"""Tests for OO layer of several polynomial representations. """ from sympy.polys.domains import ZZ, QQ from sympy.polys.polyclasses import DMP, DMF, ANP from sympy.polys.polyerrors import ExactQuotientFailed, NotInvertible from sympy.polys.specialpolys import f_polys from sympy.testing.pytest import raises f_0, f_1, f_2, f_3, f_4, f_5, f_6 = [ f.to_dense() for f in f_polys() ] def test_DMP___init__(): f = DMP([[0], [], [0, 1, 2], [3]], ZZ) assert f.rep == [[1, 2], [3]] assert f.dom == ZZ assert f.lev == 1 f = DMP([[1, 2], [3]], ZZ, 1) assert f.rep == [[1, 2], [3]] assert f.dom == ZZ assert f.lev == 1 f = DMP({(1, 1): 1, (0, 0): 2}, ZZ, 1) assert f.rep == [[1, 0], [2]] assert f.dom == ZZ assert f.lev == 1 def test_DMP___eq__(): assert DMP([[ZZ(1), ZZ(2)], [ZZ(3)]], ZZ) == \ DMP([[ZZ(1), ZZ(2)], [ZZ(3)]], ZZ) assert DMP([[ZZ(1), ZZ(2)], [ZZ(3)]], ZZ) == \ DMP([[QQ(1), QQ(2)], [QQ(3)]], QQ) assert DMP([[QQ(1), QQ(2)], [QQ(3)]], QQ) == \ DMP([[ZZ(1), ZZ(2)], [ZZ(3)]], ZZ) assert DMP([[[ZZ(1)]]], ZZ) != DMP([[ZZ(1)]], ZZ) assert DMP([[ZZ(1)]], ZZ) != DMP([[[ZZ(1)]]], ZZ) def test_DMP___bool__(): assert bool(DMP([[]], ZZ)) is False assert bool(DMP([[1]], ZZ)) is True def test_DMP_to_dict(): f = DMP([[3], [], [2], [], [8]], ZZ) assert f.to_dict() == \ {(4, 0): 3, (2, 0): 2, (0, 0): 8} assert f.to_sympy_dict() == \ {(4, 0): ZZ.to_sympy(3), (2, 0): ZZ.to_sympy(2), (0, 0): ZZ.to_sympy(8)} def test_DMP_properties(): assert DMP([[]], ZZ).is_zero is True assert DMP([[1]], ZZ).is_zero is False assert DMP([[1]], ZZ).is_one is True assert DMP([[2]], ZZ).is_one is False assert DMP([[1]], ZZ).is_ground is True assert DMP([[1], [2], [1]], ZZ).is_ground is False assert DMP([[1], [2, 0], [1, 0]], ZZ).is_sqf is True assert DMP([[1], [2, 0], [1, 0, 0]], ZZ).is_sqf is False assert DMP([[1, 2], [3]], ZZ).is_monic is True assert DMP([[2, 2], [3]], ZZ).is_monic is False assert DMP([[1, 2], [3]], ZZ).is_primitive is True assert DMP([[2, 4], [6]], ZZ).is_primitive is False def test_DMP_arithmetics(): f = DMP([[2], [2, 0]], ZZ) assert f.mul_ground(2) == DMP([[4], [4, 0]], ZZ) assert f.quo_ground(2) == DMP([[1], [1, 0]], ZZ) raises(ExactQuotientFailed, lambda: f.exquo_ground(3)) f = DMP([[-5]], ZZ) g = DMP([[5]], ZZ) assert f.abs() == g assert abs(f) == g assert g.neg() == f assert -g == f h = DMP([[]], ZZ) assert f.add(g) == h assert f + g == h assert g + f == h assert f + 5 == h assert 5 + f == h h = DMP([[-10]], ZZ) assert f.sub(g) == h assert f - g == h assert g - f == -h assert f - 5 == h assert 5 - f == -h h = DMP([[-25]], ZZ) assert f.mul(g) == h assert f * g == h assert g * f == h assert f * 5 == h assert 5 * f == h h = DMP([[25]], ZZ) assert f.sqr() == h assert f.pow(2) == h assert f**2 == h raises(TypeError, lambda: f.pow('x')) f = DMP([[1], [], [1, 0, 0]], ZZ) g = DMP([[2], [-2, 0]], ZZ) q = DMP([[2], [2, 0]], ZZ) r = DMP([[8, 0, 0]], ZZ) assert