419 lines
14 KiB
Python
419 lines
14 KiB
Python
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from __future__ import division, print_function, absolute_import
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import sys
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import math
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import numpy as np
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from numpy import sqrt, cos, sin, arctan, exp, log, pi, Inf
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from numpy.testing import (assert_,
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assert_allclose, assert_array_less, assert_almost_equal)
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import pytest
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from pytest import raises as assert_raises
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from scipy.integrate import quad, dblquad, tplquad, nquad
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from scipy._lib.six import xrange
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from scipy._lib._ccallback import LowLevelCallable
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import ctypes
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import ctypes.util
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from scipy._lib._ccallback_c import sine_ctypes
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import scipy.integrate._test_multivariate as clib_test
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def assert_quad(value_and_err, tabled_value, errTol=1.5e-8):
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value, err = value_and_err
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assert_allclose(value, tabled_value, atol=err, rtol=0)
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if errTol is not None:
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assert_array_less(err, errTol)
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def get_clib_test_routine(name, restype, *argtypes):
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ptr = getattr(clib_test, name)
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return ctypes.cast(ptr, ctypes.CFUNCTYPE(restype, *argtypes))
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class TestCtypesQuad(object):
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def setup_method(self):
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if sys.platform == 'win32':
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if sys.version_info < (3, 5):
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files = [ctypes.util.find_msvcrt()]
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else:
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files = ['api-ms-win-crt-math-l1-1-0.dll']
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elif sys.platform == 'darwin':
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files = ['libm.dylib']
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else:
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files = ['libm.so', 'libm.so.6']
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for file in files:
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try:
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self.lib = ctypes.CDLL(file)
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break
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except OSError:
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pass
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else:
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# This test doesn't work on some Linux platforms (Fedora for
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# example) that put an ld script in libm.so - see gh-5370
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self.skipTest("Ctypes can't import libm.so")
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restype = ctypes.c_double
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argtypes = (ctypes.c_double,)
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for name in ['sin', 'cos', 'tan']:
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func = getattr(self.lib, name)
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func.restype = restype
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func.argtypes = argtypes
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def test_typical(self):
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assert_quad(quad(self.lib.sin, 0, 5), quad(math.sin, 0, 5)[0])
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assert_quad(quad(self.lib.cos, 0, 5), quad(math.cos, 0, 5)[0])
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assert_quad(quad(self.lib.tan, 0, 1), quad(math.tan, 0, 1)[0])
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def test_ctypes_sine(self):
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quad(LowLevelCallable(sine_ctypes), 0, 1)
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def test_ctypes_variants(self):
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sin_0 = get_clib_test_routine('_sin_0', ctypes.c_double,
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ctypes.c_double, ctypes.c_void_p)
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sin_1 = get_clib_test_routine('_sin_1', ctypes.c_double,
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ctypes.c_int, ctypes.POINTER(ctypes.c_double),
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ctypes.c_void_p)
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sin_2 = get_clib_test_routine('_sin_2', ctypes.c_double,
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ctypes.c_double)
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sin_3 = get_clib_test_routine('_sin_3', ctypes.c_double,
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ctypes.c_int, ctypes.POINTER(ctypes.c_double))
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sin_4 = get_clib_test_routine('_sin_3', ctypes.c_double,
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ctypes.c_int, ctypes.c_double)
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all_sigs = [sin_0, sin_1, sin_2, sin_3, sin_4]
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legacy_sigs = [sin_2, sin_4]
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legacy_only_sigs = [sin_4]
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# LowLevelCallables work for new signatures
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for j, func in enumerate(all_sigs):
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callback = LowLevelCallable(func)
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if func in legacy_only_sigs:
