| /dports/math/py-sympy/sympy-1.9/doc/src/tutorial/ |
| H A D | manipulation.rst | 171 "Pow(Symbol(y), NegativeOne())_(2,)" -> "Symbol(y)_(2, 0)";
174 "Pow(Symbol(y), NegativeOne())_(2,)" -> "NegativeOne()_(2, 1)";
178 "Mul(NegativeOne(), Pow(Symbol(x), Integer(2)))_(1,)" -> "NegativeOne()_(1, 0)";
182 …x), Symbol(y)))), Mul(NegativeOne(), Pow(Symbol(x), Integer(2))), Pow(Symbol(y), NegativeOne()))_(…
184 …mbol(x), Symbol(y)))), Mul(NegativeOne(), Pow(Symbol(x), Integer(2))), Pow(Symbol(y), NegativeOne(…
221 "Mul(NegativeOne(), Symbol(y))_(0,)" -> "Symbol(y)_(0, 1)";
222 "Mul(NegativeOne(), Symbol(y))_(0,)" -> "NegativeOne()_(0, 0)";
224 "Add(Mul(NegativeOne(), Symbol(y)), Symbol(x))_()" -> "Mul(NegativeOne(), Symbol(y))_(0,)";
261 "Pow(Symbol(y), NegativeOne())_(1,)" -> "NegativeOne()_(1, 1)";
263 "Mul(Symbol(x), Pow(Symbol(y), NegativeOne()))_()" -> "Pow(Symbol(y), NegativeOne())_(1,)";
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| /dports/math/py-sympy/sympy-1.9/sympy/simplify/ |
| H A D | cse_opts.py | 22 reps[a] = Mul._from_args([S.NegativeOne, na])
36 negs[a] = Mul._from_args([S.One, S.NegativeOne, -a])
47 node.args[0] is S.One and node.args[1] is S.NegativeOne:
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| H A D | fu.py | 971 if s is S.NegativeOne and f.is_Mul and len(f.args) == 2 and \
1016 n_args[i] = S.NegativeOne
1776 if S.NegativeOne in ua.factors:
1777 ua = ua.quo(S.NegativeOne)
1779 elif S.NegativeOne in ub.factors:
1780 ub = ub.quo(S.NegativeOne)
1925 if a in (S.NegativeOne, S.One):
1935 if S.NegativeOne in ua.factors:
1936 ua = ua.quo(S.NegativeOne)
1939 elif S.NegativeOne in ub.factors:
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| H A D | powsimp.py | 166 b not in (S.One, S.NegativeOne)):
201 _n = S.NegativeOne
449 unk.extend([S.NegativeOne]*len(neg))
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| /dports/math/py-sympy/sympy-1.9/sympy/functions/special/ |
| H A D | polynomials.py | 154 return S.NegativeOne**n * jacobi(n, b, a, -x)
372 elif a == S.NegativeOne:
377 if x == S.NegativeOne:
514 return S.NegativeOne**n * chebyshevt(n, -x)
629 if n == S.NegativeOne:
645 if n == S.NegativeOne:
666 kern = S.NegativeOne**k * factorial(
816 return S.NegativeOne**n * legendre(n, -x)
1036 return S.NegativeOne**n * hermite(n, -x)
1146 return S.NegativeOne**n * S.Infinity
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| H A D | spherical_harmonics.py | 143 return S.NegativeOne**m * exp(-2*I*m*phi) * Ynm(n, m, theta, phi)
200 return S.NegativeOne**m * self.func(n, -m, theta, phi)
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| /dports/math/py-sympy/sympy-1.9/sympy/matrices/expressions/ |
| H A D | inverse.py | 33 exp = S.NegativeOne
35 def __new__(cls, mat, exp=S.NegativeOne):
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| /dports/math/py-sympy/sympy-1.9/sympy/functions/elementary/ |
| H A D | trigonometric.py | 1347 return S.NegativeOne - self**2
2176 elif arg is S.NegativeOne:
2264 if arg0 is S.NegativeOne:
2387 elif arg is S.NegativeOne:
2474 if arg0 is S.NegativeOne:
2610 elif arg is S.NegativeOne:
2804 elif arg is S.NegativeOne:
2995 elif arg is S.NegativeOne:
3062 if arg0 is S.NegativeOne:
3160 elif arg is S.NegativeOne:
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| H A D | hyperbolic.py | 554 return S.NegativeOne
773 return S.NegativeOne
1146 elif arg is S.NegativeOne:
1262 elif arg is S.NegativeOne:
1401 elif arg is S.NegativeOne:
1515 elif arg is S.NegativeOne:
1624 elif arg is S.NegativeOne:
1755 elif arg is S.NegativeOne:
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| H A D | exponential.py | 264 return S.NegativeOne
306 return S.NegativeOne
841 nonpos.append(S.NegativeOne)
1104 return S.NegativeOne
1121 if k is S.NegativeOne:
1125 return S.NegativeOne
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| /dports/math/py-sympy/sympy-1.9/sympy/core/tests/ |
| H A D | test_exprtools.py | 57 assert Factors({S.NegativeOne: S(3)})*Factors({S.NegativeOne: S.One, I: S(5)}) == \
69 assert Factors({S.NegativeOne: Rational(3, 2)}) == Factors({I: S.One, S.NegativeOne: S.One})
70 assert Factors({I: S.One, S.NegativeOne: Rational(1, 3)}).as_expr() == I*(-1)**Rational(1, 3)
72 assert Factors(-1.) == Factors({S.NegativeOne: S.One, S(1.): 1})
73 assert Factors(-2.) == Factors({S.NegativeOne: S.One, S(2.): 1})
75 assert Factors(S(-2)) == Factors({S.NegativeOne: S.One, S(2): 1})
77 assert Factors(Rational(3, 2)) == Factors({S(3): S.One, S(2): S.NegativeOne})
