :
> x <- round(rgamma(100, shape = 2),2)
> for(sh in round(rlnorm(30),2)) {
+     Ga <- gamma(sh)
+     for(sig in round(rlnorm(30),2)) {
+ 	tst <- all.equal((d1 <- dgamma(	 x,   shape = sh, scale = sig)),
+ 			 (d2 <- dgamma(x/sig, shape = sh, scale = 1) / sig),
+ 			 tol = 1e-14)## __ad interim__ was 1e-15
+ 	if(!isTRUE(tst))
+ 	    cat("ERROR: dgamma() doesn't scale:",tst,"\n",
+ 		"  x =", formatC(x),"\n	 shape,scale=",formatC(c(sh, sig)),"\n")
+ 	tst <- All.eq(d1, (d3 <- 1/(Ga * sig^sh) * x^(sh-1) * exp(-x/sig)))
+ 	if(!isTRUE(tst))
+ 	    cat("NOT Equal:",tst,"\n x =", formatC(x),
+ 		"\n  shape,scale=",formatC(c(sh, sig)),"\n")
+     }
+ }
> pgamma(1,Inf,scale=Inf) == 0
[1] TRUE
> ## Also pgamma(Inf,Inf) == 1 for which NaN was slightly more appropriate
> all(is.nan(c(pgamma(Inf,  1,scale=Inf),
+              pgamma(Inf,Inf,scale=Inf))))
[1] TRUE
Warning messages:
1: NaNs produced in: pgamma(q, shape, scale, lower.tail, log.p) 
2: NaNs produced in: pgamma(q, shape, scale, lower.tail, log.p) 
> scLrg <- c(2,100, 1e300*c(.1, 1,10,100), 1e307, xMax, Inf)
> stopifnot(pgamma(Inf, 1, scale=xMax) == 1,
+           pgamma(xMax,1, scale=Inf) == 0,
+           all.equal(pgamma(1e300, 2, scale= scLrg, log=TRUE),
+                     c(0, 0, -0.000499523968713701, -1.33089326820406,
+                       -5.36470502873211, -9.91015144019122,
+                       -32.9293385491433, -38.707517174609, -Inf), tol=2e-15)
+           )
> 
> p <- 7e-4; df <- 0.9
> abs(1-c(pchisq(qchisq(p, df),df)/p, # was 2.31e-8 for R <= 1.8.1
+         pchisq(qchisq(1-p, df,lower=FALSE),df,lower=FALSE)/(1-p),# was 1.618e-11
+         pchisq(qchisq(log(p), df,log=TRUE),df, log=TRUE)/log(p), # was 3.181e-9
+         pchisq(qchisq(log(1-p),df,log=T,lower=F),df, log=T,lower=F)/log(1-p),
+         )# 32b-i386: (2.2e-16, 0,0, 3.3e-16); Opteron: (2.2e-16, 0,0, 2.2e-15)
+     ) < 1e-14
[1] TRUE TRUE TRUE TRUE
> 
> ##-- non central Chi^2 :
> xB <- c(2000,1e6,1e50,Inf)
> for(df in c(0.1, 1, 10))
+     for(ncp in c(0, 1, 10, 100)) stopifnot(pchisq(xB, df=df, ncp=ncp) == 1)
> all.equal(qchisq(0.025,31,ncp=1,lower.tail=FALSE),# inf.loop PR#875
+           49.7766246561514, tol= 1e-11)
[1] TRUE
> for(df in c(0.1, 0.5, 1.5, 4.7, 10, 20,50,100)) {
+     cat("df =", formatC(df, wid=3))
+     xx <- c(10^-(5:1), .9, 1.2, df + c(3,7,20,30,35,38))
+     pp <- pchisq(xx, df=df, ncp = 1) #print(pp)
+     dtol <- 1e-12 *(if(2 < df && df <= 50) 64 else if(df > 50) 20000 else 501)
+     print(all.equal(xx, qchisq(pp, df=df, ncp=1), tol = dtol))# TRUE
+     ##or print(mapply(rErr, xx, qchisq(pp, df=df,ncp=1)), digits = 3)
+ }
df = 0.1[1] TRUE
df = 0.5[1] TRUE
df = 1.5[1] TRUE
df = 4.7[1] TRUE
df =  10[1] TRUE
df =  20[1] TRUE
df =  50[1] TRUE
df = 100[1] TRUE
> 
> ## p ~= 1 (<==> 1-p ~= 0) -- gave infinite loop in R <= 1.8.1 -- PR#6421
> psml <- 2^-(10:54)
> q0 <- qchisq(psml,    df=1.2, ncp=10, lower.tail=FALSE)
> q1 <- qchisq(1 -psml, df=1.2, ncp=10)
> p0 <- pchisq(q0, df=1.2, ncp=10, lower.tail=FALSE)
> p1 <- pchisq(q1, df=1.2, ncp=10, lower.tail=FALSE)
> iO <- 1:10
> all.equal(q0[iO], q1[iO])
[1] TRUE
> all.equal(p0[iO], psml[iO], tol = 0.08)# bad tol (0.0744 on 386-Linux).
[1] TRUE
> 
> ##--- Beta (need more):
> 
> ## big a & b (PR #643)
> summary(a <- rlnorm(20, 5.5))
   Min. 1st Qu.  Median    Mean 3rd Qu.    Max. 
  27.65  105.20  190.50  310.50  322.00 1611.00 
> summary(b <- rlnorm(20, 6.5))
   Min. 1st Qu.  Median    Mean 3rd Qu.    Max. 