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assert_raises(ValueError, quad, callback, 0, pi)
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else:
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assert_allclose(quad(callback, 0, pi)[0], 2.0)
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# Plain ctypes items work only for legacy signatures
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for j, func in enumerate(legacy_sigs):
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if func in legacy_sigs:
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assert_allclose(quad(func, 0, pi)[0], 2.0)
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else:
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assert_raises(ValueError, quad, func, 0, pi)
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class TestMultivariateCtypesQuad(object):
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def setup_method(self):
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restype = ctypes.c_double
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argtypes = (ctypes.c_int, ctypes.c_double)
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for name in ['_multivariate_typical', '_multivariate_indefinite',
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'_multivariate_sin']:
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func = get_clib_test_routine(name, restype, *argtypes)
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setattr(self, name, func)
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def test_typical(self):
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# 1) Typical function with two extra arguments:
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assert_quad(quad(self._multivariate_typical, 0, pi, (2, 1.8)),
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0.30614353532540296487)
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def test_indefinite(self):
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# 2) Infinite integration limits --- Euler's constant
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assert_quad(quad(self._multivariate_indefinite, 0, Inf),
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0.577215664901532860606512)
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def test_threadsafety(self):
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# Ensure multivariate ctypes are threadsafe
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def threadsafety(y):
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return y + quad(self._multivariate_sin, 0, 1)[0]
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assert_quad(quad(threadsafety, 0, 1), 0.9596976941318602)
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class TestQuad(object):
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def test_typical(self):
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# 1) Typical function with two extra arguments:
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def myfunc(x, n, z): # Bessel function integrand
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return cos(n*x-z*sin(x))/pi
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assert_quad(quad(myfunc, 0, pi, (2, 1.8)), 0.30614353532540296487)
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def test_indefinite(self):
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# 2) Infinite integration limits --- Euler's constant
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def myfunc(x): # Euler's constant integrand
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return -exp(-x)*log(x)
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assert_quad(quad(myfunc, 0, Inf), 0.577215664901532860606512)
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def test_singular(self):
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# 3) Singular points in region of integration.
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def myfunc(x):
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if 0 < x < 2.5:
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return sin(x)
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elif 2.5 <= x <= 5.0:
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return exp(-x)
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else:
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return 0.0
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assert_quad(quad(myfunc, 0, 10, points=[2.5, 5.0]),
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1 - cos(2.5) + exp(-2.5) - exp(-5.0))
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def test_sine_weighted_finite(self):
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# 4) Sine weighted integral (finite limits)
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def myfunc(x, a):
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return exp(a*(x-1))
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ome = 2.0**3.4
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assert_quad(quad(myfunc, 0, 1, args=20, weight='sin', wvar=ome),
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(20*sin(ome)-ome*cos(ome)+ome*exp(-20))/(20**2 + ome**2))
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def test_sine_weighted_infinite(self):
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# 5) Sine weighted integral (infinite limits)
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def myfunc(x, a):
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return exp(-x*a)
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a = 4.0
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ome = 3.0
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assert_quad(quad(myfunc, 0, Inf, args=a, weight='sin', wvar=ome),
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ome/(a**2 + ome**2))
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def test_cosine_weighted_infinite(self):
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# 6) Cosine weighted integral (negative infinite limits)
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def myfunc(x, a):
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return exp(x*a)
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a = 2.5
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ome = 2.3
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assert_quad(quad(myfunc, -Inf, 0, args=a, weight='cos', wvar=ome),
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a/(a**2 + ome**2))
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def test_algebraic_log_weight(self):
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# 6) Algebraic-logarithmic weight.