80 assert Factors({S.NegativeOne: Rational(-3, 2)}).as_expr() == I
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| /dports/math/py-sympy/sympy-1.9/sympy/physics/quantum/ |
| H A D | grover.py | 12 from sympy.core.numbers import NegativeOne
177 matrixOracle[i, i] = NegativeOne()
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| /dports/math/py-sympy/sympy-1.9/sympy/solvers/tests/ |
| H A D | test_inequalities.py | 204 assert reduce_inequalities(x + 1 > 0) == And(S.NegativeOne < x, x < oo)
240 And(S.NegativeOne < x, x < 1)
242 And(S.NegativeOne <= x, x <= 1)
348 assert isolve(sin(x) >= S.NegativeOne, x, relational=False) == S.Reals
473 assert _pt(S.NegativeOne, oo) == _pt(oo, S.NegativeOne) == Rational(-1, 2)
474 assert _pt(S.NegativeOne, -oo) == _pt(-oo, S.NegativeOne) == -2
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| /dports/math/py-sympy/sympy-1.9/sympy/assumptions/ |
| H A D | refine.py | 153 if expr.base is S.NegativeOne:
195 if p.is_Pow and p.base is S.NegativeOne:
365 return S.NegativeOne
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| /dports/math/py-Diofant/Diofant-0.13.0/diofant/core/ |
| H A D | numbers.py | 342 return S.NegativeOne, (-self,)
690 return Pow(S.NegativeOne, other, evaluate=False)*(
1188 return -self, S.NegativeOne
1231 return S.NegativeOne
1310 result *= S.NegativeOne**other
1473 class NegativeOne(IntegerConstant, metaclass=SingletonWithManagedProperties): class
1524 if p.is_Pow and p.base is S.NegativeOne and p.exp.is_integer:
1873 return S.NegativeOne**other*oo**other
2195 return S.NegativeOne
2499 return S.NegativeOne**(other*S.Half)
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| /dports/math/py-sympy/sympy-1.9/sympy/integrals/tests/ |
| H A D | test_intpoly.py | 205 octahedron = [[(S.NegativeOne / sqrt(2), 0, 0), (0, S.One / sqrt(2), 0),
206 (0, 0, S.NegativeOne / sqrt(2)), (0, 0, S.One / sqrt(2)),
207 (0, S.NegativeOne / sqrt(2), 0), (S.One / sqrt(2), 0, 0)],
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| /dports/math/py-sympy/sympy-1.9/sympy/calculus/ |
| H A D | euler.py | 100 eq = eq + S.NegativeOne**i*diff(L, diff(f, *p), *p)
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| /dports/math/py-Diofant/Diofant-0.13.0/docs/modules/ |
| H A D | core.rst | 138 NegativeOne subsection
141 .. autoclass:: NegativeOne
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| /dports/math/py-sympy/sympy-1.9/sympy/physics/quantum/tests/ |
| H A D | test_qapply.py | 123 expr1 = TensorProduct(Jz*JzKet(S(2),S.NegativeOne)/sqrt(2), Jz*JzKet(S.Half,S.Half))
124 result = Mul(S.NegativeOne, Rational(1, 4), 2**S.Half, hbar**2)
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| /dports/math/py-sympy/sympy-1.9/sympy/core/ |
| H A D | exprtools.py | 99 return S.NegativeOne
253 if exp is S.NegativeOne:
277 if exp is S.NegativeOne:
336 factors[S.NegativeOne] = S.One
347 factors[Integer(n.q)] = S.NegativeOne
386 if a is S.NegativeOne:
396 factors[S.NegativeOne] = S.One
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| H A D | numbers.py | 818 return S.NegativeOne, (-self,)
2039 return -self, S.NegativeOne
2112 return S.NegativeOne
2361 result *= S.NegativeOne**expt
2410 result *= Pow(S.NegativeOne, expt)
2766 return S.NegativeOne
2826 return S.NegativeOne
3227 return {S.NegativeOne: 1, S.Infinity: 1}
3575 return S.NegativeOne
4031 return S.NegativeOne
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| /dports/math/py-sympy/sympy-1.9/doc/src/modules/ |
| H A D | core.rst | 161 NegativeOne subsection
164 .. autoclass:: NegativeOne
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| /dports/math/py-sympy/sympy-1.9/sympy/physics/ |
| H A D | secondquant.py | 1062 return S.NegativeOne*FockState.__new__(cls, occupations)
1209 return S.NegativeOne*self.__class__(new_occs, self.fermi_level)
1752 return S.NegativeOne*KroneckerDelta(a.state, b.state)
1762 return S.NegativeOne*cls(b, a)
1897 return (S.NegativeOne*coeff)*cls(Mul(*newseq))
2827 coeff = S.NegativeOne*c
3008 return S.NegativeOne*expr
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| /dports/math/py-sympy/sympy-1.9/sympy/matrices/expressions/tests/ |
| H A D | test_inverse.py | 17 assert Inverse(C).args == (C, S.NegativeOne)
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| /dports/math/py-sympy/sympy-1.9/sympy/series/ |
| H A D | limits.py | 258 return -expr.args[0] if abs_flag else S.NegativeOne
322 return S.NegativeInfinity*sign(coeff)*S.NegativeOne**(S.One + ex)
|