  187.9   346.8   630.2  1281.0   978.0  9382.0 
> pab <- expand.grid(seq(0,1,by=.1), a, b)
> p <- pab[,1]; a <- pab[,2]; b <- pab[,3]
> all.equal(dbeta(p,a,b), exp(pab <- dbeta(p,a,b, log = TRUE)), tol = 1e-11)
[1] TRUE
> sample(pab, 50)
 [1]          -Inf -4.338148e+01          -Inf -3.321764e+02 -5.222040e+01
 [6] -2.302052e+03 -6.743669e+03          -Inf -5.069544e+02          -Inf
[11] -5.995978e+02 -7.505186e+00 -2.086599e+01          -Inf -3.287371e+02
[16] -4.161389e+02 -2.995488e+02 -6.933932e+01 -1.583166e+02 -1.557598e+01
[21]  9.825994e-01 -1.883283e+04 -6.418225e+02  1.741584e+00 -6.910231e+02
[26] -1.224343e+03 -1.974485e+01 -1.324279e+03 -2.013099e+03 -4.333847e+01
[31]          -Inf -1.087940e+04 -9.095702e+00 -5.083759e+03          -Inf
[36] -2.054621e+03 -1.309311e+02 -9.883952e+01 -1.685633e+02 -5.312428e+01
[41] -3.565202e+00 -1.790596e+02          -Inf -4.265242e+03          -Inf
[46] -2.259480e+01 -9.688007e+02 -6.797130e+02 -5.032581e+02 -2.174204e+03
> 
> 
> ##--- Normal (& Lognormal) :
> 
> qnorm(0) == -Inf && qnorm(-Inf, log = TRUE) == -Inf
[1] TRUE
> qnorm(1) ==  Inf && qnorm(0, log = TRUE) == Inf
[1] TRUE
> 
> is.nan(qnorm(1.1)) &&
+ is.nan(qnorm(-.1)) # + warn
[1] TRUE
Warning messages:
1: NaNs produced in: qnorm(p, mean, sd, lower.tail, log.p) 
2: NaNs produced in: qnorm(p, mean, sd, lower.tail, log.p) 
> 
> x <- c(-Inf, -1e100, 1:6, 1e200, Inf)
> rbind(d.s0 =dnorm(x,3,s=0),   p.s0 = pnorm(x,3,s=0),
+       d.sI =dnorm(x,3,s=Inf), p.sI = pnorm(x,3,s=Inf))
     [,1] [,2] [,3] [,4] [,5] [,6] [,7] [,8] [,9] [,10]
d.s0    0  0.0  0.0  0.0  Inf  0.0  0.0  0.0  0.0     0
p.s0    0  0.0  0.0  0.0  1.0  1.0  1.0  1.0  1.0     1
d.sI    0  0.0  0.0  0.0  0.0  0.0  0.0  0.0  0.0     0
p.sI    0  0.5  0.5  0.5  0.5  0.5  0.5  0.5  0.5     1
> 
> ## 3 Test data from Wichura (1988) :
> all.equal(qnorm(c( 0.25,  .001,	 1e-20)),
+ 	  c(-0.6744897501960817, -3.090232306167814, -9.262340089798408),
+ 	  tol = 1e-15)
[1] TRUE
> # extreme tail -- available on log scale only:
> all.equal(qnorm(-1e5, log = TRUE), -447.1974945)
[1] TRUE
> 
> z <- rnorm(1000); all.equal(pnorm(z),  1 - pnorm(-z), tol= 1e-15)
[1] TRUE
> z <- c(-Inf,Inf,NA,NaN, rt(1000, df=2))
> z.ok <- z > -37.5 | !is.finite(z)
> for(df in 1:10) if(!isTRUE(all.equal(pt(z, df), 1 - pt(-z,df), tol= 1e-15)))
+     cat("ERROR -- df = ", df, "\n")
> All.eq(pz <- pnorm(z), 1 - pnorm(z, lower=FALSE))
[1] TRUE
> All.eq(pz,		 pnorm(-z, lower=FALSE))
[1] TRUE
> All.eq(log(pz[z.ok]),  pnorm(z[z.ok], log=TRUE))
[1] TRUE
> y <- seq(-70,0, by = 10)
> cbind(y, "log(pnorm(y))"= log(pnorm(y)), "pnorm(y, log=T)"= pnorm(y, log=TRUE))
       y log(pnorm(y)) pnorm(y, log=T)
[1,] -70          -Inf   -2455.1676378
[2,] -60          -Inf   -1805.0135607
[3,] -50          -Inf   -1254.8313611
[4,] -40          -Inf    -804.6084420
[5,] -30  -454.3212440    -454.3212440
[6,] -20  -203.9171554    -203.9171554
[7,] -10   -53.2312852     -53.2312852
[8,]   0    -0.6931472      -0.6931472
> y <- c(1:15, seq(20,40, by=5))
> cbind(y, "log(pnorm(y))"= log(pnorm(y)), "pnorm(y, log=T)"= pnorm(y, log=TRUE),
+       "log(pnorm(-y))"= log(pnorm(-y)), "pnorm(-y, log=T)"= pnorm(-y, log=TRUE))
       y log(pnorm(y)) pnorm(y, log=T) log(pnorm(-y)) pnorm(-y, log=T)
 [1,]  1 -1.727538e-01   -1.727538e-01      -1.841022        -1.841022
 [2,]  2 -2.301291e-02   -2.301291e-02      -3.783184        -3.783184
 [3,]  3 -1.350810e-03   -1.350810e-03      -6.607726        -6.607726
 [4,]  4 -3.167174e-05   -3.167174e-05     -10.360101       -10.360101
 [5,]  5 -2.866516e-07   -2.866516e-07     -15.064998       -15.064998
 [6,]  6 -9.865877e-10   -9.865876e-10     -20.736769       -20.736769
 [7,]  7 -1.279865e-12   -1.279813e-12     -27.384307       -27.384307
 [8,]  8 -6.661338e-16   -6.220961e-16     -35.013437       -35.013437
 [9,]  9  0.000000e+00   -1.128588e-19     -43.628149       -43.628149
[10,] 10  0.000000e+00   -7.619853e-24     -53.231285       -53.231285
[11,] 11  0.000000e+00   -1.910660e-28     -63.824934       -63.824934
[12,] 12  0.000000e+00   -1.776482e-33     -75.410673       -75.410673
[13,] 13  0.000000e+00   -6.117164e-39     -87.989720       -87.989720
[14,] 14  0.000000e+00   -7.793537e-45    -101.563034      -101.563034
[15,] 15  0.000000e+00   -3.670966e-51    -116.131385      -116.131385
[16,] 20  0.000000e+00   -2.753624e-89    -203.917155      -203.917155
[17,] 25  0.000000e+00  -3.056697e-138    -316.639408      -316.639408
[18,] 30  0.000000e+00  -4.906714e-198    -454.321244      -454.321244
[19,] 35  0.000000e+00  -1.124911e-268    -616.975101      -616.975101
[20,] 40  0.000000e+00    0.000000e+00           -Inf      -804.608442
> ## Symmetry:
> y <- c(1:50,10^c(3:10,20,50,150,250))
> y <- c(-y,0,y)
> for(L in c(FALSE,TRUE))
+     stopifnot(identical(pnorm(-y, log= L),
+ 			pnorm(+y, log= L, lower=FALSE)))
