Merged revisions 76755 via svnmerge from

svn+ssh://pythondev@svn.python.org/python/trunk ........ r76755 | mark.dickinson | 2009-12-11 17:29:33 +0000 (Fri, 11 Dec 2009) | 2 lines Issue #3366: Add lgamma function to math module. ........
2009-12-11 20:17:17 +00:00 · 2009-12-11 20:17:17 +00:00 · 05d2e08401
parent e62df2ffaa
commit 05d2e08401
5 changed files with 216 additions and 6 deletions
--- a/Doc/library/math.rst
+++ b/Doc/library/math.rst
@ -288,6 +288,14 @@ Special functions
   .. versionadded:: 3.2
 .. function:: lgamma(x)
   Return the natural logarithm of the absolute value of the Gamma
   function at *x*.
   .. versionadded:: 2.7
 Constants
 ---------
--- a/Lib/test/math_testcases.txt
+++ b/Lib/test/math_testcases.txt
@ -47,6 +47,111 @@
 -- MPFR homepage at http://www.mpfr.org for more information about the
 -- MPFR project.
 ---------------------------------------------------------
 -- lgamma: log of absolute value of the gamma function --
 ---------------------------------------------------------
 -- special values
 lgam0000 lgamma 0.0 -> inf      divide-by-zero
 lgam0001 lgamma -0.0 -> inf     divide-by-zero
 lgam0002 lgamma inf -> inf
 lgam0003 lgamma -inf -> inf
 lgam0004 lgamma nan -> nan
 -- negative integers
 lgam0010 lgamma -1 -> inf       divide-by-zero
 lgam0011 lgamma -2 -> inf       divide-by-zero
 lgam0012 lgamma -1e16 -> inf    divide-by-zero
 lgam0013 lgamma -1e300 -> inf   divide-by-zero
 lgam0014 lgamma -1.79e308 -> inf divide-by-zero
 -- small positive integers give factorials
 lgam0020 lgamma 1 -> 0.0
 lgam0021 lgamma 2 -> 0.0
 lgam0022 lgamma 3 -> 0.69314718055994529
 lgam0023 lgamma 4 -> 1.791759469228055
 lgam0024 lgamma 5 -> 3.1780538303479458
 lgam0025 lgamma 6 -> 4.7874917427820458
 -- half integers
 lgam0030 lgamma 0.5 -> 0.57236494292470008
 lgam0031 lgamma 1.5 -> -0.12078223763524522
 lgam0032 lgamma 2.5 -> 0.28468287047291918
 lgam0033 lgamma 3.5 -> 1.2009736023470743
 lgam0034 lgamma -0.5 -> 1.2655121234846454
 lgam0035 lgamma -1.5 -> 0.86004701537648098
 lgam0036 lgamma -2.5 -> -0.056243716497674054
 lgam0037 lgamma -3.5 -> -1.309006684993042
 -- values near 0
 lgam0040 lgamma 0.1 -> 2.252712651734206
 lgam0041 lgamma 0.01 -> 4.5994798780420219
 lgam0042 lgamma 1e-8 -> 18.420680738180209
 lgam0043 lgamma 1e-16 -> 36.841361487904734
 lgam0044 lgamma 1e-30 -> 69.077552789821368
 lgam0045 lgamma 1e-160 -> 368.41361487904732
 lgam0046 lgamma 1e-308 -> 709.19620864216608
 lgam0047 lgamma 5.6e-309 -> 709.77602713741896
 lgam0048 lgamma 5.5e-309 -> 709.79404564292167
 lgam0049 lgamma 1e-309 -> 711.49879373516012
 lgam0050 lgamma 1e-323 -> 743.74692474082133
 lgam0051 lgamma 5e-324 -> 744.44007192138122
 lgam0060 lgamma -0.1 -> 2.3689613327287886
 lgam0061 lgamma -0.01 -> 4.6110249927528013
 lgam0062 lgamma -1e-8 -> 18.420680749724522
 lgam0063 lgamma -1e-16 -> 36.841361487904734
 lgam0064 lgamma -1e-30 -> 69.077552789821368
 lgam0065 lgamma -1e-160 -> 368.41361487904732
 lgam0066 lgamma -1e-308 -> 709.19620864216608
 lgam0067 lgamma -5.6e-309 -> 709.77602713741896
 lgam0068 lgamma -5.5e-309 -> 709.79404564292167
 lgam0069 lgamma -1e-309 -> 711.49879373516012
 lgam0070 lgamma -1e-323 -> 743.74692474082133
 lgam0071 lgamma -5e-324 -> 744.44007192138122
 -- values near negative integers
 lgam0080 lgamma -0.99999999999999989 -> 36.736800569677101
 lgam0081 lgamma -1.0000000000000002 -> 36.043653389117154
 lgam0082 lgamma -1.9999999999999998 -> 35.350506208557213
 lgam0083 lgamma -2.0000000000000004 -> 34.657359027997266
 lgam0084 lgamma -100.00000000000001 -> -331.85460524980607
 lgam0085 lgamma -99.999999999999986 -> -331.85460524980596
 -- large inputs
 lgam0100 lgamma 170 -> 701.43726380873704
 lgam0101 lgamma 171 -> 706.57306224578736
 lgam0102 lgamma 171.624 -> 709.78077443669895
 lgam0103 lgamma 171.625 -> 709.78591682948365
 lgam0104 lgamma 172 -> 711.71472580228999
 lgam0105 lgamma 2000 -> 13198.923448054265
 lgam0106 lgamma 2.55998332785163e305 -> 1.7976931348623099e+308
 lgam0107 lgamma 2.55998332785164e305 -> inf overflow
 lgam0108 lgamma 1.7e308 -> inf overflow
 -- inputs for which gamma(x) is tiny
 lgam0120 lgamma -100.5 -> -364.90096830942736
