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673 lines
18 KiB
673 lines
18 KiB
5 months ago
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"""
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This module complements the math and cmath builtin modules by providing
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fast machine precision versions of some additional functions (gamma, ...)
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and wrapping math/cmath functions so that they can be called with either
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real or complex arguments.
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"""
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import operator
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import math
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import cmath
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# Irrational (?) constants
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pi = 3.1415926535897932385
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e = 2.7182818284590452354
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sqrt2 = 1.4142135623730950488
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sqrt5 = 2.2360679774997896964
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phi = 1.6180339887498948482
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ln2 = 0.69314718055994530942
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ln10 = 2.302585092994045684
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euler = 0.57721566490153286061
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catalan = 0.91596559417721901505
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khinchin = 2.6854520010653064453
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apery = 1.2020569031595942854
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logpi = 1.1447298858494001741
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def _mathfun_real(f_real, f_complex):
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def f(x, **kwargs):
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if type(x) is float:
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return f_real(x)
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if type(x) is complex:
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return f_complex(x)
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try:
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x = float(x)
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return f_real(x)
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except (TypeError, ValueError):
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x = complex(x)
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return f_complex(x)
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f.__name__ = f_real.__name__
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return f
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def _mathfun(f_real, f_complex):
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def f(x, **kwargs):
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if type(x) is complex:
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return f_complex(x)
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try:
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return f_real(float(x))
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except (TypeError, ValueError):
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return f_complex(complex(x))
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f.__name__ = f_real.__name__
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return f
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def _mathfun_n(f_real, f_complex):
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def f(*args, **kwargs):
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try:
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return f_real(*(float(x) for x in args))
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except (TypeError, ValueError):
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return f_complex(*(complex(x) for x in args))
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f.__name__ = f_real.__name__
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return f
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# Workaround for non-raising log and sqrt in Python 2.5 and 2.4
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# on Unix system
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try:
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math.log(-2.0)
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def math_log(x):
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if x <= 0.0:
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raise ValueError("math domain error")
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return math.log(x)
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def math_sqrt(x):
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if x < 0.0:
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raise ValueError("math domain error")
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return math.sqrt(x)
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except (ValueError, TypeError):
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math_log = math.log
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math_sqrt = math.sqrt
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pow = _mathfun_n(operator.pow, lambda x, y: complex(x)**y)
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log = _mathfun_n(math_log, cmath.log)
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sqrt = _mathfun(math_sqrt, cmath.sqrt)
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exp = _mathfun_real(math.exp, cmath.exp)
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cos = _mathfun_real(math.cos, cmath.cos)
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sin = _mathfun_real(math.sin, cmath.sin)
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tan = _mathfun_real(math.tan, cmath.tan)
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acos = _mathfun(math.acos, cmath.acos)
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asin = _mathfun(math.asin, cmath.asin)
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atan = _mathfun_real(math.atan, cmath.atan)
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cosh = _mathfun_real(math.cosh, cmath.cosh)
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sinh = _mathfun_real(math.sinh, cmath.sinh)
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tanh = _mathfun_real(math.tanh, cmath.tanh)
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floor = _mathfun_real(math.floor,
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lambda z: complex(math.floor(z.real), math.floor(z.imag)))
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ceil = _mathfun_real(math.ceil,
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lambda z: complex(math.ceil(z.real), math.ceil(z.imag)))
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cos_sin = _mathfun_real(lambda x: (math.cos(x), math.sin(x)),
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lambda z: (cmath.cos(z), cmath.sin(z)))
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cbrt = _mathfun(lambda x: x**(1./3), lambda z: z**(1./3))
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def nthroot(x, n):
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r = 1./n
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try:
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return float(x) ** r
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except (ValueError, TypeError):
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return complex(x) ** r
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def _sinpi_real(x):
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if x < 0:
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return -_sinpi_real(-x)
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n, r = divmod(x, 0.5)
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r *= pi
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n %= 4
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if n == 0: return math.sin(r)
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if n == 1: return math.cos(r)
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if n == 2: return -math.sin(r)
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if n == 3: return -math.cos(r)
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def _cospi_real(x):
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if x < 0:
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x = -x
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n, r = divmod(x, 0.5)
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r *= pi
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n %= 4
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if n == 0: return math.cos(r)
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if n == 1: return -math.sin(r)
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if n == 2: return -math.cos(r)
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if n == 3: return math.sin(r)
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def _sinpi_complex(z):
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if z.real < 0:
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return -_sinpi_complex(-z)
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n, r = divmod(z.real, 0.5)
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z = pi*complex(r, z.imag)
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n %= 4
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if n == 0: return cmath.sin(z)
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if n == 1: return cmath.cos(z)
