TODO: Update this TODO
-
[maybe] figure out how to write robust test code for
fmpz_read(which reads fromstdin), perhaps using a pipe -
[maybe] Avoid the double allocation of both an
__mpz_structand limb data, having anfmpzpoint directly to a combined structure. This would require writing replacements for mostmpzfunctions.
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in
is_prime_pocklingtonallow the cofactor to be a perfect power not just prime -
factor out some common code between
n_is_perfect_power235andn_factor_power235 -
n_mod2_preinvmay be slower than the chip on Core2 due to the fact that it can pipeline 2 divisions. Check all occurrences of this function and replace with divisions where it will speed things up on Core2. Beware, this will slow things down on AMD, so it is necessary to do this per architecture. The macros innmod_vecwill also be faster than the functions inulong_extras, thus they should be tried first. -
add profile code for
factor_trial,factor_one_line,factor_SQUFOF -
[maybe] make
n_factor_tan array of length 1 so it can be passed by reference automatically, as permpz_t's, etc -
[enhancement] Implement a primality test which only requires factoring of
n - 1up ton^1/3orn^1/4 -
[enhancement] Implement a combined
p - 1andp + 1primality test as per http://primes.utm.edu/prove/prove3_3.html -
[enhancement] Implement a quadratic sieve and use it in
n_factoronce things get too large for SQUFOF -
Claus Fieker suggested that in BPSW we should do Miller-Rabin rather than Fermat test. The advantage is it will throw out more composites before the Fibonacci or Lucas tests are run, but still ensures you have a base-2 probable prime. This should speed the test up.
- write and use
z_invertinfmpz_invert
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Tune Brent-Pollard Rho for optimal values
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Find optimal values for B1, B2 for ECM.
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Use multipoint polynomial evaluation in ECM stage II.
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Implement array version of
divrem_ideal. -
Don't restart division if upgrading to multiprecision.
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Check quotient and remainder coefficients are normalised the same way for small vs multiprecision division functions. Beware one normalisation may require an extra bit for either q or r in signed integer division in small case. This is probably why C division is normalised the way it is.
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Implement
fmpz_mpoly_ui/si/fmpz_subfunctions for Nemo. -
Add references to Monagan and Pearce papers to Bibtex and reference in heap multiplication, powering and division functions.
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Move functions in
mpoly/MISSING_FXNS.cand decarations in mpoly.h to their appropriate places.
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Make some assembly optimisations to
nmod_polymodule. (FIXME: Which ones?) -
Add basecase versions of
log,sqrt,invsqrtseries. -
Add
$O(M(n))$ powering$\mod x^n$ based onexpandlog. -
Implement fast
mulmidand use to improve Newton iteration -
Determine cutoffs for
compose_series_divconquerfor default use incompose_series(only when one polynomial is small). -
Optimise, write an underscore version of, and test
nmod_poly_remove -
Improve
powmodandpowpowmodusing precomputed Newton inverse and$2^k$ -ary/sliding window powering. -
Maybe restructure the code in
factor.c -
Add a (fast) function to convert an
nmod_poly_factor_tto an expanded polynomial
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add test code for
fmpz_poly_max_limbs -
Improve the implementations of
fmpz_poly_[divrem/div/rem], check that the documentations still apply, and write test code for this --- all of this makes more sense once there is a choice of algorithms -
Include test code for
fmpz_poly_inv_series, once this method does anything better than aliasingfmpz_poly_inv_newton -
Sort out the
fmpz_poly_pseudo_[div/rem]code. Currently this is just a hack to callfmpz_poly_pseudo_divrem -
Fix the inefficient cases in
CRT_ui, and move the relevant parts of this function to thefmpz_vecmodule -
Avoid redundant work and memory allocation in
fmpz_poly_bit_unpackandfmpz_poly_bit_unpack_unsigned. -
Add functions for composition, multiplication and division by a monic linear factor, i.e.
$P(x \pm c)$ ,$P \cdot (x \pm c)$ ,$P / (x \pm c)$ . -
xgcd_modularis really slow. But it is not clear why. 1/3 of the time is spent in resultant, but the CRT code or thenmod_poly_xgcdcode may also be to blame. -
Make resultants use fast GCD?
