nmod_mpoly_factor.h – factorisation of multivariate polynomials over integers mod n (word-size n)¶
Types, macros and constants¶
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type
nmod_mpoly_factor_struct¶ A struct for holding a factored polynomial. There is a single constant and a product of bases to corresponding exponents.
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type
nmod_mpoly_factor_t¶ An array of length 1 of
nmod_mpoly_factor_struct.
Memory management¶
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void
nmod_mpoly_factor_init(nmod_mpoly_factor_t f, const nmod_mpoly_ctx_t ctx)¶ Initialise
f.
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void
nmod_mpoly_factor_clear(nmod_mpoly_factor_t f, const nmod_mpoly_ctx_t ctx)¶ Clear
f.
Basic manipulation¶
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void
nmod_mpoly_factor_swap(nmod_mpoly_factor_t f, nmod_mpoly_factor_t g, const nmod_mpoly_ctx_t ctx)¶ Efficiently swap \(f\) and
g.
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slong
nmod_mpoly_factor_length(const nmod_mpoly_factor_t f, const nmod_mpoly_ctx_t ctx)¶ Return the length of the product in \(f\).
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void
nmod_mpoly_factor_get_constant_ui(const nmod_mpoly_factor_t f, const nmod_mpoly_ctx_t ctx)¶ Return the constant of \(f\).
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void
nmod_mpoly_factor_get_base(nmod_mpoly_t p, const nmod_mpoly_factor_t f, slong i, const nmod_mpoly_ctx_t ctx)¶ -
void
nmod_mpoly_factor_swap_base(nmod_mpoly_t p, nmod_mpoly_factor_t f, slong i, const nmod_mpoly_ctx_t ctx)¶ Set (resp. swap)
Bto (resp. with) the base of the term of index \(i\) in \(A\).
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slong
nmod_mpoly_factor_get_exp_si(nmod_mpoly_factor_t f, slong i, const nmod_mpoly_ctx_t ctx)¶ Return the exponent of the term of index \(i\) in \(A\). It is assumed to fit an
slong.
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void
nmod_mpoly_factor_sort(nmod_mpoly_factor_t f, const nmod_mpoly_ctx_t ctx)¶ Sort the product of \(f\) first by exponent and then by base.
Factorisation¶
A return of \(1\) indicates that the function was successful. Otherwise, the return is \(0\) and \(f\) is undefined. None of these functions multiply \(f\) by \(A\): \(f\) is simply set to a factorisation of \(A\), and thus these functions should not depend on the initial value of the output \(f\).
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int
nmod_mpoly_factor_squarefree(nmod_mpoly_factor_t f, const nmod_mpoly_t A, const nmod_mpoly_ctx_t ctx)¶ Set \(f\) to a factorization of \(A\) where the bases are primitive and pairwise relatively prime. If the product of all irreducible factors with a given exponent is desired, it is recommend to call
nmod_mpoly_factor_sort()and then multiply the bases with the desired exponent.
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int
nmod_mpoly_factor(nmod_mpoly_factor_t f, const nmod_mpoly_t A, const nmod_mpoly_ctx_t ctx)¶ Set \(f\) to a factorization of \(A\) where the bases are irreducible.