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if n == 2: return -cmath.sin(z)
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if n == 3: return -cmath.cos(z)
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def _cospi_complex(z):
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if z.real < 0:
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z = -z
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n, r = divmod(z.real, 0.5)
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z = pi*complex(r, z.imag)
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n %= 4
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if n == 0: return cmath.cos(z)
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if n == 1: return -cmath.sin(z)
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if n == 2: return -cmath.cos(z)
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if n == 3: return cmath.sin(z)
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cospi = _mathfun_real(_cospi_real, _cospi_complex)
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sinpi = _mathfun_real(_sinpi_real, _sinpi_complex)
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def tanpi(x):
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try:
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return sinpi(x) / cospi(x)
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except OverflowError:
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if complex(x).imag > 10:
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return 1j
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if complex(x).imag < 10:
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return -1j
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raise
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def cotpi(x):
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try:
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return cospi(x) / sinpi(x)
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except OverflowError:
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if complex(x).imag > 10:
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return -1j
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if complex(x).imag < 10:
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return 1j
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raise
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INF = 1e300*1e300
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NINF = -INF
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NAN = INF-INF
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EPS = 2.2204460492503131e-16
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_exact_gamma = (INF, 1.0, 1.0, 2.0, 6.0, 24.0, 120.0, 720.0, 5040.0, 40320.0,
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362880.0, 3628800.0, 39916800.0, 479001600.0, 6227020800.0, 87178291200.0,
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1307674368000.0, 20922789888000.0, 355687428096000.0, 6402373705728000.0,
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121645100408832000.0, 2432902008176640000.0)
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_max_exact_gamma = len(_exact_gamma)-1
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# Lanczos coefficients used by the GNU Scientific Library
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_lanczos_g = 7
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_lanczos_p = (0.99999999999980993, 676.5203681218851, -1259.1392167224028,
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771.32342877765313, -176.61502916214059, 12.507343278686905,
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-0.13857109526572012, 9.9843695780195716e-6, 1.5056327351493116e-7)
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def _gamma_real(x):
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_intx = int(x)
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if _intx == x:
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if _intx <= 0:
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#return (-1)**_intx * INF
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raise ZeroDivisionError("gamma function pole")
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if _intx <= _max_exact_gamma:
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return _exact_gamma[_intx]
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if x < 0.5:
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# TODO: sinpi
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return pi / (_sinpi_real(x)*_gamma_real(1-x))
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else:
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x -= 1.0
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r = _lanczos_p[0]
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for i in range(1, _lanczos_g+2):
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r += _lanczos_p[i]/(x+i)
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t = x + _lanczos_g + 0.5
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return 2.506628274631000502417 * t**(x+0.5) * math.exp(-t) * r
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def _gamma_complex(x):
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if not x.imag:
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return complex(_gamma_real(x.real))
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if x.real < 0.5:
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# TODO: sinpi
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return pi / (_sinpi_complex(x)*_gamma_complex(1-x))
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else:
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x -= 1.0
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r = _lanczos_p[0]
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for i in range(1, _lanczos_g+2):
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r += _lanczos_p[i]/(x+i)
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t = x + _lanczos_g + 0.5
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return 2.506628274631000502417 * t**(x+0.5) * cmath.exp(-t) * r
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gamma = _mathfun_real(_gamma_real, _gamma_complex)
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def rgamma(x):
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try:
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return 1./gamma(x)
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except ZeroDivisionError:
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return x*0.0
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def factorial(x):
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return gamma(x+1.0)
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def arg(x):
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if type(x) is float:
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return math.atan2(0.0,x)
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return math.atan2(x.imag,x.real)
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# XXX: broken for negatives
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def loggamma(x):
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if type(x) not in (float, complex):
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try:
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x = float(x)
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except (ValueError, TypeError):
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x = complex(x)
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try:
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xreal = x.real
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ximag = x.imag
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except AttributeError: # py2.5
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xreal = x
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ximag = 0.0
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# Reflection formula
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# http://functions.wolfram.com/GammaBetaErf/LogGamma/16/01/01/0003/
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if xreal < 0.0:
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if abs(x) < 0.5:
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v = log(gamma(x))
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if ximag == 0:
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v = v.conjugate()
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return v
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z = 1-x
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try:
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re = z.real
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im = z.imag
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except AttributeError: # py2.5
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re = z
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im = 0.0
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refloor = floor(re)
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if im == 0.0:
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imsign = 0
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elif im < 0.0:
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imsign = -1
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else:
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imsign = 1
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return (-pi*1j)*abs(refloor)*(1-abs(imsign)) + logpi - \
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log(sinpi(z-refloor)) - loggamma(z) + 1j*pi*refloor*imsign
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if x == 1.0 or x == 2.0:
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return x*0
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p = 0.
