from sympy.core.singleton import S from sympy.core.basic import Basic from sympy.core.containers import Tuple from sympy.core.function import Lambda, BadSignatureError from sympy.core.logic import fuzzy_bool from sympy.core.relational import Eq from sympy.core.symbol import Dummy from sympy.core.sympify import _sympify from sympy.logic.boolalg import And, as_Boolean from sympy.utilities.iterables import sift, flatten, has_dups from sympy.utilities.exceptions import sympy_deprecation_warning from .contains import Contains from .sets import Set, Union, FiniteSet, SetKind adummy = Dummy('conditionset') class ConditionSet(Set): r""" Set of elements which satisfies a given condition. .. math:: \{x \mid \textrm{condition}(x) = \texttt{True}, x \in S\} Examples ======== >>> from sympy import Symbol, S, ConditionSet, pi, Eq, sin, Interval >>> from sympy.abc import x, y, z >>> sin_sols = ConditionSet(x, Eq(sin(x), 0), Interval(0, 2*pi)) >>> 2*pi in sin_sols True >>> pi/2 in sin_sols False >>> 3*pi in sin_sols False >>> 5 in ConditionSet(x, x**2 > 4, S.Reals) True If the value is not in the base set, the result is false: >>> 5 in ConditionSet(x, x**2 > 4, Interval(2, 4)) False Notes ===== Symbols with assumptions should be avoided or else the condition may evaluate without consideration of the set: >>> n = Symbol('n', negative=True) >>> cond = (n > 0); cond False >>> ConditionSet(n, cond, S.Integers) EmptySet Only free symbols can be changed by using `subs`: >>> c = ConditionSet(x, x < 1, {x, z}) >>> c.subs(x, y) ConditionSet(x, x < 1, {y, z}) To check if ``pi`` is in ``c`` use: >>> pi in c False If no base set is specified, the universal set is implied: >>> ConditionSet(x, x < 1).base_set UniversalSet Only symbols or symbol-like expressions can be used: >>> ConditionSet(x + 1, x + 1 < 1, S.Integers) Traceback (most recent call last): ... ValueError: non-symbol dummy not recognized in condition When the base set is a ConditionSet, the symbols will be unified if possible with preference for the outermost symbols: >>> ConditionSet(x, x < y, ConditionSet(z, z + y < 2, S.Integers)) ConditionSet(x, (x < y) & (x + y < 2), Integers) """ def __new__(cls, sym, condition, base_set=S.UniversalSet): sym = _sympify(sym) flat = flatten([sym]) if has_dups(flat): raise BadSignatureError("Duplicate symbols detected") base_set = _sympify(base_set) if not isinstance(base_set, Set): raise TypeError( 'base set should be a Set object, not %s' % base_set) condition = _sympify(condition) if isinstance(condition, FiniteSet): condition_orig = condition temp = (Eq(lhs, 0) for lhs in condition) condition = And(*temp) sympy_deprecation_warning( f""" Using a set for the condition in ConditionSet is deprecated. Use a boolean instead. In this case, replace {condition_orig} with {condition} """, deprecated_since_version='1.5', active_deprecations_target="deprecated-conditionset-set", ) condition = as_Boolean(condition) if condition is S.true: return base_set if condition is S.false: return S.EmptySet if base_set is S.EmptySet: return S.EmptySet # no simple answers, so now check syms for i in flat: if not getattr(i, '_diff_wrt', False): raise ValueError('`%s` is not symbol-like' % i) if base_set.contains(sym) is S.false: raise TypeError('sym `%s` is not in base_set `%s`' % (sym, base_set)) know = None if isinstance(base_set, FiniteSet): sifted = sift( base_set, lambda _: fuzzy_bool(condition.subs(sym, _))) if sifted[None]: know = FiniteSet(*sifted[True]) base_set = FiniteSet(*sifted[None]) else: return FiniteSet(*sifted[True]) if isinstance(base_set, cls): s, c, b = base_set.args def sig(s): return cls(s, Eq(adummy, 0)).as_dummy().sym sa, sb = map(sig, (sym, s)) if sa != sb: raise BadSignatureError('sym does not match sym of base set') reps = dict(zip(flatten([sym]), flatten([s]))) if s == sym: condition = And(condition, c) base_set = b elif not c.free_symbols & sym.free_symbols: reps = {v: k for k, v in reps.items()} condition = And(condition, c.xreplace(reps)) base_set = b elif not condition.free_symbols & s.free_symbols: sym = sym.xreplace(reps) condition = And(condition.xreplace(reps), c) base_set = b # flatten ConditionSet(Contains(ConditionSet())) expressions if isinstance(condition, Contains) and (sym == condition.args[0]): if isinstance(condition.args[1], Set): return condition.args[1].intersect(base_set) rv = Basic.__new__(cls, sym, condition, base_set) return rv if know is None else Union(know, rv) sym = property(lambda self: self.args[0]) condition = property(lambda self: self.args[1]) base_set = property(lambda self: self.args[2]) @property def free_symbols(self): cond_syms = self.condition.free_symbols - self.sym.free_symbols return cond_syms | self.base_set.free_symbols @property def bound_symbols(self): return flatten([self.sym]) def _contains(self, other): def ok_sig(a, b): tuples = [isinstance(i, Tuple) for i in (a, b)] c = tuples.count(True) if c == 1: return False if c == 0: return True return len(a) == len(b) and all( ok_sig(i, j) for i, j in zip(a, b)) if not ok_sig(self.sym, other): return S.false # try doing base_cond first and return # False immediately if it is False base_cond = Contains(other, self.base_set) if base_cond is S.false: return S.false # Substitute other into condition. This could raise e.g. for # ConditionSet(x, 1/x >= 0, Reals).contains(0) lamda = Lambda((self.sym,), self.condition) try: lambda_cond = lamda(other) except TypeError: return None else: return And(base_cond, lambda_cond) def as_relational(self, other): f = Lambda(self.sym, self.condition) if isinstance(self.sym, Tuple): f = f(*other) else: f = f(other) return And(f, self.base_set.contains(other)) def _eval_subs(self, old, new): sym, cond, base = self.args dsym = sym.subs(old, adummy) insym = dsym.has(adummy) # prioritize changing a symbol in the base newbase = base.subs(old, new) if newbase != base: if not insym: cond = cond.subs(old, new) return self.func(sym, cond, newbase) if insym: pass # no change of bound symbols via subs elif getattr(new, '_diff_wrt', False): cond = cond.subs(old, new) else: pass # let error about the symbol raise from __new__ return self.func(sym, cond, base) def _kind(self): return SetKind(self.sym.kind)