from sympy.core.expr import unchanged from sympy.core.singleton import S from sympy.core.symbol import Symbol from sympy.sets.contains import Contains from sympy.sets.fancysets import Interval from sympy.sets.powerset import PowerSet from sympy.sets.sets import FiniteSet from sympy.testing.pytest import raises, XFAIL def test_powerset_creation(): assert unchanged(PowerSet, FiniteSet(1, 2)) assert unchanged(PowerSet, S.EmptySet) raises(ValueError, lambda: PowerSet(123)) assert unchanged(PowerSet, S.Reals) assert unchanged(PowerSet, S.Integers) def test_powerset_rewrite_FiniteSet(): assert PowerSet(FiniteSet(1, 2)).rewrite(FiniteSet) == \ FiniteSet(S.EmptySet, FiniteSet(1), FiniteSet(2), FiniteSet(1, 2)) assert PowerSet(S.EmptySet).rewrite(FiniteSet) == FiniteSet(S.EmptySet) assert PowerSet(S.Naturals).rewrite(FiniteSet) == PowerSet(S.Naturals) def test_finiteset_rewrite_powerset(): assert FiniteSet(S.EmptySet).rewrite(PowerSet) == PowerSet(S.EmptySet) assert FiniteSet( S.EmptySet, FiniteSet(1), FiniteSet(2), FiniteSet(1, 2)).rewrite(PowerSet) == \ PowerSet(FiniteSet(1, 2)) assert FiniteSet(1, 2, 3).rewrite(PowerSet) == FiniteSet(1, 2, 3) def test_powerset__contains__(): subset_series = [ S.EmptySet, FiniteSet(1, 2), S.Naturals, S.Naturals0, S.Integers, S.Rationals, S.Reals, S.Complexes] l = len(subset_series) for i in range(l): for j in range(l): if i <= j: assert subset_series[i] in \ PowerSet(subset_series[j], evaluate=False) else: assert subset_series[i] not in \ PowerSet(subset_series[j], evaluate=False) @XFAIL def test_failing_powerset__contains__(): # XXX These are failing when evaluate=True, # but using unevaluated PowerSet works fine. assert FiniteSet(1, 2) not in PowerSet(S.EmptySet).rewrite(FiniteSet) assert S.Naturals not in PowerSet(S.EmptySet).rewrite(FiniteSet) assert S.Naturals not in PowerSet(FiniteSet(1, 2)).rewrite(FiniteSet) assert S.Naturals0 not in PowerSet(S.EmptySet).rewrite(FiniteSet) assert S.Naturals0 not in PowerSet(FiniteSet(1, 2)).rewrite(FiniteSet) assert S.Integers not in PowerSet(S.EmptySet).rewrite(FiniteSet) assert S.Integers not in PowerSet(FiniteSet(1, 2)).rewrite(FiniteSet) assert S.Rationals not in PowerSet(S.EmptySet).rewrite(FiniteSet) assert S.Rationals not in PowerSet(FiniteSet(1, 2)).rewrite(FiniteSet) assert S.Reals not in PowerSet(S.EmptySet).rewrite(FiniteSet) assert S.Reals not in PowerSet(FiniteSet(1, 2)).rewrite(FiniteSet) assert S.Complexes not in PowerSet(S.EmptySet).rewrite(FiniteSet) assert S.Complexes not in PowerSet(FiniteSet(1, 2)).rewrite(FiniteSet) def test_powerset__len__(): A = PowerSet(S.EmptySet, evaluate=False) assert len(A) == 1 A = PowerSet(A, evaluate=False) assert len(A) == 2 A = PowerSet(A, evaluate=False) assert len(A) == 4 A = PowerSet(A, evaluate=False) assert len(A) == 16 def test_powerset__iter__(): a = PowerSet(FiniteSet(1, 2)).__iter__() assert next(a) == S.EmptySet assert next(a) == FiniteSet(1) assert next(a) == FiniteSet(2) assert next(a) == FiniteSet(1, 2) a = PowerSet(S.Naturals).__iter__() assert next(a) == S.EmptySet assert next(a) == FiniteSet(1) assert next(a) == FiniteSet(2) assert next(a) == FiniteSet(1, 2) assert next(a) == FiniteSet(3) assert next(a) == FiniteSet(1, 3) assert next(a) == FiniteSet(2, 3) assert next(a) == FiniteSet(1, 2, 3) def test_powerset_contains(): A = PowerSet(FiniteSet(1), evaluate=False) assert A.contains(2) == Contains(2, A) x = Symbol('x') A = PowerSet(FiniteSet(x), evaluate=False) assert A.contains(FiniteSet(1)) == Contains(FiniteSet(1), A) def test_powerset_method(): # EmptySet A = FiniteSet() pset = A.powerset() assert len(pset) == 1 assert pset == FiniteSet(S.EmptySet) # FiniteSets A = FiniteSet(1, 2) pset = A.powerset() assert len(pset) == 2**len(A) assert pset == FiniteSet(FiniteSet(), FiniteSet(1), FiniteSet(2), A) # Not finite sets A = Interval(0, 1) assert A.powerset() == PowerSet(A) def test_is_subset(): # covers line 101-102 # initialize powerset(1), which is a subset of powerset(1,2) subset = PowerSet(FiniteSet(1)) pset = PowerSet(FiniteSet(1, 2)) bad_set = PowerSet(FiniteSet(2, 3)) # assert "subset" is subset of pset == True assert subset.is_subset(pset) # assert "bad_set" is subset of pset == False assert not pset.is_subset(bad_set)