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while abs(x) < 11:
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p -= log(x)
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x += 1.0
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s = 0.918938533204672742 + (x-0.5)*log(x) - x
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r = 1./x
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r2 = r*r
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s += 0.083333333333333333333*r; r *= r2
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s += -0.0027777777777777777778*r; r *= r2
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s += 0.00079365079365079365079*r; r *= r2
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s += -0.0005952380952380952381*r; r *= r2
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s += 0.00084175084175084175084*r; r *= r2
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s += -0.0019175269175269175269*r; r *= r2
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s += 0.0064102564102564102564*r; r *= r2
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s += -0.02955065359477124183*r
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return s + p
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_psi_coeff = [
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0.083333333333333333333,
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-0.0083333333333333333333,
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0.003968253968253968254,
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-0.0041666666666666666667,
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0.0075757575757575757576,
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-0.021092796092796092796,
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0.083333333333333333333,
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-0.44325980392156862745,
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3.0539543302701197438,
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-26.456212121212121212]
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def _digamma_real(x):
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_intx = int(x)
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if _intx == x:
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if _intx <= 0:
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raise ZeroDivisionError("polygamma pole")
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if x < 0.5:
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x = 1.0-x
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s = pi*cotpi(x)
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else:
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s = 0.0
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while x < 10.0:
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s -= 1.0/x
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x += 1.0
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x2 = x**-2
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t = x2
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for c in _psi_coeff:
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s -= c*t
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if t < 1e-20:
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break
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t *= x2
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return s + math_log(x) - 0.5/x
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def _digamma_complex(x):
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if not x.imag:
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return complex(_digamma_real(x.real))
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if x.real < 0.5:
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x = 1.0-x
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s = pi*cotpi(x)
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else:
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s = 0.0
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while abs(x) < 10.0:
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s -= 1.0/x
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x += 1.0
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x2 = x**-2
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t = x2
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for c in _psi_coeff:
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s -= c*t
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if abs(t) < 1e-20:
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break
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t *= x2
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return s + cmath.log(x) - 0.5/x
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digamma = _mathfun_real(_digamma_real, _digamma_complex)
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# TODO: could implement complex erf and erfc here. Need
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# to find an accurate method (avoiding cancellation)
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# for approx. 1 < abs(x) < 9.
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_erfc_coeff_P = [
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1.0000000161203922312,
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2.1275306946297962644,
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2.2280433377390253297,
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1.4695509105618423961,
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0.66275911699770787537,
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0.20924776504163751585,
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0.045459713768411264339,
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0.0063065951710717791934,
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0.00044560259661560421715][::-1]
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_erfc_coeff_Q = [
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1.0000000000000000000,
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3.2559100272784894318,
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4.9019435608903239131,
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4.4971472894498014205,
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2.7845640601891186528,
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1.2146026030046904138,
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0.37647108453729465912,
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0.080970149639040548613,
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0.011178148899483545902,
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0.00078981003831980423513][::-1]
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def _polyval(coeffs, x):
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p = coeffs[0]
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for c in coeffs[1:]:
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p = c + x*p
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return p
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def _erf_taylor(x):
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# Taylor series assuming 0 <= x <= 1
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x2 = x*x
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s = t = x
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n = 1
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while abs(t) > 1e-17:
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t *= x2/n
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s -= t/(n+n+1)
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n += 1
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t *= x2/n
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s += t/(n+n+1)
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n += 1
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return 1.1283791670955125739*s
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def _erfc_mid(x):
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# Rational approximation assuming 0 <= x <= 9
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return exp(-x*x)*_polyval(_erfc_coeff_P,x)/_polyval(_erfc_coeff_Q,x)
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def _erfc_asymp(x):
|
||
|
# Asymptotic expansion assuming x >= 9
|
||
|
x2 = x*x
|
||
|
v = exp(-x2)/x*0.56418958354775628695
|
||
|
r = t = 0.5 / x2
|
||
|
s = 1.0
|
||
|
for n in range(1,22,4):
|
||
|
s -= t
|
||
|
t *= r * (n+2)
|
||
|
s += t
|
||
|
t *= r * (n+4)
|
||
|
if abs(t) < 1e-17:
|
||
|
break
|
||
|
return s * v
|
||
|
|
||
|
def erf(x):
|
||
|
"""
|
||
|
erf of a real number.
