543 lines
17 KiB
Python
543 lines
17 KiB
Python
"""
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Implement the cmath module functions.
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"""
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import cmath
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import math
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from numba.core.imputils import Registry, impl_ret_untracked
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from numba.core import types, cgutils
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from numba.core.typing import signature
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from numba.cpython import builtins, mathimpl
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from numba.core.extending import overload
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registry = Registry('cmathimpl')
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lower = registry.lower
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def is_nan(builder, z):
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return builder.fcmp_unordered('uno', z.real, z.imag)
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def is_inf(builder, z):
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return builder.or_(mathimpl.is_inf(builder, z.real),
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mathimpl.is_inf(builder, z.imag))
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def is_finite(builder, z):
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return builder.and_(mathimpl.is_finite(builder, z.real),
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mathimpl.is_finite(builder, z.imag))
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@lower(cmath.isnan, types.Complex)
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def isnan_float_impl(context, builder, sig, args):
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[typ] = sig.args
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[value] = args
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z = context.make_complex(builder, typ, value=value)
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res = is_nan(builder, z)
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return impl_ret_untracked(context, builder, sig.return_type, res)
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@lower(cmath.isinf, types.Complex)
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def isinf_float_impl(context, builder, sig, args):
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[typ] = sig.args
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[value] = args
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z = context.make_complex(builder, typ, value=value)
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res = is_inf(builder, z)
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return impl_ret_untracked(context, builder, sig.return_type, res)
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@lower(cmath.isfinite, types.Complex)
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def isfinite_float_impl(context, builder, sig, args):
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[typ] = sig.args
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[value] = args
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z = context.make_complex(builder, typ, value=value)
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res = is_finite(builder, z)
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return impl_ret_untracked(context, builder, sig.return_type, res)
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@overload(cmath.rect)
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def impl_cmath_rect(r, phi):
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if all([isinstance(typ, types.Float) for typ in [r, phi]]):
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def impl(r, phi):
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if not math.isfinite(phi):
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if not r:
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# cmath.rect(0, phi={inf, nan}) = 0
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return abs(r)
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if math.isinf(r):
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# cmath.rect(inf, phi={inf, nan}) = inf + j phi
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return complex(r, phi)
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real = math.cos(phi)
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imag = math.sin(phi)
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if real == 0. and math.isinf(r):
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# 0 * inf would return NaN, we want to keep 0 but xor the sign
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real /= r
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else:
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real *= r
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if imag == 0. and math.isinf(r):
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# ditto
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imag /= r
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else:
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imag *= r
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return complex(real, imag)
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return impl
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def intrinsic_complex_unary(inner_func):
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def wrapper(context, builder, sig, args):
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[typ] = sig.args
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[value] = args
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z = context.make_complex(builder, typ, value=value)
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x = z.real
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y = z.imag
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# Same as above: math.isfinite() is unavailable on 2.x so we precompute
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# its value and pass it to the pure Python implementation.
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x_is_finite = mathimpl.is_finite(builder, x)
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y_is_finite = mathimpl.is_finite(builder, y)
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inner_sig = signature(sig.return_type,
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*(typ.underlying_float,) * 2 + (types.boolean,) * 2)
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res = context.compile_internal(builder, inner_func, inner_sig,
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(x, y, x_is_finite, y_is_finite))
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return impl_ret_untracked(context, builder, sig, res)
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return wrapper
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NAN = float('nan')
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INF = float('inf')
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@lower(cmath.exp, types.Complex)
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@intrinsic_complex_unary
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def exp_impl(x, y, x_is_finite, y_is_finite):
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"""cmath.exp(x + y j)"""
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if x_is_finite:
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if y_is_finite:
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c = math.cos(y)
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s = math.sin(y)
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r = math.exp(x)
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return complex(r * c, r * s)
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else:
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return complex(NAN, NAN)
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elif math.isnan(x):
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if y:
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return complex(x, x) # nan + j nan
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else:
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return complex(x, y) # nan + 0j
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elif x > 0.0:
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# x == +inf
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if y_is_finite:
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real = math.cos(y)
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imag = math.sin(y)
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# Avoid NaNs if math.cos(y) or math.sin(y) == 0
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# (e.g. cmath.exp(inf + 0j) == inf + 0j)
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if real != 0:
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real *= x
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if imag != 0:
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imag *= x
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return complex(real, imag)
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else:
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return complex(x, NAN)
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else:
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# x == -inf
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if y_is_finite:
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r = math.exp(x)
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c = math.cos(y)
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s = math.sin(y)
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return complex(r * c, r * s)
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else:
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r = 0
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return complex(r, r)
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@lower(cmath.log, types.Complex)
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@intrinsic_complex_unary
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def log_impl(x, y, x_is_finite, y_is_finite):
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"""cmath.log(x + y j)"""
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a = math.log(math.hypot(x, y))
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b = math.atan2(y, x)
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return complex(a, b)
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@lower(cmath.log, types.Complex, types.Complex)
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def log_base_impl(context, builder, sig, args):
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"""cmath.log(z, base)"""
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[z, base] = args
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def log_base(z, base):
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return cmath.log(z) / cmath.log(base)
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res = context.compile_internal(builder, log_base, sig, args)
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return impl_ret_untracked(context, builder, sig, res)
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@overload(cmath.log10)
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def impl_cmath_log10(z):
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if not isinstance(z, types.Complex):
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return
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LN_10 = 2.302585092994045684
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def log10_impl(z):
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"""cmath.log10(z)"""
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z = cmath.log(z)
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# This formula gives better results on +/-inf than cmath.log(z, 10)
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# See http://bugs.python.org/issue22544
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return complex(z.real / LN_10, z.imag / LN_10)
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return log10_impl
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@overload(cmath.phase)
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def phase_impl(x):
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"""cmath.phase(x + y j)"""
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if not isinstance(x, types.Complex):
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return
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def impl(x):
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return math.atan2(x.imag, x.real)
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return impl
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@overload(cmath.polar)
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def polar_impl(x):
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if not isinstance(x, types.Complex):
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return
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def impl(x):
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r, i = x.real, x.imag
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return math.hypot(r, i), math.atan2(i, r)
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return impl
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@lower(cmath.sqrt, types.Complex)
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def sqrt_impl(context, builder, sig, args):
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# We risk spurious overflow for components >= FLT_MAX / (1 + sqrt(2)).
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SQRT2 = 1.414213562373095048801688724209698079E0
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ONE_PLUS_SQRT2 = (1. + SQRT2)
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theargflt = sig.args[0].underlying_float
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# Get a type specific maximum value so scaling for overflow is based on that
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MAX = mathimpl.DBL_MAX if theargflt.bitwidth == 64 else mathimpl.FLT_MAX
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# THRES will be double precision, should not impact typing as it's just
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# used for comparison, there *may* be a few values near THRES which
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# deviate from e.g. NumPy due to rounding that occurs in the computation
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# of this value in the case of a 32bit argument.
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THRES = MAX / ONE_PLUS_SQRT2
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def sqrt_impl(z):
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"""cmath.sqrt(z)"""
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# This is NumPy's algorithm, see npy_csqrt() in npy_math_complex.c.src
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a = z.real
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b = z.imag
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if a == 0.0 and b == 0.0:
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return complex(abs(b), b)
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if math.isinf(b):
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return complex(abs(b), b)
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if math.isnan(a):
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return complex(a, a)
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if math.isinf(a):
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if a < 0.0:
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return complex(abs(b - b), math.copysign(a, b))
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else:
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return complex(a, math.copysign(b - b, b))
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# The remaining special case (b is NaN) is handled just fine by
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# the normal code path below.
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# Scale to avoid overflow
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if abs(a) >= THRES or abs(b) >= THRES:
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a *= 0.25
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b *= 0.25
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scale = True
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else:
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scale = False
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# Algorithm 312, CACM vol 10, Oct 1967
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if a >= 0:
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t = math.sqrt((a + math.hypot(a, b)) * 0.5)
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real = t
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imag = b / (2 * t)
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else:
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t = math.sqrt((-a + math.hypot(a, b)) * 0.5)
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real = abs(b) / (2 * t)
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imag = math.copysign(t, b)
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# Rescale
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if scale:
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return complex(real * 2, imag)
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else:
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return complex(real, imag)
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res = context.compile_internal(builder, sqrt_impl, sig, args)
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return impl_ret_untracked(context, builder, sig, res)
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@lower(cmath.cos, types.Complex)
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def cos_impl(context, builder, sig, args):
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def cos_impl(z):
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"""cmath.cos(z) = cmath.cosh(z j)"""
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return cmath.cosh(complex(-z.imag, z.real))
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res = context.compile_internal(builder, cos_impl, sig, args)
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return impl_ret_untracked(context, builder, sig, res)
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@overload(cmath.cosh)
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def impl_cmath_cosh(z):
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if not isinstance(z, types.Complex):
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return
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def cosh_impl(z):
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"""cmath.cosh(z)"""
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x = z.real
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y = z.imag
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if math.isinf(x):
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if math.isnan(y):
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# x = +inf, y = NaN => cmath.cosh(x + y j) = inf + Nan * j
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real = abs(x)
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imag = y
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elif y == 0.0:
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# x = +inf, y = 0 => cmath.cosh(x + y j) = inf + 0j
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real = abs(x)
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imag = y