> 
> ## Log norm
> All.eq(pz, plnorm(exp(z)))
[1] TRUE
> 
> 
> ###==========  p <-> q	Inversion consistency =====================
> ok <- 1e-5 < pz & pz < 1 - 1e-5
> all.equal(z[ok], qnorm(pz[ok]), tol= 1e-12)
[1] TRUE
> 
> ###===== Random numbers -- first, just output:
> 
> .Random.seed <- c(0, 17292, 29447, 24113)
> n <- 20
> ## for(pre in PDQR) { n <- paste("r",pre,sep=""); cat(n,": "); str(get(n))}
> (Rbeta	  <- rbeta    (n, shape1 = .8, shape2 = 2) )
 [1] 0.0009459396 0.0749569119 0.7969897349 0.1173196499 0.2400710007
 [6] 0.1318767829 0.8277537923 0.0359498142 0.2403329282 0.0372784791
[11] 0.3759311413 0.3581043996 0.2895229973 0.6005864534 0.1833902168
[16] 0.1198140580 0.0706071423 0.0308280998 0.3591918485 0.4281862391
> (Rbinom	  <- rbinom   (n, size = 55, prob = pi/16) )
 [1] 12 10 11 13 16  6  5 12 13  9 17 12 14  5  5 13 10 12 16  6
> (Rcauchy  <- rcauchy  (n, location = 12, scale = 2) )
 [1] 34.263018 12.540399 16.802259 11.789490 14.154479 10.462895 12.540308
 [8] 12.876666 12.537513 11.977077 11.807015 12.481572 11.954381 10.884467
[15]  9.516357 12.935321 10.946190 14.864709  7.898369 12.782296
> (Rchisq	  <- rchisq   (n, df = 3) )
 [1] 4.1802057 2.2410473 8.3668743 0.7165071 4.6012338 0.7650135 2.1202187
 [8] 0.2898359 0.7288776 2.9159575 3.6549180 0.5587417 4.9140095 7.3809424
[15] 5.6769453 4.9920360 0.6435048 1.1676611 3.5323618 1.6709330
> (Rexp	  <- rexp     (n, rate = 2) )
 [1] 0.07333367 2.13910864 1.32756654 0.11396374 0.07688834 1.38460882
 [7] 0.55605730 0.34815444 0.72538091 0.76093410 0.51832937 0.94396435
[13] 0.11381630 0.65756405 0.29282882 0.04916325 0.18753254 0.76833277
[19] 1.01917017 2.40313307
> (Rf	  <- rf	      (n, df1 = 12, df2 = 6) )
 [1] 1.0482995 7.1506346 0.6029385 2.0461847 1.1851525 4.3366766 0.9365564
 [8] 1.2584864 0.4850872 1.4162343 1.3338440 1.1810704 0.7064808 0.5176781
[15] 2.1632007 2.9753123 1.2178294 1.7130207 0.5469131 0.1313706
> (Rgamma	  <- rgamma   (n, shape = 2, scale = 5) )
 [1]  3.9092623 21.6048906 11.5498513 11.1312817  4.6122029 14.6707798
 [7]  0.9007555 18.9112724  9.4168271 30.4501082  4.5755714  3.2193519
[13] 24.5309039  5.2340905 14.5772699  1.0665363 11.3585753  8.7876520
[19]  8.0414810 14.5654162
> (Rgeom	  <- rgeom    (n, prob = pi/16) )
 [1]  4  2  5  1 10  0  0  1  0 17  0  3  1  3  3  6  0  0  2  1
> (Rhyper	  <- rhyper   (n, m = 40, n = 30, k = 20) )
 [1] 16 11 11 15 11 13 13 12 13 10 10  7 11 14 13  9 14 13 13 11
> (Rlnorm	  <- rlnorm   (n, meanlog = -1, sdlog = 3) )
 [1] 2.210483e-01 1.713584e-01 2.116665e+00 8.205068e+01 3.111700e+00
 [6] 1.883586e+00 4.389370e+00 7.965253e-04 3.287647e-01 4.398008e-01
[11] 3.554842e+00 5.186465e-01 2.313136e+00 2.371949e-01 4.293877e-01
[16] 6.577897e-02 2.645768e-01 9.650592e-02 3.650006e-01 7.501445e-02
> (Rlogis	  <- rlogis   (n, location = 12, scale = 2) )
 [1] 17.000716 14.220747 22.693644 13.270882  4.748890 16.217577 12.780626
 [8]  8.498878  8.300536  9.565866 13.896595 14.425404 17.849150  8.886460
[15]  9.756902 13.182288 15.045885 15.877290 14.773741  9.637214
> (Rnbinom  <- rnbinom  (n, size = 7, prob = .01) )
 [1]  739  668  724  609 1052  404  660  381  321  839  901  292  572  684  883
[16] 1133  503  241  686  787
> (Rnorm	  <- rnorm    (n, mean = -1, sd = 3) )
 [1] -0.61029370  2.35074871  2.49862518  0.28586195  1.56824133  4.02175812
 [7] -3.40412993 -2.65797756 -0.49471250 -1.78043063 -0.54327159  4.38579193
[13]  0.90049087 -0.06666040 -0.03921922  4.00360536  2.36688992  1.44720283
[19]  1.12529029  0.14489413
> (Rpois	  <- rpois    (n, lambda = 12) )
 [1] 11 14 13  7 12  9 19  8  9 12 10 17 11 13 11 12 14  8  6 14
> (Rsignrank<- rsignrank(n, n = 47) )
 [1] 521 680 465 368 636 497 560 439 541 462 459 595 542 699 725 563 419 508 774
[20] 496
> (Rt	  <- rt	      (n, df = 11) )
 [1] -1.73939322 -0.53416778  1.61643746 -0.09307946  0.19731802  0.13339707
 [7] -0.99463560 -1.49665151  1.44899521 -0.72605060 -0.52184248  1.62334863
[13] -1.07413952  0.18925757 -0.08940649 -0.90018242 -0.61911928  1.17444416
[19] -1.06421053 -0.77380129
> ## Rt2 below (to preserve the following random numbers!)
> (Runif	  <- runif    (n, min = .2, max = 2) )
 [1] 1.8416169 0.4703079 0.6841623 0.5048212 1.5620335 0.2738142 1.1573172
 [8] 0.3854089 1.0601866 1.9827946 0.7149722 1.3607511 1.3590662 1.3110552
[15] 1.5017535 1.0945284 1.7290782 0.6057555 1.7500334 1.7121475
> (Rweibull <- rweibull (n, shape = 3, scale = 2) )
 [1] 1.512345 2.645024 1.458062 2.484227 1.263118 2.081812 1.058986 1.104576
 [9] 1.644986 1.985632 2.127461 2.058949 2.524137 1.716619 1.875699 1.433992
[17] 2.362451 2.861329 2.150789 1.239032
> (Rwilcox  <- rwilcox  (n, m = 13, n = 17) )
 [1] 133 103 103  62 117 108  96 102 118 115 110  92 139 126  77  65 127  72 139
[20] 124
> (Rt2	  <- rt	      (n, df = 1.01))