f.pdiv(g) == (q, r) assert f.pquo(g) == q assert f.prem(g) == r raises(ExactQuotientFailed, lambda: f.pexquo(g)) f = DMP([[1], [], [1, 0, 0]], ZZ) g = DMP([[1], [-1, 0]], ZZ) q = DMP([[1], [1, 0]], ZZ) r = DMP([[2, 0, 0]], ZZ) assert f.div(g) == (q, r) assert f.quo(g) == q assert f.rem(g) == r assert divmod(f, g) == (q, r) assert f // g == q assert f % g == r raises(ExactQuotientFailed, lambda: f.exquo(g)) def test_DMP_functionality(): f = DMP([[1], [2, 0], [1, 0, 0]], ZZ) g = DMP([[1], [1, 0]], ZZ) h = DMP([[1]], ZZ) assert f.degree() == 2 assert f.degree_list() == (2, 2) assert f.total_degree() == 2 assert f.LC() == ZZ(1) assert f.TC() == ZZ(0) assert f.nth(1, 1) == ZZ(2) raises(TypeError, lambda: f.nth(0, 'x')) assert f.max_norm() == 2 assert f.l1_norm() == 4 u = DMP([[2], [2, 0]], ZZ) assert f.diff(m=1, j=0) == u assert f.diff(m=1, j=1) == u raises(TypeError, lambda: f.diff(m='x', j=0)) u = DMP([1, 2, 1], ZZ) v = DMP([1, 2, 1], ZZ) assert f.eval(a=1, j=0) == u assert f.eval(a=1, j=1) == v assert f.eval(1).eval(1) == ZZ(4) assert f.cofactors(g) == (g, g, h) assert f.gcd(g) == g assert f.lcm(g) == f u = DMP([[QQ(45), QQ(30), QQ(5)]], QQ) v = DMP([[QQ(1), QQ(2, 3), QQ(1, 9)]], QQ) assert u.monic() == v assert (4*f).content() == ZZ(4) assert (4*f).primitive() == (ZZ(4), f) f = DMP([[1], [2], [3], [4], [5], [6]], ZZ) assert f.trunc(3) == DMP([[1], [-1], [], [1], [-1], []], ZZ) f = DMP(f_4, ZZ) assert f.sqf_part() == -f assert f.sqf_list() == (ZZ(-1), [(-f, 1)]) f = DMP([[-1], [], [], [5]], ZZ) g = DMP([[3, 1], [], []], ZZ) h = DMP([[45, 30, 5]], ZZ) r = DMP([675, 675, 225, 25], ZZ) assert f.subresultants(g) == [f, g, h] assert f.resultant(g) == r f = DMP([1, 3, 9, -13], ZZ) assert f.discriminant() == -11664 f = DMP([QQ(2), QQ(0)], QQ) g = DMP([QQ(1), QQ(0), QQ(-16)], QQ) s = DMP([QQ(1, 32), QQ(0)], QQ) t = DMP([QQ(-1, 16)], QQ) h = DMP([QQ(1)], QQ) assert f.half_gcdex(g) == (s, h) assert f.gcdex(g) == (s, t, h) assert f.invert(g) == s f = DMP([[1], [2], [3]], QQ) raises(ValueError, lambda: f.half_gcdex(f)) raises(ValueError, lambda: f.gcdex(f)) raises(ValueError, lambda: f.invert(f)) f = DMP([1, 0, 20, 0, 150, 0, 500, 0, 625, -2, 0, -10, 9], ZZ) g = DMP([1, 0, 0, -2, 9], ZZ) h = DMP([1, 0, 5, 0], ZZ) assert g.compose(h) == f assert f.decompose() == [g, h] f = DMP([[1], [2], [3]], QQ) raises(ValueError, lambda: f.decompose()) raises(ValueError, lambda: f.sturm()) def test_DMP_exclude(): f = [[[[[[[[[[[[[[[[[[[[[[[[[[1]], [[]]]]]]]]]]]]]]]]]]]]]]]]]] J = [0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18, 19, 20, 21, 22, 24, 25] assert DMP(f, ZZ).exclude() == (J, DMP([1, 0], ZZ)) assert DMP([[1], [1, 0]], ZZ).exclude() == ([], DMP([[1], [1, 0]], ZZ)) def test_DMF__init__(): f = DMF(([[0], [], [0, 1, 2], [3]], [[1, 2, 3]]), ZZ) assert f.num == [[1, 2], [3]] assert f.den == [[1, 2, 3]] assert f.lev == 1 assert f.dom == ZZ f = DMF(([[1, 2], [3]], [[1, 2, 3]]), ZZ, 1) assert f.num == [[1, 2], [3]] assert f.den == [[1, 2, 3]] assert f.lev == 1 assert f.dom == ZZ f = DMF(([[-1], [-2]], [[3], [-4]]), ZZ) assert f.num == [[-1], [-2]] assert f.den == [[3], [-4]] assert f.lev == 1 assert f.dom == ZZ f = DMF(([[1], [2]], [[-3], [4]]), ZZ) assert f.num == [[-1], [-2]] assert f.den == [[3], [-4]] assert f.lev == 1 assert f.dom == ZZ f = DMF(([[1], [2]], [[-3], [4]]), ZZ) assert f.num == [[-1], [-2]] assert f.den == [[3], [-4]] assert f.lev == 1 assert f.dom == ZZ f = DMF(([[]], [[-3], [4]]), ZZ) assert f.num == [[]] assert f.den == [[1]] assert f.lev == 1 assert f.dom == ZZ f = DMF(17, ZZ, 1) assert f.num == [[17]] assert f.den == [[1]] assert f.lev == 1 assert f.dom == ZZ f = DMF(([[1], [2]]), ZZ) assert f.num == [[1], [2]] assert f.den == [[1]] assert f.lev == 1 assert f.dom == ZZ f = DMF([[0], [], [0, 1, 2], [3]], ZZ) assert f.num == [[1, 2], [3]] assert f.den == [[1]] assert f.lev == 1 assert f.dom == ZZ f = DMF({(1, 1): 1, (0, 0): 2}, ZZ, 1) assert f.num == [[1, 0], [2]] assert f.den == [[1]] assert f.lev == 1 assert f.dom == ZZ f = DMF(([[QQ(1)], [QQ(2)]], [[-QQ(3)], [QQ(4)]]), QQ) assert f.num == [[-QQ(1)], [-QQ(2)]] assert f.den == [[QQ(3)], [-QQ(4)]] assert f.lev == 1 assert f.dom == QQ f = DMF(([[QQ(1, 5)], [QQ(2, 5)]], [[-QQ(3, 7)], [QQ(4, 7)]]), QQ) assert f.num == [[-QQ(7)], [-QQ(14)]] assert f.den == [[QQ(15)], [-QQ(20)]] assert f.lev == 1 assert f.dom == QQ raises(ValueError, lambda: DMF(([1], [[1]]), ZZ)) raises(ZeroDivisionError, lambda: DMF(([1], []), ZZ)) def test_DMF__bool__(): assert bool(DMF([[]], ZZ)) is False assert bool(DMF([[1]], ZZ)) is True def test_DMF_properties(): assert DMF([[]], ZZ).is_zero is True assert DMF([[]], ZZ).is_one is False assert DMF([[1]], ZZ).is_zero is False assert DMF([[1]], ZZ).is_one is True assert DMF(([[1]], [[2]]), ZZ).is_one is False def test_DMF_arithmetics(): f = DMF([[7], [-9]], ZZ) g = DMF([[-7], [9]], ZZ) assert f.neg() == -f == g f = DMF(([[1]], [[1], []]), ZZ) g = DMF(([[1]], [[1, 0]]), ZZ) h = DMF(([[1], [1, 0]], [[1, 0], []]), ZZ) assert f.add(g) == f + g == h assert g.add(f) == g + f == h h = DMF(([[-1], [1, 0]], [[1, 0], []]), ZZ) assert f.sub(g) == f - g == h h = DMF(([[1]], [[1, 0], []]), ZZ) assert f.mul(g) == f*g == h assert g.mul(f) == g*f == h h = DMF(([[1, 0]], [[1], []]), ZZ) assert f.quo(g) == f/g == h h = DMF(([[1]], [[1], [], [], []]), ZZ) assert f.pow(3) == f**3 == h h = DMF(([[1]], [[1, 0, 0, 0]]), ZZ) assert g.pow(3) == g**3 == h h = DMF(([[1, 0]], [[1]]), ZZ) assert g.pow(-1) == g**-1 == h def test_ANP___init__(): rep = [QQ(1), QQ(1)] mod = [QQ(1), QQ(0), QQ(1)] f = ANP(rep, mod, QQ) assert f.rep == [QQ(1), QQ(1)] assert f.mod == [QQ(1), QQ(0), QQ(1)] assert f.dom == QQ rep = {1: QQ(1), 0: QQ(1)} mod = {2: QQ(1), 0: QQ(1)} f = ANP(rep, mod, QQ) assert f.rep == [QQ(1), QQ(1)] assert