def test_dmp_exclude():
assert dmp_exclude([[[]]], 2, ZZ) == ([], [[[]]], 2)
assert dmp_exclude([[[7]]], 2, ZZ) == ([], [[[7]]], 2)
assert dmp_exclude([1,2,3], 0, ZZ) == ([], [1,2,3], 0)
assert dmp_exclude([[1],[2,3]], 1, ZZ) == ([], [[1],[2,3]], 1)
assert dmp_exclude([[1,2,3]], 1, ZZ) == ([0], [1,2,3], 0)
assert dmp_exclude([[1],[2],[3]], 1, ZZ) == ([1], [1,2,3], 0)
assert dmp_exclude([[[1,2,3]]], 2, ZZ) == ([0,1], [1,2,3], 0)
assert dmp_exclude([[[1]],[[2]],[[3]]], 2, ZZ) == ([1,2], [1,2,3], 0)
def exclude(f):
r"""
Remove useless generators from ``f``.
Returns the removed generators and the new excluded ``f``.
**Example**
>>> from sympy.polys.polyclasses import DMP
>>> from sympy.polys.domains import ZZ
>>> DMP([[[ZZ(1)]], [[ZZ(1)], [ZZ(2)]]], ZZ).exclude()
([2], DMP([[1], [1, 2]], ZZ))
"""
J, F, u = dmp_exclude(f.rep, f.lev, f.dom)
return J, f.__class__(F, f.dom, u)
def exclude(f):
r"""
Remove useless generators from ``f``.
Returns the removed generators and the new excluded ``f``.
**Example**
>>> from sympy.polys.polyclasses import DMP
>>> from sympy.polys.domains import ZZ
>>> DMP([[[ZZ(1)]], [[ZZ(1)], [ZZ(2)]]], ZZ).exclude()
([2], DMP([[1], [1, 2]], ZZ))
"""
J, F, u = dmp_exclude(f.rep, f.lev, f.dom)
return J, f.__class__(F, f.dom, u)
def _dmp_inner_factor(f, u, K):
"""Simplify factorization in `Z[X]` as much as possible. """
gcd, f = dmp_terms_gcd(f, u, K)
J, f, v = dmp_exclude(f, u, K)
coeff, factors = dmp_zz_factor(f, v, K)
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_include(f, J, v, K), k)
for i, g in enumerate(reversed(gcd)):
if not g:
continue
term = {(0, ) * (u - i) + (1, ) + (0, ) * i: K.one}
factors.insert(0, (dmp_from_dict(term, u, K), g))
return coeff, factors
def _dmp_inner_factor(f, u, K):
"""Simplify factorization in `Z[X]` as much as possible. """
gcd, f = dmp_terms_gcd(f, u, K)
J, f, v = dmp_exclude(f, u, K)
coeff, factors = dmp_zz_factor(f, v, K)
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_include(f, J, v, K), k)
for i, g in enumerate(reversed(gcd)):
if not g:
continue
term = {(0,)*(u-i) + (1,) + (0,)*i: K.one}
factors.insert(0, (dmp_from_dict(term, u, K), g))
return coeff, factors
def dmp_factor_list(f, u, K0):
"""Factor polynomials into irreducibles in `K[X]`. """
if not u:
return dup_factor_list(f, K0)
J, f = dmp_terms_gcd(f, u, K0)
if not K0.has_CharacteristicZero: # pragma: no cover
coeff, factors = dmp_gf_factor(f, u, K0)
elif K0.is_Algebraic:
coeff, factors = dmp_ext_factor(f, u, K0)
else:
if not K0.is_Exact:
K0_inexact, K0 = K0, K0.get_exact()
f = dmp_convert(f, u, K0_inexact, K0)
else:
K0_inexact = None
if K0.has_Field:
K = K0.get_ring()
denom, f = dmp_clear_denoms(f, u, K0, K)
f = dmp_convert(f, u, K0, K)
else:
K = K0
if K.is_ZZ:
levels, f, v = dmp_exclude(f, u, K)
coeff, factors = dmp_zz_factor(f, v, K)
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_include(f, levels, v, K), k)
elif K.is_Poly:
f, v = dmp_inject(f, u, K)
coeff, factors = dmp_factor_list(f, v, K.dom)
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_eject(f, v, K), k)
coeff = K.convert(coeff, K.dom)
else: # pragma: no cover
raise DomainError('factorization not supported over %s' % K0)
if K0.has_Field:
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_convert(f, u, K, K0), k)
coeff = K0.convert(coeff, K)
denom = K0.convert(denom, K)
coeff = K0.quo(coeff, denom)
if K0_inexact is not None:
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_convert(f, u, K0, K0_inexact), k)
coeff = K0_inexact.convert(coeff, K0)
for i, j in enumerate(reversed(J)):