 [1] -0.19162182 -0.80558213  5.34371153  2.97056448 -2.06158935  1.02975367
 [7]  0.02712426 -1.18826124  1.43878831  2.74129680 -0.52293357 -0.17152843
[13] -0.45179010  1.05646571 -0.62321076 -0.12553755  0.36695132 -9.42934145
[19]  0.04081237 -3.70972593
> 
> (Pbeta	  <- pbeta    (Rbeta, shape1 = .8, shape2 = 2) )
 [1] 0.00685142 0.21898139 0.96943981 0.30726448 0.51350239 0.33510112
 [7] 0.97810553 0.12383254 0.51388356 0.12740407 0.68542852 0.66557175
[13] 0.58183279 0.87756637 0.42564683 0.31211434 0.20917242 0.10975854
[19] 0.66680467 0.73943522
> (Pbinom	  <- pbinom   (Rbinom, size = 55, prob = pi/16) )
 [1] 0.72571464 0.47335812 0.60646826 0.82208269 0.96870000 0.06545671
 [7] 0.02841293 0.72571464 0.82208269 0.34018132 0.98484929 0.72571464
[13] 0.89271720 0.02841293 0.02841293 0.82208269 0.47335812 0.72571464
[19] 0.96870000 0.06545671
> (Pcauchy  <- pcauchy  (Rcauchy, location = 12, scale = 2) )
 [1] 0.9714812 0.5840012 0.8743873 0.4666191 0.7618305 0.2914213 0.5839878
 [8] 0.6314968 0.5835731 0.4963519 0.4693803 0.5752128 0.4927407 0.3380482
[15] 0.2157967 0.6392424 0.3456390 0.8059952 0.1444131 0.6186825
> (Pchisq	  <- pchisq   (Rchisq, df = 3) )
 [1] 0.75734885 0.47609135 0.96099212 0.13068538 0.79656374 0.14218428
 [7] 0.45216677 0.03807139 0.13360847 0.59523480 0.69878142 0.09419094
[13] 0.82179683 0.93930223 0.87156985 0.82761876 0.11359536 0.23922949
[19] 0.68341090 0.35658474
> (Pexp	  <- pexp     (Rexp, rate = 2) )
 [1] 0.13641880 0.98613264 0.92971052 0.20381800 0.14253652 0.93728895
 [7] 0.67113719 0.50157835 0.76560834 0.78169633 0.64536236 0.84861495
[13] 0.20358320 0.73156007 0.44326040 0.09364707 0.31275544 0.78490286
[19] 0.86975531 0.99182166
> (Pf	  <- pf	      (Rf, df1 = 12, df2 = 6) )
 [1] 0.493968892 0.987819917 0.214465434 0.804851021 0.560142915 0.958476676
 [7] 0.432468011 0.591675896 0.134821391 0.651135448 0.621437022 0.558309651
[13] 0.285976592 0.156229064 0.823256086 0.904828024 0.574518093 0.737314198
[19] 0.175931308 0.001535476
> (Pgamma	  <- pgamma   (Rgamma, shape = 2, scale = 5) )
 [1] 0.18469983 0.92930080 0.67143844 0.65178456 0.23573834 0.79079896
 [7] 0.01440388 0.89110187 0.56150517 0.98393855 0.23305255 0.13654797
[13] 0.95629013 0.28145838 0.78786294 0.01975953 0.66257119 0.52440798
[19] 0.47774483 0.78748817
> (Pgeom	  <- pgeom    (Rgeom, prob = pi/16) )
 [1] 0.6647753 0.4809591 0.7305965 0.3541459 0.9096893 0.1963495 0.1963495
 [8] 0.3541459 0.1963495 0.9804472 0.1963495 0.5828725 0.3541459 0.5828725
[15] 0.5828725 0.7834938 0.1963495 0.1963495 0.4809591 0.3541459
> (Phyper	  <- phyper   (Rhyper, m = 40, n = 30, k = 20) )
 [1] 0.99744478 0.51295659 0.51295659 0.98680472 0.51295659 0.86627413
 [7] 0.86627413 0.71494883 0.86627413 0.30864260 0.30864260 0.01796063
[13] 0.51295659 0.95139461 0.86627413 0.15132082 0.95139461 0.86627413
[19] 0.86627413 0.51295659
> (Plnorm	  <- plnorm   (Rlnorm, meanlog = -1, sdlog = 3) )
 [1] 0.43258714 0.39949055 0.72014780 0.96426235 0.76168186 0.70691429
 [7] 0.79571003 0.02042329 0.48505472 0.52373190 0.77520644 0.54557496
[13] 0.73001823 0.44184582 0.52055037 0.28304536 0.45625441 0.32778045
[19] 0.49895528 0.29804735
> (Plogis	  <- plogis   (Rlogis, location = 12, scale = 2) )
 [1] 0.92416690 0.75219874 0.99525932 0.65372216 0.02594333 0.89175446
 [7] 0.59635809 0.14797648 0.13590439 0.22845301 0.72077271 0.77077670
[13] 0.94904799 0.17411062 0.24572404 0.64362757 0.82097136 0.87420320
[19] 0.80009214 0.23480185
> (Pnbinom  <- pnbinom  (Rnbinom, size = 7, prob = .01) )
 [1] 0.61736655 0.51299455 0.59632006 0.41950678 0.90402573 0.12140233
 [7] 0.50057859 0.09750529 0.04876502 0.74086686 0.80178090 0.03225449
[13] 0.35983768 0.53748456 0.78532898 0.93731909 0.25190327 0.01316344
[19] 0.54051099 0.68045166
> (Pnorm	  <- pnorm    (Rnorm, mean = -1, sd = 3) )
 [1] 0.5516781 0.8679849 0.8782349 0.6659003 0.8040234 0.9529268 0.2114568
 [8] 0.2902484 0.5668772 0.3973765 0.5605023 0.9636942 0.7367954 0.6221427
[15] 0.6256145 0.9523291 0.8691318 0.7926739 0.7606609 0.6486326
> (Ppois	  <- ppois    (Rpois, lambda = 12) )
 [1] 0.46159733 0.77202453 0.68153563 0.08950450 0.57596525 0.24239216
 [7] 0.97872023 0.15502778 0.24239216 0.57596525 0.34722942 0.93703370
[13] 0.46159733 0.68153563 0.46159733 0.57596525 0.77202453 0.15502778
[19] 0.04582231 0.77202453
> (Psignrank<- psignrank(Rsignrank, n = 47) )
 [1] 0.32789203 0.89007439 0.15011688 0.01887176 0.77676020 0.24256054
 [7] 0.48536796 0.09474662 0.40676506 0.14282568 0.13577317 0.62940572
[13] 0.41083885 0.92356606 0.95623357 0.49790926 0.06352849 0.28016760
[19] 0.98752692 0.23928001
> (Pt	  <- pt	      (Rt,  df = 11) )
 [1] 0.05491642 0.30192660 0.93285384 0.46375705 0.57641129 0.55185574
 [7] 0.17064488 0.08130751 0.91237971 0.24148527 0.30606307 0.93360050
[13] 0.15287884 0.57333111 0.46518298 0.19365307 0.27422273 0.86749203
[19] 0.15501842 0.22767857