|
||
|
"""
|
||
|
x = float(x)
|
||
|
if x != x:
|
||
|
return x
|
||
|
if x < 0.0:
|
||
|
return -erf(-x)
|
||
|
if x >= 1.0:
|
||
|
if x >= 6.0:
|
||
|
return 1.0
|
||
|
return 1.0 - _erfc_mid(x)
|
||
|
return _erf_taylor(x)
|
||
|
|
||
|
def erfc(x):
|
||
|
"""
|
||
|
erfc of a real number.
|
||
|
"""
|
||
|
x = float(x)
|
||
|
if x != x:
|
||
|
return x
|
||
|
if x < 0.0:
|
||
|
if x < -6.0:
|
||
|
return 2.0
|
||
|
return 2.0-erfc(-x)
|
||
|
if x > 9.0:
|
||
|
return _erfc_asymp(x)
|
||
|
if x >= 1.0:
|
||
|
return _erfc_mid(x)
|
||
|
return 1.0 - _erf_taylor(x)
|
||
|
|
||
|
gauss42 = [\
|
||
|
(0.99839961899006235, 0.0041059986046490839),
|
||
|
(-0.99839961899006235, 0.0041059986046490839),
|
||
|
(0.9915772883408609, 0.009536220301748501),
|
||
|
(-0.9915772883408609,0.009536220301748501),
|
||
|
(0.97934250806374812, 0.014922443697357493),
|
||
|
(-0.97934250806374812, 0.014922443697357493),
|
||
|
(0.96175936533820439,0.020227869569052644),
|
||
|
(-0.96175936533820439, 0.020227869569052644),
|
||
|
(0.93892355735498811, 0.025422959526113047),
|
||
|
(-0.93892355735498811,0.025422959526113047),
|
||
|
(0.91095972490412735, 0.030479240699603467),
|
||
|
(-0.91095972490412735, 0.030479240699603467),
|
||
|
(0.87802056981217269,0.03536907109759211),
|
||
|
(-0.87802056981217269, 0.03536907109759211),
|
||
|
(0.8402859832618168, 0.040065735180692258),
|
||
|
(-0.8402859832618168,0.040065735180692258),
|
||
|
(0.7979620532554873, 0.044543577771965874),
|
||
|
(-0.7979620532554873, 0.044543577771965874),
|
||
|
(0.75127993568948048,0.048778140792803244),
|
||
|
(-0.75127993568948048, 0.048778140792803244),
|
||
|
(0.70049459055617114, 0.052746295699174064),
|
||
|
(-0.70049459055617114,0.052746295699174064),
|
||
|
(0.64588338886924779, 0.056426369358018376),
|
||
|
(-0.64588338886924779, 0.056426369358018376),
|
||
|
(0.58774459748510932, 0.059798262227586649),
|
||
|
(-0.58774459748510932, 0.059798262227586649),
|
||
|
(0.5263957499311922, 0.062843558045002565),
|
||
|
(-0.5263957499311922, 0.062843558045002565),
|
||
|
(0.46217191207042191, 0.065545624364908975),
|
||
|
(-0.46217191207042191, 0.065545624364908975),
|
||
|
(0.39542385204297503, 0.067889703376521934),
|
||
|
(-0.39542385204297503, 0.067889703376521934),
|
||
|
(0.32651612446541151, 0.069862992492594159),
|
||
|
(-0.32651612446541151, 0.069862992492594159),
|
||
|
(0.25582507934287907, 0.071454714265170971),
|
||
|
(-0.25582507934287907, 0.071454714265170971),
|
||
|
(0.18373680656485453, 0.072656175243804091),
|
||
|
(-0.18373680656485453, 0.072656175243804091),
|
||
|
(0.11064502720851986, 0.073460813453467527),
|
||
|
(-0.11064502720851986, 0.073460813453467527),
|
||