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def myfunc(x, a):
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return 1/(1+x+2**(-a))
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a = 1.5
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assert_quad(quad(myfunc, -1, 1, args=a, weight='alg',
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wvar=(-0.5, -0.5)),
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pi/sqrt((1+2**(-a))**2 - 1))
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def test_cauchypv_weight(self):
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# 7) Cauchy prinicpal value weighting w(x) = 1/(x-c)
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def myfunc(x, a):
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return 2.0**(-a)/((x-1)**2+4.0**(-a))
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a = 0.4
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tabledValue = ((2.0**(-0.4)*log(1.5) -
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2.0**(-1.4)*log((4.0**(-a)+16) / (4.0**(-a)+1)) -
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arctan(2.0**(a+2)) -
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arctan(2.0**a)) /
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(4.0**(-a) + 1))
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assert_quad(quad(myfunc, 0, 5, args=0.4, weight='cauchy', wvar=2.0),
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tabledValue, errTol=1.9e-8)
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def test_b_less_than_a(self):
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def f(x, p, q):
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return p * np.exp(-q*x)
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val_1, err_1 = quad(f, 0, np.inf, args=(2, 3))
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val_2, err_2 = quad(f, np.inf, 0, args=(2, 3))
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assert_allclose(val_1, -val_2, atol=max(err_1, err_2))
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def test_b_less_than_a_2(self):
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def f(x, s):
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return np.exp(-x**2 / 2 / s) / np.sqrt(2.*s)
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val_1, err_1 = quad(f, -np.inf, np.inf, args=(2,))
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val_2, err_2 = quad(f, np.inf, -np.inf, args=(2,))
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assert_allclose(val_1, -val_2, atol=max(err_1, err_2))
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def test_b_less_than_a_3(self):
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def f(x):
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return 1.0
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val_1, err_1 = quad(f, 0, 1, weight='alg', wvar=(0, 0))
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val_2, err_2 = quad(f, 1, 0, weight='alg', wvar=(0, 0))
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assert_allclose(val_1, -val_2, atol=max(err_1, err_2))
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def test_b_less_than_a_full_output(self):
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def f(x):
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return 1.0
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res_1 = quad(f, 0, 1, weight='alg', wvar=(0, 0), full_output=True)
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res_2 = quad(f, 1, 0, weight='alg', wvar=(0, 0), full_output=True)
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err = max(res_1[1], res_2[1])
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assert_allclose(res_1[0], -res_2[0], atol=err)
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def test_double_integral(self):
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# 8) Double Integral test
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def simpfunc(y, x): # Note order of arguments.
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return x+y
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a, b = 1.0, 2.0
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assert_quad(dblquad(simpfunc, a, b, lambda x: x, lambda x: 2*x),
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5/6.0 * (b**3.0-a**3.0))
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def test_double_integral2(self):
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def func(x0, x1, t0, t1):
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return x0 + x1 + t0 + t1
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g = lambda x: x
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h = lambda x: 2 * x
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args = 1, 2
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assert_quad(dblquad(func, 1, 2, g, h, args=args),35./6 + 9*.5)
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def test_double_integral3(self):
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def func(x0, x1):
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return x0 + x1 + 1 + 2
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assert_quad(dblquad(func, 1, 2, 1, 2),6.)
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def test_triple_integral(self):
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# 9) Triple Integral test
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def simpfunc(z, y, x, t): # Note order of arguments.
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return (x+y+z)*t
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a, b = 1.0, 2.0
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assert_quad(tplquad(simpfunc, a, b,
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lambda x: x, lambda x: 2*x,
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lambda x, y: x - y, lambda x, y: x + y,
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(2.,)),
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2*8/3.0 * (b**4.0 - a**4.0))
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class TestNQuad(object):
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def test_fixed_limits(self):
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def func1(x0, x1, x2, x3):
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val = (x0**2 + x1*x2 - x3**3 + np.sin(x0) +
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(1 if (x0 - 0.2*x3 - 0.5 - 0.25*x1 > 0) else 0))
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return val
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def opts_basic(*args):
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return {'points': [0.2*args[2] + 0.5 + 0.25*args[0]]}