> (Pt2	  <- pt	      (Rt2, df = 1.01) )
 [1] 0.43961636 0.28360180 0.94199308 0.89763502 0.14278894 0.75533914
 [7] 0.50864836 0.22193161 0.80750963 0.88965697 0.34628392 0.44582080
[13] 0.36463226 0.75942529 0.32218488 0.46017088 0.61218435 0.03294746
[19] 0.51300870 0.08284141
> (Punif	  <- punif    (Runif, min = .2, max = 2) )
 [1] 0.91200940 0.15017105 0.26897908 0.16934513 0.75668526 0.04100786
 [7] 0.53184287 0.10300496 0.47788145 0.99044142 0.28609568 0.64486175
[13] 0.64392568 0.61725289 0.72319637 0.49696022 0.84948787 0.22541974
[19] 0.86112968 0.84008195
> (Pweibull <- pweibull (Rweibull, shape = 3, scale = 2) )
 [1] 0.3510356 0.9010483 0.3212279 0.8528629 0.2226838 0.6762575 0.1379570
 [8] 0.1550349 0.4267381 0.6241639 0.6998987 0.6641379 0.8660439 0.4686384
[15] 0.5617197 0.3082951 0.8075955 0.9465114 0.7116742 0.2116163
> (Pwilcox  <- pwilcox  (Rwilcox, m = 13, n = 17) )
 [1] 0.82946462 0.38647276 0.38647276 0.02165645 0.61352724 0.46716310
 [7] 0.28170171 0.37078117 0.62921883 0.58162230 0.50000000 0.22852300
[13] 0.88566977 0.74559308 0.08487632 0.02943715 0.75871780 0.05633406
[19] 0.88566977 0.71829829
> 
> dbeta	 (Rbeta, shape1 = .8, shape2 = 2)
 [1] 5.7913365 2.2364651 0.3059074 1.9511551 1.4556855 1.8746068 0.2575917
 [8] 2.6997454 1.4548665 2.6765264 1.0928822 1.1350760 1.3109191 0.6368984
[15] 1.6508280 1.9374717 2.2740086 2.7988135 1.1324661 0.9756421
> dbinom	 (Rbinom, size = 55, prob = pi/16)
 [1] 0.11924639 0.13317680 0.13311013 0.09636804 0.02881210 0.03704378
 [7] 0.01819424 0.11924639 0.09636804 0.11849719 0.01614929 0.11924639
[13] 0.07063452 0.01819424 0.01819424 0.09636804 0.13317680 0.11924639
[19] 0.02881210 0.03704378
> dcauchy	 (Rcauchy, location = 12, scale = 2)
 [1] 0.001274152 0.148326009 0.023524757 0.157411041 0.073667654 0.100055114
 [7] 0.148329389 0.133504054 0.148433568 0.159134039 0.157686757 0.150433150
[13] 0.159072180 0.121390049 0.062607155 0.130593337 0.124570555 0.052153921
[19] 0.030572357 0.138035910
> dchisq	 (Rchisq, df = 3)
 [1] 0.10087621 0.19475936 0.01759333 0.23601129 0.08574365 0.23802581
 [7] 0.20123372 0.18580144 0.23657215 0.15852893 0.12265734 0.22552069
[13] 0.07578172 0.02705295 0.05562044 0.07345850 0.23198007 0.24044408
[19] 0.12820355 0.22364083
> dexp	 (Rexp, rate = 2)
 [1] 1.72716241 0.02773472 0.14057897 1.59236400 1.71492696 0.12542210
 [7] 0.65772563 0.99684330 0.46878331 0.43660735 0.70927528 0.30277010
[13] 1.59283360 0.53687987 1.11347921 1.81270585 1.37448911 0.43019428
[19] 0.26048939 0.01635668
> df	 (Rf, df1 = 12, df2 = 6)
 [1] 0.519937867 0.004371848 0.692823649 0.167468952 0.448061444 0.022237248
 [7] 0.580744146 0.412297607 0.645723076 0.343445106 0.377992320 0.450116704
[13] 0.682397435 0.666844216 0.147593859 0.066212131 0.431848359 0.243311742
[19] 0.680166477 0.051540741
> dgamma	 (Rgamma, shape = 2, scale = 5)
 [1] 0.071548510 0.011482464 0.045859471 0.048056741 0.073342809 0.031205091
 [7] 0.030090422 0.017225367 0.057283478 0.002759218 0.073295320 0.067639298
[13] 0.007261834 0.073497725 0.031591526 0.034466522 0.046858733 0.060624349
[19] 0.064405338 0.031640760
> dgeom	 (Rgeom, prob = pi/16)
 [1] 0.081902787 0.126813148 0.065821212 0.157796399 0.022064895 0.196349541
 [7] 0.196349541 0.157796399 0.196349541 0.004777187 0.196349541 0.101913445
[13] 0.157796399 0.101913445 0.101913445 0.052897247 0.196349541 0.196349541
[19] 0.126813148 0.157796399
> dhyper	 (Rhyper, m = 40, n = 30, k = 20)
 [1] 0.01064006 0.20431399 0.20431399 0.03541012 0.20431399 0.15132529
 [7] 0.15132529 0.20199224 0.15132529 0.15732178 0.15732178 0.01379223
[13] 0.20431399 0.08512048 0.15132529 0.09227084 0.08512048 0.15132529
[19] 0.15132529 0.20431399
> dlnorm	 (Rlnorm, meanlog = -1, sdlog = 3)
 [1] 5.929818e-01 7.512774e-01 5.299802e-02 3.193275e-04 3.317380e-02
 [6] 6.087639e-02 2.153230e-02 2.062527e+01 4.042023e-01 3.018308e-01
[11] 2.810781e-02 2.547247e-01 4.764589e-02 5.546720e-01 3.092876e-01
[16] 1.714756e+00 4.995922e-01 1.247473e+00 3.643290e-01 1.540428e+00
> dlogis	 (Rlogis, location = 12, scale = 2)
 [1] 0.035041221 0.093197897 0.002359104 0.113184749 0.012635138 0.048264223
 [7] 0.120357559 0.063039721 0.058717192 0.088131115 0.100629705 0.088339990
[13] 0.024177951 0.071898055 0.092671867 0.114685561 0.073488693 0.054985983
[19] 0.079972353 0.089834971
> dnbinom	 (Rnbinom, size = 7, prob = .01)
 [1] 0.0013843572 0.0015461270 0.0014240958 0.0016111183 0.0004916298
 [6] 0.0010965512 0.0015593115 0.0009750548 0.0006438980 0.0010814585
[11] 0.0008880238 0.0004914120 0.0016079010 0.0015162429 0.0009432177
[16] 0.0003394350 0.0014949693 0.0002632443 0.0015121979 0.0012444310
> dnorm	 (Rnorm, mean = -1, sd = 3)
 [1] 0.13186348 0.07126843 0.06736890 0.12130968 0.09218225 0.03275978
 [7] 0.09645747 0.11414715 0.13110785 0.12855632 0.13144855 0.02654173