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else:
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real = math.copysign(x, math.cos(y))
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imag = math.copysign(x, math.sin(y))
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if x < 0.0:
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# x = -inf => negate imaginary part of result
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imag = -imag
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return complex(real, imag)
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return complex(math.cos(y) * math.cosh(x),
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math.sin(y) * math.sinh(x))
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return cosh_impl
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@lower(cmath.sin, types.Complex)
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def sin_impl(context, builder, sig, args):
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def sin_impl(z):
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"""cmath.sin(z) = -j * cmath.sinh(z j)"""
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r = cmath.sinh(complex(-z.imag, z.real))
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return complex(r.imag, -r.real)
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res = context.compile_internal(builder, sin_impl, sig, args)
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return impl_ret_untracked(context, builder, sig, res)
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@overload(cmath.sinh)
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def impl_cmath_sinh(z):
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if not isinstance(z, types.Complex):
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return
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def sinh_impl(z):
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"""cmath.sinh(z)"""
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x = z.real
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y = z.imag
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if math.isinf(x):
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if math.isnan(y):
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# x = +/-inf, y = NaN => cmath.sinh(x + y j) = x + NaN * j
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real = x
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imag = y
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else:
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real = math.cos(y)
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imag = math.sin(y)
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if real != 0.:
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real *= x
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if imag != 0.:
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imag *= abs(x)
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return complex(real, imag)
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return complex(math.cos(y) * math.sinh(x),
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math.sin(y) * math.cosh(x))
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return sinh_impl
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@lower(cmath.tan, types.Complex)
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def tan_impl(context, builder, sig, args):
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def tan_impl(z):
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"""cmath.tan(z) = -j * cmath.tanh(z j)"""
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r = cmath.tanh(complex(-z.imag, z.real))
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return complex(r.imag, -r.real)
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res = context.compile_internal(builder, tan_impl, sig, args)
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return impl_ret_untracked(context, builder, sig, res)
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@overload(cmath.tanh)
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def impl_cmath_tanh(z):
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if not isinstance(z, types.Complex):
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return
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def tanh_impl(z):
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"""cmath.tanh(z)"""
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x = z.real
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y = z.imag
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if math.isinf(x):
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real = math.copysign(1., x)
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if math.isinf(y):
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imag = 0.
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else:
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imag = math.copysign(0., math.sin(2. * y))
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return complex(real, imag)
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# This is CPython's algorithm (see c_tanh() in cmathmodule.c).
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# XXX how to force float constants into single precision?
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tx = math.tanh(x)
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ty = math.tan(y)
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cx = 1. / math.cosh(x)
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txty = tx * ty
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denom = 1. + txty * txty
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return complex(
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tx * (1. + ty * ty) / denom,
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((ty / denom) * cx) * cx)
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return tanh_impl
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@lower(cmath.acos, types.Complex)
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def acos_impl(context, builder, sig, args):
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LN_4 = math.log(4)
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THRES = mathimpl.FLT_MAX / 4
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def acos_impl(z):
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"""cmath.acos(z)"""
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# CPython's algorithm (see c_acos() in cmathmodule.c)
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if abs(z.real) > THRES or abs(z.imag) > THRES:
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# Avoid unnecessary overflow for large arguments
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# (also handles infinities gracefully)
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real = math.atan2(abs(z.imag), z.real)
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imag = math.copysign(
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math.log(math.hypot(z.real * 0.5, z.imag * 0.5)) + LN_4,
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-z.imag)
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return complex(real, imag)
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else:
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s1 = cmath.sqrt(complex(1. - z.real, -z.imag))
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s2 = cmath.sqrt(complex(1. + z.real, z.imag))
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real = 2. * math.atan2(s1.real, s2.real)
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imag = math.asinh(s2.real * s1.imag - s2.imag * s1.real)
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return complex(real, imag)
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res = context.compile_internal(builder, acos_impl, sig, args)
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return impl_ret_untracked(context, builder, sig, res)
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@overload(cmath.acosh)
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def impl_cmath_acosh(z):
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if not isinstance(z, types.Complex):
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return
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LN_4 = math.log(4)
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THRES = mathimpl.FLT_MAX / 4
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def acosh_impl(z):
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"""cmath.acosh(z)"""
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# CPython's algorithm (see c_acosh() in cmathmodule.c)
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if abs(z.real) > THRES or abs(z.imag) > THRES:
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# Avoid unnecessary overflow for large arguments
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# (also handles infinities gracefully)
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real = math.log(math.hypot(z.real * 0.5, z.imag * 0.5)) + LN_4
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imag = math.atan2(z.imag, z.real)
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return complex(real, imag)
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else:
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s1 = cmath.sqrt(complex(z.real - 1., z.imag))
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s2 = cmath.sqrt(complex(z.real + 1., z.imag))
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real = math.asinh(s1.real * s2.real + s1.imag * s2.imag)
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imag = 2. * math.atan2(s1.imag, s2.real)
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return complex(real, imag)
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# Condensed formula (NumPy)
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#return cmath.log(z + cmath.sqrt(z + 1.) * cmath.sqrt(z - 1.))