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res = nquad(func1, [[0, 1], [-1, 1], [.13, .8], [-.15, 1]],
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opts=[opts_basic, {}, {}, {}], full_output=True)
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assert_quad(res[:-1], 1.5267454070738635)
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assert_(res[-1]['neval'] > 0 and res[-1]['neval'] < 4e5)
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def test_variable_limits(self):
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scale = .1
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def func2(x0, x1, x2, x3, t0, t1):
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val = (x0*x1*x3**2 + np.sin(x2) + 1 +
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(1 if x0 + t1*x1 - t0 > 0 else 0))
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return val
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def lim0(x1, x2, x3, t0, t1):
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return [scale * (x1**2 + x2 + np.cos(x3)*t0*t1 + 1) - 1,
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scale * (x1**2 + x2 + np.cos(x3)*t0*t1 + 1) + 1]
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def lim1(x2, x3, t0, t1):
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return [scale * (t0*x2 + t1*x3) - 1,
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scale * (t0*x2 + t1*x3) + 1]
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def lim2(x3, t0, t1):
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return [scale * (x3 + t0**2*t1**3) - 1,
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scale * (x3 + t0**2*t1**3) + 1]
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def lim3(t0, t1):
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return [scale * (t0 + t1) - 1, scale * (t0 + t1) + 1]
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def opts0(x1, x2, x3, t0, t1):
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return {'points': [t0 - t1*x1]}
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def opts1(x2, x3, t0, t1):
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return {}
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def opts2(x3, t0, t1):
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return {}
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def opts3(t0, t1):
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return {}
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res = nquad(func2, [lim0, lim1, lim2, lim3], args=(0, 0),
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opts=[opts0, opts1, opts2, opts3])
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assert_quad(res, 25.066666666666663)
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def test_square_separate_ranges_and_opts(self):
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def f(y, x):
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return 1.0
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assert_quad(nquad(f, [[-1, 1], [-1, 1]], opts=[{}, {}]), 4.0)
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def test_square_aliased_ranges_and_opts(self):
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def f(y, x):
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return 1.0
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r = [-1, 1]
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opt = {}
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assert_quad(nquad(f, [r, r], opts=[opt, opt]), 4.0)
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def test_square_separate_fn_ranges_and_opts(self):
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def f(y, x):
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return 1.0
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def fn_range0(*args):
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return (-1, 1)
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def fn_range1(*args):
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return (-1, 1)
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def fn_opt0(*args):
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return {}
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def fn_opt1(*args):
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return {}
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ranges = [fn_range0, fn_range1]
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opts = [fn_opt0, fn_opt1]
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assert_quad(nquad(f, ranges, opts=opts), 4.0)
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def test_square_aliased_fn_ranges_and_opts(self):
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def f(y, x):
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return 1.0
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def fn_range(*args):
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return (-1, 1)
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def fn_opt(*args):
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return {}
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ranges = [fn_range, fn_range]
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opts = [fn_opt, fn_opt]
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assert_quad(nquad(f, ranges, opts=opts), 4.0)
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def test_matching_quad(self):
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def func(x):
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return x**2 + 1
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res, reserr = quad(func, 0, 4)
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res2, reserr2 = nquad(func, ranges=[[0, 4]])
|
||
|
assert_almost_equal(res, res2)
|
||
|
assert_almost_equal(reserr, reserr2)
|
||
|
|
||
|
def test_matching_dblquad(self):
|
||
|
def func2d(x0, x1):
|
||
|
return x0**2 + x1**3 - x0 * x1 + 1
|
||
|
|
||
|
res, reserr = dblquad(func2d, -2, 2, lambda x: -3, lambda x: 3)
|
||
|
res2, reserr2 = nquad(func2d, [[-3, 3], (-2, 2)])
|
||
|
assert_almost_equal(res, res2)
|
||
|
assert_almost_equal(reserr, reserr2)
|
||
|
|
||
|
def test_matching_tplquad(self):
|
||
|
def func3d(x0, x1, x2, c0, c1):
|
||
|
return x0**2 + c0 * x1**3 - x0 * x1 + 1 + c1 * np.sin(x2)
|
||
|
|
||
|
res = tplquad(func3d, -1, 2, lambda x: -2, lambda x: 2,
|
||
|
lambda x, y: -np.pi, lambda x, y: np.pi,
|
||
|
args=(2, 3))
|
||
|
res2 = nquad(func3d, [[-np.pi, np.pi], [-2, 2], (-1, 2)], args=(2, 3))
|
||
|
assert_almost_equal(res, res2)
|
||
|
|
||
|
def test_dict_as_opts(self):
|
||
|
try:
|
||
|
out = nquad(lambda x, y: x * y, [[0, 1], [0, 1]], opts={'epsrel': 0.0001})
|
||
|
except(TypeError):
|
||
|
assert False
|
||
|
|