[13] 0.10880369 0.12669831 0.12633298 0.03309267 0.07084041 0.09534418
[19] 0.10346857 0.12364112
> dpois	 (Rpois, lambda = 12)
 [1] 0.11436792 0.09048890 0.10557038 0.04368219 0.11436792 0.08736438
 [7] 0.01613672 0.06552328 0.08736438 0.11436792 0.10483726 0.03832471
[13] 0.11436792 0.10557038 0.11436792 0.11436792 0.09048890 0.06552328
[19] 0.02548128 0.09048890
> dsignrank(Rsignrank, n = 47)
 [1] 0.0037844241 0.0020112978 0.0024569596 0.0004983669 0.0031591482
 [6] 0.0032805288 0.0041778794 0.0017851857 0.0040639142 0.0023773231
[11] 0.0022979400 0.0039702993 0.0040737886 0.0015466398 0.0010084031
[16] 0.0041812581 0.0013244780 0.0035300054 0.0003600738 0.0032566009
> dt	 (Rt, df = 11)
 [1] 0.09076142 0.33444332 0.10857032 0.38815185 0.38180921 0.38622576
 [7] 0.23261963 0.12825909 0.13672995 0.29449489 0.33676702 0.10750499
[13] 0.21435914 0.38245649 0.38829368 0.25458773 0.31753985 0.19196797
[19] 0.21661975 0.28375142
> dunif	 (Runif, min = .2, max = 2)
 [1] 0.5555556 0.5555556 0.5555556 0.5555556 0.5555556 0.5555556 0.5555556
 [8] 0.5555556 0.5555556 0.5555556 0.5555556 0.5555556 0.5555556 0.5555556
[15] 0.5555556 0.5555556 0.5555556 0.5555556 0.5555556 0.5555556
> dweibull (Rweibull, shape = 3, scale = 2)
 [1] 0.5566140 0.2596054 0.5411369 0.3405149 0.4650686 0.5261555 0.3625272
 [8] 0.3865994 0.5817133 0.5556831 0.5093571 0.5339287 0.3200512 0.5871773
[15] 0.5782419 0.5333911 0.4026909 0.1642208 0.5001614 0.4538727
> dwilcox	 (Rwilcox, m = 13, n = 17)
 [1] 0.010799421 0.015691594 0.015691594 0.002185415 0.015873676 0.016351073
 [7] 0.013817085 0.015486075 0.015691594 0.016163798 0.016431951 0.012383032
[13] 0.008348499 0.013477697 0.006413577 0.002809857 0.013124724 0.004704515
[19] 0.008348499 0.014141025
> 
> ## Check q*(p*(.)) = identity
> All.eq(Rbeta,	  qbeta	   (Pbeta, shape1 = .8, shape2 = 2))
[1] TRUE
> All.eq(Rbinom,	  qbinom   (Pbinom, size = 55, prob = pi/16))
[1] TRUE
> All.eq(Rcauchy,	  qcauchy  (Pcauchy, location = 12, scale = 2))
[1] TRUE
> All.eq(Rchisq,	  qchisq   (Pchisq, df = 3))
[1] TRUE
> All.eq(Rexp,	  qexp	   (Pexp, rate = 2))
[1] TRUE
> All.eq(Rf,	  qf	   (Pf, df1 = 12, df2 = 6))
[1] TRUE
> All.eq(Rgamma,	  qgamma   (Pgamma, shape = 2, scale = 5))
[1] TRUE
> All.eq(Rgeom,	  qgeom	   (Pgeom, prob = pi/16))
[1] TRUE
> All.eq(Rhyper,	  qhyper   (Phyper, m = 40, n = 30, k = 20))
[1] TRUE
> All.eq(Rlnorm,	  qlnorm   (Plnorm, meanlog = -1, sdlog = 3))
[1] TRUE
> All.eq(Rlogis,	  qlogis   (Plogis, location = 12, scale = 2))
[1] TRUE
> All.eq(Rnbinom,	  qnbinom  (Pnbinom, size = 7, prob = .01))
[1] TRUE
> All.eq(Rnorm,	  qnorm	   (Pnorm, mean = -1, sd = 3))
[1] TRUE
> All.eq(Rpois,	  qpois	   (Ppois, lambda = 12))
[1] TRUE
> All.eq(Rsignrank, qsignrank(Psignrank, n = 47))
[1] TRUE
> All.eq(Rt,	  qt	   (Pt,	 df = 11))
[1] TRUE
> all.equal(Rt2,	  qt	   (Pt2, df = 1.01), tol = 1e-2)
[1] TRUE
> All.eq(Runif,	  qunif	   (Punif, min = .2, max = 2))
[1] TRUE
> All.eq(Rweibull,  qweibull (Pweibull, shape = 3, scale = 2))
[1] TRUE
> All.eq(Rwilcox,	  qwilcox  (Pwilcox, m = 13, n = 17))
[1] TRUE
> 
> ## Same with "upper tail":
> All.eq(Rbeta,	  qbeta	   (1- Pbeta, shape1 = .8, shape2 = 2, lower=F))
[1] TRUE
> All.eq(Rbinom,	  qbinom   (1- Pbinom, size = 55, prob = pi/16, lower=F))
[1] TRUE
> All.eq(Rcauchy,	  qcauchy  (1- Pcauchy, location = 12, scale = 2, lower=F))
[1] TRUE
> All.eq(Rchisq,	  qchisq   (1- Pchisq, df = 3, lower=F))
[1] TRUE
> All.eq(Rexp,	  qexp	   (1- Pexp, rate = 2, lower=F))
[1] TRUE
> All.eq(Rf,	  qf	   (1- Pf, df1 = 12, df2 = 6, lower=F))
[1] TRUE
> All.eq(Rgamma,	  qgamma   (1- Pgamma, shape = 2, scale = 5, lower=F))
[1] TRUE
> All.eq(Rgeom,	  qgeom	   (1- Pgeom, prob = pi/16, lower=F))
[1] TRUE
> All.eq(Rhyper,	  qhyper   (1- Phyper, m = 40, n = 30, k = 20, lower=F))
[1] TRUE
> All.eq(Rlnorm,	  qlnorm   (1- Plnorm, meanlog = -1, sdlog = 3, lower=F))
[1] TRUE
> All.eq(Rlogis,	  qlogis   (1- Plogis, location = 12, scale = 2, lower=F))
[1] TRUE
> All.eq(Rnbinom,	  qnbinom  (1- Pnbinom, size = 7, prob = .01, lower=F))
[1] TRUE
> All.eq(Rnorm,	  qnorm	   (1- Pnorm, mean = -1, sd = 3,lower=F))
[1] TRUE
> All.eq(Rpois,	  qpois	   (1- Ppois, lambda = 12, lower=F))
[1] TRUE
> All.eq(Rsignrank, qsignrank(1- Psignrank, n = 47, lower=F))
[1] TRUE
> All.eq(Rt,	  qt	   (1- Pt,  df = 11,   lower=F))
[1] TRUE
> all.equal(Rt2,	  qt	   (1- Pt2, df = 1.01, lower=F), tol = 1e-2)
[1] TRUE
> All.eq(Runif,	  qunif	   (1- Punif, min = .2, max = 2, lower=F))
[1] TRUE
> All.eq(Rweibull,  qweibull (1- Pweibull, shape = 3, scale = 2, lower=F))
[1] TRUE
> All.eq(Rwilcox,	  qwilcox  (1- Pwilcox, m = 13, n = 17, lower=F))
[1] TRUE
> 
> ## Check q*(p* ( log ), log) = identity
> All.eq(Rbeta,	  qbeta	   (log(Pbeta), shape1 = .8, shape2 = 2, log=TRUE))
[1] TRUE
> All.eq(Rbinom,	  qbinom   (log(Pbinom), size = 55, prob = pi/16, log=TRUE))
[1] TRUE