|
(0.036948943165351772, 0.073864234232172879),
|
||
|
(-0.036948943165351772, 0.073864234232172879)]
|
||
|
|
||
|
EI_ASYMP_CONVERGENCE_RADIUS = 40.0
|
||
|
|
||
|
def ei_asymp(z, _e1=False):
|
||
|
r = 1./z
|
||
|
s = t = 1.0
|
||
|
k = 1
|
||
|
while 1:
|
||
|
t *= k*r
|
||
|
s += t
|
||
|
if abs(t) < 1e-16:
|
||
|
break
|
||
|
k += 1
|
||
|
v = s*exp(z)/z
|
||
|
if _e1:
|
||
|
if type(z) is complex:
|
||
|
zreal = z.real
|
||
|
zimag = z.imag
|
||
|
else:
|
||
|
zreal = z
|
||
|
zimag = 0.0
|
||
|
if zimag == 0.0 and zreal > 0.0:
|
||
|
v += pi*1j
|
||
|
else:
|
||
|
if type(z) is complex:
|
||
|
if z.imag > 0:
|
||
|
v += pi*1j
|
||
|
if z.imag < 0:
|
||
|
v -= pi*1j
|
||
|
return v
|
||
|
|
||
|
def ei_taylor(z, _e1=False):
|
||
|
s = t = z
|
||
|
k = 2
|
||
|
while 1:
|
||
|
t = t*z/k
|
||
|
term = t/k
|
||
|
if abs(term) < 1e-17:
|
||
|
break
|
||
|
s += term
|
||
|
k += 1
|
||
|
s += euler
|
||
|
if _e1:
|
||
|
s += log(-z)
|
||
|
else:
|
||
|
if type(z) is float or z.imag == 0.0:
|
||
|
s += math_log(abs(z))
|
||
|
else:
|
||
|
s += cmath.log(z)
|
||
|
return s
|
||
|
|
||
|
def ei(z, _e1=False):
|
||
|
typez = type(z)
|
||
|
if typez not in (float, complex):
|
||
|
try:
|
||
|
z = float(z)
|
||
|
typez = float
|
||
|
except (TypeError, ValueError):
|
||
|
z = complex(z)
|
||
|
typez = complex
|
||
|
if not z:
|
||
|
return -INF
|
||
|
absz = abs(z)
|
||
|
if absz > EI_ASYMP_CONVERGENCE_RADIUS:
|
||
|
return ei_asymp(z, _e1)
|
||
|
elif absz <= 2.0 or (typez is float and z > 0.0):
|
||
|
return ei_taylor(z, _e1)
|
||
|
# Integrate, starting from whichever is smaller of a Taylor
|
||
|
# series value or an asymptotic series value
|
||
|
if typez is complex and z.real > 0.0:
|
||
|
zref = z / absz
|
||
|
ref = ei_taylor(zref, _e1)
|
||
|
else:
|
||
|
zref = EI_ASYMP_CONVERGENCE_RADIUS * z / absz
|
||
|
ref = ei_asymp(zref, _e1)
|
||
|
C = (zref-z)*0.5
|
||
|
D = (zref+z)*0.5
|
||
|
s = 0.0
|
||
|
if type(z) is complex:
|
||
|
_exp = cmath.exp
|
||
|
else:
|
||
|
_exp = math.exp
|
||
|
for x,w in gauss42:
|
||
|
t = C*x+D
|
||
|
s += w*_exp(t)/t
|
||
|
ref -= C*s
|
||
|
return ref
|
||
|
|
||
|
def e1(z):
|
||
|
# hack to get consistent signs if the imaginary part if 0
|
||
|
# and signed
|
||
|
typez = type(z)
|
||
|
if type(z) not in (float, complex):
|
||
|
try:
|
||
|
z = float(z)
|
||
|
typez = float
|
||
|
except (TypeError, ValueError):
|
||
|
z = complex(z)
|
||
|
typez = complex
|
||
|
if typez is complex and not z.imag:
|
||
|
z = complex(z.real, 0.0)
|
||
|
# end hack
|
||
|
return -ei(-z, _e1=True)
|
||
|
|
||
|
_zeta_int = [\
|
||
|
-0.5,
|
||
|
0.0,
|
||
|
1.6449340668482264365,1.2020569031595942854,1.0823232337111381915,