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return acosh_impl
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@lower(cmath.asinh, types.Complex)
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def asinh_impl(context, builder, sig, args):
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LN_4 = math.log(4)
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THRES = mathimpl.FLT_MAX / 4
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def asinh_impl(z):
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"""cmath.asinh(z)"""
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# CPython's algorithm (see c_asinh() in cmathmodule.c)
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if abs(z.real) > THRES or abs(z.imag) > THRES:
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real = math.copysign(
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math.log(math.hypot(z.real * 0.5, z.imag * 0.5)) + LN_4,
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z.real)
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imag = math.atan2(z.imag, abs(z.real))
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return complex(real, imag)
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else:
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s1 = cmath.sqrt(complex(1. + z.imag, -z.real))
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s2 = cmath.sqrt(complex(1. - z.imag, z.real))
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real = math.asinh(s1.real * s2.imag - s2.real * s1.imag)
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imag = math.atan2(z.imag, s1.real * s2.real - s1.imag * s2.imag)
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return complex(real, imag)
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res = context.compile_internal(builder, asinh_impl, sig, args)
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return impl_ret_untracked(context, builder, sig, res)
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@lower(cmath.asin, types.Complex)
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def asin_impl(context, builder, sig, args):
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def asin_impl(z):
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"""cmath.asin(z) = -j * cmath.asinh(z j)"""
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r = cmath.asinh(complex(-z.imag, z.real))
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return complex(r.imag, -r.real)
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res = context.compile_internal(builder, asin_impl, sig, args)
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return impl_ret_untracked(context, builder, sig, res)
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@lower(cmath.atan, types.Complex)
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def atan_impl(context, builder, sig, args):
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def atan_impl(z):
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"""cmath.atan(z) = -j * cmath.atanh(z j)"""
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r = cmath.atanh(complex(-z.imag, z.real))
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if math.isinf(z.real) and math.isnan(z.imag):
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# XXX this is odd but necessary
|
|
return complex(r.imag, r.real)
|
|
else:
|
|
return complex(r.imag, -r.real)
|
|
|
|
res = context.compile_internal(builder, atan_impl, sig, args)
|
|
return impl_ret_untracked(context, builder, sig, res)
|
|
|
|
@lower(cmath.atanh, types.Complex)
|
|
def atanh_impl(context, builder, sig, args):
|
|
LN_4 = math.log(4)
|
|
THRES_LARGE = math.sqrt(mathimpl.FLT_MAX / 4)
|
|
THRES_SMALL = math.sqrt(mathimpl.FLT_MIN)
|
|
PI_12 = math.pi / 2
|
|
|
|
def atanh_impl(z):
|
|
"""cmath.atanh(z)"""
|
|
# CPython's algorithm (see c_atanh() in cmathmodule.c)
|
|
if z.real < 0.:
|
|
# Reduce to case where z.real >= 0., using atanh(z) = -atanh(-z).
|
|
negate = True
|
|
z = -z
|
|
else:
|
|
negate = False
|
|
|
|
ay = abs(z.imag)
|
|
if math.isnan(z.real) or z.real > THRES_LARGE or ay > THRES_LARGE:
|
|
if math.isinf(z.imag):
|
|
real = math.copysign(0., z.real)
|
|
elif math.isinf(z.real):
|
|
real = 0.
|
|
else:
|
|
# may be safe from overflow, depending on hypot's implementation...
|
|
h = math.hypot(z.real * 0.5, z.imag * 0.5)
|
|
real = z.real/4./h/h
|
|
imag = -math.copysign(PI_12, -z.imag)
|
|
elif z.real == 1. and ay < THRES_SMALL:
|
|
# C99 standard says: atanh(1+/-0.) should be inf +/- 0j
|
|
if ay == 0.:
|
|
real = INF
|
|
imag = z.imag
|
|
else:
|
|
real = -math.log(math.sqrt(ay) /
|
|
math.sqrt(math.hypot(ay, 2.)))
|
|
imag = math.copysign(math.atan2(2., -ay) / 2, z.imag)
|
|
else:
|
|
sqay = ay * ay
|
|
zr1 = 1 - z.real
|
|
real = math.log1p(4. * z.real / (zr1 * zr1 + sqay)) * 0.25
|
|
imag = -math.atan2(-2. * z.imag,
|
|
zr1 * (1 + z.real) - sqay) * 0.5
|
|
|
|
if math.isnan(z.imag):
|
|
imag = NAN
|
|
if negate:
|
|
return complex(-real, -imag)
|
|
else:
|
|
return complex(real, imag)
|
|
|
|
res = context.compile_internal(builder, atanh_impl, sig, args)
|
|
return impl_ret_untracked(context, builder, sig, res)
|