> All.eq(Rcauchy,	  qcauchy  (log(Pcauchy), location = 12, scale = 2, log=TRUE))
[1] TRUE
> all.equal(Rchisq,    qchisq   (log(Pchisq), df = 3, log=TRUE),tol=1e-14)
[1] TRUE
> All.eq(Rexp,	  qexp	   (log(Pexp), rate = 2, log=TRUE))
[1] TRUE
> All.eq(Rf,	  qf	   (log(Pf), df1= 12, df2= 6, log=TRUE))
[1] TRUE
> All.eq(Rgamma,	  qgamma   (log(Pgamma), shape = 2, scale = 5, log=TRUE))
[1] TRUE
> All.eq(Rgeom,	  qgeom	   (log(Pgeom), prob = pi/16, log=TRUE))
[1] TRUE
> All.eq(Rhyper,	  qhyper   (log(Phyper), m = 40, n = 30, k = 20, log=TRUE))
[1] TRUE
> All.eq(Rlnorm,	  qlnorm   (log(Plnorm), meanlog = -1, sdlog = 3, log=TRUE))
[1] TRUE
> All.eq(Rlogis,	  qlogis   (log(Plogis), location = 12, scale = 2, log=TRUE))
[1] TRUE
> All.eq(Rnbinom,	  qnbinom  (log(Pnbinom), size = 7, prob = .01, log=TRUE))
[1] TRUE
> All.eq(Rnorm,	  qnorm	   (log(Pnorm), mean = -1, sd = 3, log=TRUE))
[1] TRUE
> All.eq(Rpois,	  qpois	   (log(Ppois), lambda = 12, log=TRUE))
[1] TRUE
> All.eq(Rsignrank, qsignrank(log(Psignrank), n = 47, log=TRUE))
[1] TRUE
> All.eq(Rt,	  qt	   (log(Pt), df = 11, log=TRUE))
[1] TRUE
> all.equal(Rt2,	  qt	   (log(Pt2), df = 1.01, log=TRUE), tol = 1e-2)
[1] TRUE
> All.eq(Runif,	  qunif	   (log(Punif), min = .2, max = 2, log=TRUE))
[1] TRUE
> All.eq(Rweibull,  qweibull (log(Pweibull), shape = 3, scale = 2, log=TRUE))
[1] TRUE
> All.eq(Rwilcox,	  qwilcox  (log(Pwilcox), m = 13, n = 17, log=TRUE))
[1] TRUE
> 
> ## same q*(p* (log) log) with upper tail:
> 
> All.eq(Rbeta,	  qbeta	   (log(1- Pbeta), shape1 = .8, shape2 = 2, lower=F, log=T))
[1] TRUE
> All.eq(Rbinom,	  qbinom   (log(1- Pbinom), size = 55, prob = pi/16, lower=F, log=T))
[1] TRUE
> All.eq(Rcauchy,	  qcauchy  (log(1- Pcauchy), location = 12, scale = 2, lower=F, log=T))
[1] TRUE
> All.eq(Rchisq,	  qchisq   (log(1- Pchisq), df = 3, lower=F, log=T))
[1] TRUE
> All.eq(Rexp,	  qexp	   (log(1- Pexp), rate = 2, lower=F, log=T))
[1] TRUE
> All.eq(Rf,	  qf	   (log(1- Pf), df1 = 12, df2 = 6, lower=F, log=T))
[1] TRUE
> All.eq(Rgamma,	  qgamma   (log(1- Pgamma), shape = 2, scale = 5, lower=F, log=T))
[1] TRUE
> All.eq(Rgeom,	  qgeom	   (log(1- Pgeom), prob = pi/16, lower=F, log=T))
[1] TRUE
> All.eq(Rhyper,	  qhyper   (log(1- Phyper), m = 40, n = 30, k = 20, lower=F, log=T))
[1] TRUE
> All.eq(Rlnorm,	  qlnorm   (log(1- Plnorm), meanlog = -1, sdlog = 3, lower=F, log=T))
[1] TRUE
> All.eq(Rlogis,	  qlogis   (log(1- Plogis), location = 12, scale = 2, lower=F, log=T))
[1] TRUE
> All.eq(Rnbinom,	  qnbinom  (log(1- Pnbinom), size = 7, prob = .01, lower=F, log=T))
[1] TRUE
> All.eq(Rnorm,	  qnorm	   (log(1- Pnorm), mean = -1, sd = 3, lower=F, log=T))
[1] TRUE
> All.eq(Rpois,	  qpois	   (log(1- Ppois), lambda = 12, lower=F, log=T))
[1] TRUE
> All.eq(Rsignrank, qsignrank(log(1- Psignrank), n = 47, lower=F, log=T))
[1] TRUE
> All.eq(Rt,	  qt	   (log(1- Pt ), df = 11,   lower=F, log=T))
[1] TRUE
> all.equal(Rt2,	  qt	   (log(1- Pt2), df = 1.01, lower=F, log=T), tol = 1e-2)
[1] TRUE
> All.eq(Runif,	  qunif	   (log(1- Punif), min = .2, max = 2, lower=F, log=T))
[1] TRUE
> All.eq(Rweibull,  qweibull (log(1- Pweibull), shape = 3, scale = 2, lower=F, log=T))
[1] TRUE
> All.eq(Rwilcox,	  qwilcox  (log(1- Pwilcox), m = 13, n = 17, lower=F, log=T))
[1] TRUE
> 
> 
> ## Check log( upper.tail ):
> All.eq(log(1 - Pbeta),	   pbeta    (Rbeta, shape1 = .8, shape2 = 2, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Pbinom),	   pbinom   (Rbinom, size = 55, prob = pi/16, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Pcauchy),   pcauchy  (Rcauchy, location = 12, scale = 2, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Pchisq),	   pchisq   (Rchisq, df = 3, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Pexp),	   pexp	    (Rexp, rate = 2, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Pf),	   pf	    (Rf, df1 = 12, df2 = 6, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Pgamma),	   pgamma   (Rgamma, shape = 2, scale = 5, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Pgeom),	   pgeom    (Rgeom, prob = pi/16, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Phyper),	   phyper   (Rhyper, m = 40, n = 30, k = 20, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Plnorm),	   plnorm   (Rlnorm, meanlog = -1, sdlog = 3, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Plogis),	   plogis   (Rlogis, location = 12, scale = 2, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Pnbinom),   pnbinom  (Rnbinom, size = 7, prob = .01, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Pnorm),	   pnorm    (Rnorm, mean = -1, sd = 3, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Ppois),	   ppois    (Rpois, lambda = 12, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Psignrank), psignrank(Rsignrank, n = 47, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Pt),	   pt	    (Rt, df = 11,   lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Pt2),	   pt	    (Rt2,df = 1.01, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Punif),	   punif    (Runif, min = .2, max = 2, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Pweibull),  pweibull (Rweibull, shape = 3, scale = 2, lower=F, log=T))