f.mod == [QQ(1), QQ(0), QQ(1)] assert f.dom == QQ f = ANP(1, mod, QQ) assert f.rep == [QQ(1)] assert f.mod == [QQ(1), QQ(0), QQ(1)] assert f.dom == QQ def test_ANP___eq__(): a = ANP([QQ(1), QQ(1)], [QQ(1), QQ(0), QQ(1)], QQ) b = ANP([QQ(1), QQ(1)], [QQ(1), QQ(0), QQ(2)], QQ) assert (a == a) is True assert (a != a) is False assert (a == b) is False assert (a != b) is True b = ANP([QQ(1), QQ(2)], [QQ(1), QQ(0), QQ(1)], QQ) assert (a == b) is False assert (a != b) is True def test_ANP___bool__(): assert bool(ANP([], [QQ(1), QQ(0), QQ(1)], QQ)) is False assert bool(ANP([QQ(1)], [QQ(1), QQ(0), QQ(1)], QQ)) is True def test_ANP_properties(): mod = [QQ(1), QQ(0), QQ(1)] assert ANP([QQ(0)], mod, QQ).is_zero is True assert ANP([QQ(1)], mod, QQ).is_zero is False assert ANP([QQ(1)], mod, QQ).is_one is True assert ANP([QQ(2)], mod, QQ).is_one is False def test_ANP_arithmetics(): mod = [QQ(1), QQ(0), QQ(0), QQ(-2)] a = ANP([QQ(2), QQ(-1), QQ(1)], mod, QQ) b = ANP([QQ(1), QQ(2)], mod, QQ) c = ANP([QQ(-2), QQ(1), QQ(-1)], mod, QQ) assert a.neg() == -a == c c = ANP([QQ(2), QQ(0), QQ(3)], mod, QQ) assert a.add(b) == a + b == c assert b.add(a) == b + a == c c = ANP([QQ(2), QQ(-2), QQ(-1)], mod, QQ) assert a.sub(b) == a - b == c c = ANP([QQ(-2), QQ(2), QQ(1)], mod, QQ) assert b.sub(a) == b - a == c c = ANP([QQ(3), QQ(-1), QQ(6)], mod, QQ) assert a.mul(b) == a*b == c assert b.mul(a) == b*a == c c = ANP([QQ(-1, 43), QQ(9, 43), QQ(5, 43)], mod, QQ) assert a.pow(0) == a**(0) == ANP(1, mod, QQ) assert a.pow(1) == a**(1) == a assert a.pow(-1) == a**(-1) == c assert a.quo(a) == a.mul(a.pow(-1)) == a*a**(-1) == ANP(1, mod, QQ) c = ANP([], [1, 0, 0, -2], QQ) r1 = a.rem(b) (q, r2) = a.div(b) assert r1 == r2 == c == a % b raises(NotInvertible, lambda: a.div(c)) raises(NotInvertible, lambda: a.rem(c)) # Comparison with "hard-coded" value fails despite looking identical # from sympy import Rational # c = ANP([Rational(11, 10), Rational(-1, 5), Rational(-3, 5)], [1, 0, 0, -2], QQ) assert q == a/b # == c def test_ANP_unify(): mod = [QQ(1), QQ(0), QQ(-2)] a = ANP([QQ(1)], mod, QQ) b = ANP([ZZ(1)], mod, ZZ) assert a.unify(b)[0] == QQ assert b.unify(a)[0] == QQ assert a.unify(a)[0] == QQ assert b.unify(b)[0] == ZZ def test___hash__(): # issue 5571 # Make sure int vs. long doesn't affect hashing with Python ground types assert DMP([[1, 2], [3]], ZZ) == DMP([[int(1), int(2)], [int(3)]], ZZ) assert hash(DMP([[1, 2], [3]], ZZ)) == hash(DMP([[int(1), int(2)], [int(3)]], ZZ)) assert DMF( ([[1, 2], [3]], [[1]]), ZZ) == DMF(([[int(1), int(2)], [int(3)]], [[int(1)]]), ZZ) assert hash(DMF(([[1, 2], [3]], [[1]]), ZZ)) == hash(DMF(([[int(1), int(2)], [int(3)]], [[int(1)]]), ZZ)) assert ANP([1, 1], [1, 0, 1], ZZ) == ANP([int(1), int(1)], [int(1), int(0), int(1)], ZZ) assert hash( ANP([1, 1], [1, 0, 1], ZZ)) == hash(ANP([int(1), int(1)], [int(1), int(0), int(1)], ZZ))