if not j:
continue
term = {(0, ) * (u - i) + (1, ) + (0, ) * i: K0.one}
factors.insert(0, (dmp_from_dict(term, u, K0), j))
return coeff, _sort_factors(factors)
def dmp_factor_list(f, u, K0):
"""Factor polynomials into irreducibles in `K[X]`. """
if not u:
return dup_factor_list(f, K0)
J, f = dmp_terms_gcd(f, u, K0)
if not K0.has_CharacteristicZero: # pragma: no cover
coeff, factors = dmp_gf_factor(f, u, K0)
elif K0.is_Algebraic:
coeff, factors = dmp_ext_factor(f, u, K0)
else:
if not K0.is_Exact:
K0_inexact, K0 = K0, K0.get_exact()
f = dmp_convert(f, u, K0_inexact, K0)
else:
K0_inexact = None
if K0.has_Field:
K = K0.get_ring()
denom, f = dmp_clear_denoms(f, u, K0, K)
f = dmp_convert(f, u, K0, K)
else:
K = K0
if K.is_ZZ:
levels, f, v = dmp_exclude(f, u, K)
coeff, factors = dmp_zz_factor(f, v, K)
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_include(f, levels, v, K), k)
elif K.is_Poly:
f, v = dmp_inject(f, u, K)
coeff, factors = dmp_factor_list(f, v, K.dom)
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_eject(f, v, K), k)
coeff = K.convert(coeff, K.dom)
else: # pragma: no cover
raise DomainError('factorization not supported over %s' % K0)
if K0.has_Field:
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_convert(f, u, K, K0), k)
coeff = K0.convert(coeff, K)
denom = K0.convert(denom, K)
coeff = K0.quo(coeff, denom)
if K0_inexact is not None:
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_convert(f, u, K0, K0_inexact), k)
coeff = K0_inexact.convert(coeff, K0)
for i, j in enumerate(reversed(J)):
if not j:
continue
term = {(0,)*(u-i) + (1,) + (0,)*i: K0.one}
factors.insert(0, (dmp_from_dict(term, u, K0), j))
return coeff, _sort_factors(factors)
def dmp_factor_list(f, u, K0):
"""Factor multivariate polynomials into irreducibles in `K[X]`. """
if not u:
return dup_factor_list(f, K0)
J, f = dmp_terms_gcd(f, u, K0)
cont, f = dmp_ground_primitive(f, u, K0)
if K0.is_FiniteField: # pragma: no cover
coeff, factors = dmp_gf_factor(f, u, K0)
elif K0.is_Algebraic:
coeff, factors = dmp_ext_factor(f, u, K0)
# elif K0.is_GaussianRing:
# coeff, factors = dmp_zz_i_factor(f, u, K0)
# elif K0.is_GaussianField:
# coeff, factors = dmp_qq_i_factor(f, u, K0)
else:
if not K0.is_Exact:
K0_inexact, K0 = K0, K0.get_exact()
f = dmp_convert(f, u, K0_inexact, K0)
else:
K0_inexact = None
if K0.is_Field:
K = K0.get_ring()
denom, f = dmp_clear_denoms(f, u, K0, K)
f = dmp_convert(f, u, K0, K)
else:
K = K0
if K.is_ZZ:
levels, f, v = dmp_exclude(f, u, K)
coeff, factors = dmp_zz_factor(f, v, K)
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_include(f, levels, v, K), k)
elif K.is_Poly:
f, v = dmp_inject(f, u, K)
coeff, factors = dmp_factor_list(f, v, K.dom)
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_eject(f, v, K), k)
coeff = K.convert(coeff, K.dom)
else: # pragma: no cover
raise DomainError('factorization not supported over %s' % K0)
if K0.is_Field:
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_convert(f, u, K, K0), k)
coeff = K0.convert(coeff, K)
coeff = K0.quo(coeff, denom)
if K0_inexact:
for i, (f, k) in enumerate(factors):
max_norm = dmp_max_norm(f, u, K0)
f = dmp_quo_ground(f, max_norm, u, K0)
f = dmp_convert(f, u, K0, K0_inexact)
factors[i] = (f, k)
coeff = K0.mul(coeff, K0.pow(max_norm, k))
coeff = K0_inexact.convert(coeff, K0)
K0 = K0_inexact
for i, j in enumerate(reversed(J)):
if not j:
continue
term = {(0, ) * (u - i) + (1, ) + (0, ) * i: K0.one}
factors.insert(0, (dmp_from_dict(term, u, K0), j))
return coeff * cont, _sort_factors(factors)