[1] TRUE
> All.eq(log(1 - Pwilcox),   pwilcox  (Rwilcox, m = 13, n = 17, lower=F, log=T))
[1] TRUE
> 
> 
> ### (Extreme) tail tests added more recently:
> All.eq(1, -1e-17/ pexp(qexp(-1e-17, log=TRUE),log=TRUE))
[1] TRUE
> abs(pgamma(30,100, lower=FALSE, log=TRUE) + 7.3384686328784e-24) < 1e-36
[1] TRUE
> All.eq(1, pcauchy(-1e20)           /  3.18309886183791e-21)
[1] TRUE
> All.eq(1, pcauchy(+1e15, log=TRUE) / -3.18309886183791e-16)## PR#6756
[1] TRUE
> x <- 10^(ex <- c(1,2,5*(1:5),50,100,200,300,Inf))
> for(a in x[ex > 10]) ## improve pt() : cbind(x,t= pt(-x, df=1), C=pcauchy(-x))
+     print(all.equal(pt(-a, df=1), pcauchy(-a), tol = 1e-15))
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
[1] TRUE
> ## for PR#7902:
> ex <- -c(rev(1/x), ex)
> All.eq(-x, qcauchy(pcauchy(-x)))
[1] TRUE
> All.eq(+x, qcauchy(pcauchy(+x, log=TRUE), log=TRUE))
[1] TRUE
> All.eq(1/x, pcauchy(qcauchy(1/x)))
[1] TRUE
> All.eq(ex,  pcauchy(qcauchy(ex, log=TRUE), log=TRUE))
[1] TRUE
> II <- c(-Inf,Inf)
> stopifnot(pcauchy(II) == 0:1, qcauchy(0:1) == II,
+           pcauchy(II, log=TRUE) == c(-Inf,0),
+           qcauchy(c(-Inf,0), log=TRUE) == II)
> 
> pr <- 1e-23 ## PR#6757
> stopifnot(all.equal(pr^ 12, pbinom(11, 12, prob= pr,lower=FALSE),
+                     tol= 1e-12, scale= 1e-270))
> ## pbinom(.) gave 0 in R 1.9.0
> pp <- 1e-17 ## PR#6792
> stopifnot(all.equal(2*pp, pgeom(1, pp), scale= 1e-20))
> ## pgeom(.) gave 0 in R 1.9.0
> 
> x <- 10^(100:295)
> sapply(c(1e-250, 1e-25, 0.9, 1.1, 101, 1e10, 1e100),
+        function(shape)
+        All.eq(-x, pgamma(x, shape=shape, lower=FALSE, log=TRUE)))
[1] TRUE TRUE TRUE TRUE TRUE TRUE TRUE
> x <- 2^(-1022:-900)
> ## where all completely off in R 2.0.1
> all.equal(pgamma(x, 10, log = TRUE) - 10*log(x),
+           rep(-15.104412573076, length(x)), tol = 1e-12)# 3.984e-14 (i386)
[1] TRUE
> all.equal(pgamma(x, 0.1, log = TRUE) - 0.1*log(x),
+           rep(0.0498724412598364, length(x)), tol = 1e-13)# 7e-16 (i386)
[1] TRUE
> 
> All.eq(dpois(  10, 2e-308, log=TRUE), -7100.13502718914)
[1] TRUE
> All.eq(dpois(  20, 3e-308, log=TRUE), -14204.2875435307)
[1] TRUE
> All.eq(dpois(1e20, 1e-290, log=TRUE), -7.12801378828154e+22)
[1] TRUE
> ## all gave -Inf in R 2.0.1
> 
> 
> ## Inf df in pf etc.
> # apparently pf(df2=Inf) worked in 2.0.1 (undocumented) but df did not.
> x <- c(1/pi, 1, pi)
> oo <- options(digits = 8)
> df(x, 3, 1e6)
[1] 0.72553184 0.46254030 0.03300701
> df(x, 3, Inf)
[1] 0.725532165 0.462540989 0.033006719
> pf(x, 3, 1e6)
[1] 0.18784423 0.60837436 0.97585435
> pf(x, 3, Inf)
[1] 0.18784423 0.60837482 0.97585479
> 
> df(x, 1e6, 5)
[1] 0.158602071 0.610206081 0.061036395
> df(x, Inf, 5)
[1] 0.15859792 0.61020761 0.06103637
> pf(x, 1e6, 5)
[1] 0.0077295711 0.4158807972 0.9022692409
> pf(x, Inf, 5)
[1] 0.0077292503 0.4158801870 0.9022693759
> 
> df(x, Inf, Inf)# (0, Inf, 0)  - since 2.1.1
[1]   0 Inf   0
> pf(x, Inf, Inf)# (0, 1/2, 1)
[1] 0.0 0.5 1.0
> 
> pf(x, 5, Inf, ncp=0)
[1] 0.097730624 0.584119813 0.992270750
> pf(x, 5, 1e6, ncp=1)
[1] 0.065933194 0.470879987 0.978875867
> pf(x, 5, 1e7, ncp=1)
[1] 0.06593309 0.47088028 0.97887641
> all.equal(pf(x, 5, 1e8, ncp=1), tol = 1e-6,
+           c(0.0659330751, 0.4708802996, 0.9788764591))
[1] TRUE
> pf(x, 5, Inf, ncp=1)
[1] 0.065933078 0.470880318 0.978876467
> 
> dt(1, Inf)
[1] 0.24197072
> dt(1, Inf, ncp=0)
[1] 0.24197072
> dt(1, Inf, ncp=1)
[1] 0.39894228
> dt(1, 1e6, ncp=1)
[1] 0.39894208
> dt(1, 1e7, ncp=1)
[1] 0.39894226
> dt(1, 1e8, ncp=1)
[1] 0.39894227
> dt(1, 1e10, ncp=1) # = Inf
[1] 0.39894228
> options(oo)
> ## Inf valid as from 2.1.1: df(x, 1e16, 5) was way off in 2.0.1.
> 
> ## PR#7099 : pf() with large df1 or df2:
> nu <- 2^seq(25,34, 0.5)
> y <- 1e9*(pf(1,1,nu) - 0.68268949)
> stopifnot(All.eq(pf(1,1,Inf), 0.68268949213708596),
+           diff(y) > 0, # i.e. pf(1,1, *) is monotone increasing
+           All.eq(y [1], -5.07420372386491),
+           All.eq(y[19],  2.12300110824515))
> ## not at all in R 2.1.0 or earlier
> 
> stopifnot(pgamma(Inf, 1.1) == 1)
> ## didn't not terminate in R 2.1.x (only)
> 
> ## qgamma(q, *) should give {0,Inf} for q={0,1}
> sh <- c(1.1, 0.5, 0.2, 0.15, 1e-2, 1e-10)
> stopifnot(Inf == qgamma(1, sh))
> stopifnot(0   == qgamma(0, sh))
> ## the first gave Inf, NaN, and 99.425 in R 2.1.1 and earlier
> 
> f2 <- c(0.5, 1:4)
> stopifnot(df(0, 1, f2) == Inf,
+           df(0, 2, f2) == 1,
+           df(0, 3, f2) == 0)
> ## only the last one was ok in R 2.2.1 and earlier
> 
> cat("Time elapsed: ", proc.time() - .ptime,"\n")
Time elapsed:  2.43 0.01 2.47 NA NA 
>