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In
fmpz_poly_pseudo_divrem_divconquer, fix the repeated memory allocation of size$O(\mathtt{lenA})$ in the case when$\mathtt{lenA} \gg \mathtt{lenB}$ .
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add
fmpq_poly_fprint_pretty -
Rewrite
_fmpq_poly_interpolate_fmpz_vecto use the Newton form as done in thefmpz_polyinterpolation function. In general this should be much faster. -
Add versions of
fmpq_poly_interpolate_fmpz_vecforfmpqyvalues, andfmpqvalues of bothxandy. -
Add
mulhigh -
Add
gcdinv -
Add discriminant
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Replace
fmpz_mod_poly_remby a proper implementation which actually saves work overdivrem. Then, also add test code. -
Implement a faster GCD function then the euclidean one, then make the wrapping GCD function choose the appropriate algorithm, and add some test code
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Tune multiplication cutoffs.
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Take sparseness into account when selecting between algorithms.
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Investigate more clever pivoting strategies in row reduction.
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Write a faster
arith_divisorsusing the merge sort algorithm (see Sage's implementation). Alternatively (or as a complement) write a supernaturally fast_fmpz_vec_sort. -
Write tests for the
arith_hrr_expsum_factoredfunctions.
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Add
fmpz_mat/randajtai2.cbased on Stehle'smatrix.cppinfpLLL(requiresmpfr_t's). -
Add element getter and setter methods.
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Write multiplication functions optimised for sparse matrices by changing the loop order and discarding zero multipliers.
-
The Dixon
$p$ -adic solver currently spends most of the time computing integer matrix-vector products. Instead of using a single prime, it is likely to be faster to use a product of primes to increase the proportion of time spent on modular linear algebra. The code should also use fast radix conversion instead of building up the result incrementally to improve performance when the output gets large. -
Maybe optimise multimodular multiplication by pre-transposing so that transposed
nmod_matmultiplication can be used directly instead of creating a transposed copy innmod_mat_mul. However, this doesn't help in the Strassen range unless there also is a transpose version ofnmod_mat_mul_strassen. -
Take sparseness into account when selecting between algorithms.
-
Maybe simplify the interface for row reduction by guaranteeing that the denominator is the determinant.
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Improve the wrapper strategy, if possible.
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Add an
mpfversion ofis_reducedfunctions so that the dependency on MPFR can be removed. -
Componentize the
is_reducedcode so that theRcomputed during LLL can be reused.
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Write a Strassen for packed entries that does additions faster.
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Investigate why the constant of solving/rref/inverse compared to multiplication appears to be worse than in theory (recent paper by Jeannerod, Pernet and Storjohann).
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See if Strassen can be improved using combined addmul operations.
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Consider getting rid of the row pointer array, using offsets instead of window matrices. The row pointer is only useful for Gaussian elimination, but there we end up working with a separate permutation array anyway.
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Add functions for computing
$A B^\mathrm{T}$ and$A^\mathrm{T} B$ , using transpose multiplications directly to avoid creating a temporary copy. -
Maybe: add asserts to check that the modulus is a prime where this is assumed.
-
The current
addmul/submulfunctions are misnamed since they implement a more general operation. -
Improve
rrefand inverse to perform everything in-place.
- Add more functions for generating random numbers.
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Add more random functions.
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Add a user-friendly function for LUP decomposition.
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Add a nullspace function.
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Add test code for the various output formats; perhaps in the form of examples?
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Implement
padic_val_facfor generic inputs
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_mpf_vec_approx_equaluses the bizarrempfnotion of equal; it should be either renamedequal_bitsor the absolute value of the difference should be compared with zero -
The conditions used in
mpf_mat_qr/gso(similarly ford_matmodule) work, but don't match those used in the algorithm in the paper referenced in the docs. This is possibly becausempfdoesn't do exact rounding. The tests could probably be improved.
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d_mat_transposetries to be clever with the cache, but it could use L1 sized blocks and optimise for sequential reading/writing. It could also handle in-place much more efficiently. -
d_mat_is_reduceddoesn't seem to make any guarantees about reducedness, just approximately checks the Lovasz conditions in double arithmetic. I think this is superseded now and can be removed. It is not used anywhere.