|
||
|
1.0369277551433699263,1.0173430619844491397,1.0083492773819228268,
|
||
|
1.0040773561979443394,1.0020083928260822144,1.0009945751278180853,
|
||
|
1.0004941886041194646,1.0002460865533080483,1.0001227133475784891,
|
||
|
1.0000612481350587048,1.0000305882363070205,1.0000152822594086519,
|
||
|
1.0000076371976378998,1.0000038172932649998,1.0000019082127165539,
|
||
|
1.0000009539620338728,1.0000004769329867878,1.0000002384505027277,
|
||
|
1.0000001192199259653,1.0000000596081890513,1.0000000298035035147,
|
||
|
1.0000000149015548284]
|
||
|
|
||
|
_zeta_P = [-3.50000000087575873, -0.701274355654678147,
|
||
|
-0.0672313458590012612, -0.00398731457954257841,
|
||
|
-0.000160948723019303141, -4.67633010038383371e-6,
|
||
|
-1.02078104417700585e-7, -1.68030037095896287e-9,
|
||
|
-1.85231868742346722e-11][::-1]
|
||
|
|
||
|
_zeta_Q = [1.00000000000000000, -0.936552848762465319,
|
||
|
-0.0588835413263763741, -0.00441498861482948666,
|
||
|
-0.000143416758067432622, -5.10691659585090782e-6,
|
||
|
-9.58813053268913799e-8, -1.72963791443181972e-9,
|
||
|
-1.83527919681474132e-11][::-1]
|
||
|
|
||
|
_zeta_1 = [3.03768838606128127e-10, -1.21924525236601262e-8,
|
||
|
2.01201845887608893e-7, -1.53917240683468381e-6,
|
||
|
-5.09890411005967954e-7, 0.000122464707271619326,
|
||
|
-0.000905721539353130232, -0.00239315326074843037,
|
||
|
0.084239750013159168, 0.418938517907442414, 0.500000001921884009]
|
||
|
|
||
|
_zeta_0 = [-3.46092485016748794e-10, -6.42610089468292485e-9,
|
||
|
1.76409071536679773e-7, -1.47141263991560698e-6, -6.38880222546167613e-7,
|
||
|
0.000122641099800668209, -0.000905894913516772796, -0.00239303348507992713,
|
||
|
0.0842396947501199816, 0.418938533204660256, 0.500000000000000052]
|
||
|
|
||
|
def zeta(s):
|
||
|
"""
|
||
|
Riemann zeta function, real argument
|
||
|
"""
|
||
|
if not isinstance(s, (float, int)):
|
||
|
try:
|
||
|
s = float(s)
|
||
|
except (ValueError, TypeError):
|
||
|
try:
|
||
|
s = complex(s)
|
||
|
if not s.imag:
|
||
|
return complex(zeta(s.real))
|
||
|
except (ValueError, TypeError):
|
||
|
pass
|
||
|
raise NotImplementedError
|
||
|
if s == 1:
|
||
|
raise ValueError("zeta(1) pole")
|
||
|
if s >= 27:
|
||
|
return 1.0 + 2.0**(-s) + 3.0**(-s)
|
||
|
n = int(s)
|
||
|
if n == s:
|
||
|
if n >= 0:
|
||
|
return _zeta_int[n]
|
||
|
if not (n % 2):
|
||
|
return 0.0
|
||
|
if s <= 0.0:
|
||
|
return 2.**s*pi**(s-1)*_sinpi_real(0.5*s)*_gamma_real(1-s)*zeta(1-s)
|
||
|
if s <= 2.0:
|
||
|
if s <= 1.0:
|
||
|
return _polyval(_zeta_0,s)/(s-1)
|
||
|
return _polyval(_zeta_1,s)/(s-1)
|
||
|
z = _polyval(_zeta_P,s) / _polyval(_zeta_Q,s)
|
||
|
return 1.0 + 2.0**(-s) + 3.0**(-s) + 4.0**(-s)*z
|