 lgam0121 lgamma -160.5 -> -656.88005261126432
 lgam0122 lgamma -170.5 -> -707.99843314507882
 lgam0123 lgamma -171.5 -> -713.14301641168481
 lgam0124 lgamma -176.5 -> -738.95247590846486
 lgam0125 lgamma -177.5 -> -744.13144651738037
 lgam0126 lgamma -178.5 -> -749.3160351186001
 lgam0130 lgamma -1000.5 -> -5914.4377011168517
 lgam0131 lgamma -30000.5 -> -279278.6629959144
 lgam0132 lgamma -4503599627370495.5 -> -1.5782258434492883e+17
 -- results close to 0:  positive argument ...
 lgam0150 lgamma 0.99999999999999989 -> 6.4083812134800075e-17
 lgam0151 lgamma 1.0000000000000002 -> -1.2816762426960008e-16
 lgam0152 lgamma 1.9999999999999998 -> -9.3876980655431170e-17
 lgam0153 lgamma 2.0000000000000004 -> 1.8775396131086244e-16
 -- ... and negative argument
 lgam0160 lgamma -2.7476826467 -> -5.2477408147689136e-11
 lgam0161 lgamma -2.457024738 -> 3.3464637541912932e-10
 ---------------------------
 -- gamma: Gamma function --
 ---------------------------
--- a/Lib/test/test_math.py
+++ b/Lib/test/test_math.py
@ -48,6 +48,36 @@ def to_ulps(x):
        n = ~(n+2**63)
    return n
 def ulps_check(expected, got, ulps=20):
    """Given non-NaN floats `expected` and `got`,
    check that they're equal to within the given number of ulps.
    Returns None on success and an error message on failure."""
    ulps_error = to_ulps(got) - to_ulps(expected)
    if abs(ulps_error) <= ulps:
        return None
    return "error = {} ulps; permitted error = {} ulps".format(ulps_error,
                                                               ulps)
 def acc_check(expected, got, rel_err=2e-15, abs_err = 5e-323):
    """Determine whether non-NaN floats a and b are equal to within a
    (small) rounding error.  The default values for rel_err and
    abs_err are chosen to be suitable for platforms where a float is
    represented by an IEEE 754 double.  They allow an error of between
    9 and 19 ulps."""
    # need to special case infinities, since inf - inf gives nan
    if math.isinf(expected) and got == expected:
        return None
    error = got - expected
    permitted_error = max(abs_err, rel_err * abs(expected))
    if abs(error) < permitted_error:
        return None
    return "error = {}; permitted error = {}".format(error,
                                                     permitted_error)
 def parse_mtestfile(fname):
    """Parse a file with test values
@ -949,13 +979,23 @@ class MathTests(unittest.TestCase):
            except OverflowError:
                got = 'OverflowError'
-            diff_ulps = None
+            accuracy_failure = None
            if isinstance(got, float) and isinstance(expected, float):
                if math.isnan(expected) and math.isnan(got):
                    continue
                if not math.isnan(expected) and not math.isnan(got):
-                    diff_ulps = to_ulps(expected) - to_ulps(got)
+                    # we use different closeness criteria for
-                    if abs(diff_ulps) <= ALLOWED_ERROR:
+                    # different functions.
                    if fn == 'gamma':
                        accuracy_failure = ulps_check(expected, got, 20)
                    elif fn == 'lgamma':
                        accuracy_failure = acc_check(expected, got,
                                                  rel_err = 5e-15,
                                                  abs_err = 5e-15)
                    else:
                        raise ValueError("don't know how to check accuracy "
                                         "for this function")
                    if accuracy_failure is None:
                        continue
            if isinstance(got, str) and isinstance(expected, str):
@ -963,8 +1003,8 @@ class MathTests(unittest.TestCase):
                    continue
            fail_msg = fail_fmt.format(id, fn, arg, expected, got)
-            if diff_ulps is not None:
+            if accuracy_failure is not None:
-                fail_msg += ' ({} ulps)'.format(diff_ulps)
+                fail_msg += ' ({})'.format(accuracy_failure)
            failures.append(fail_msg)
        if failures:
--- a/Misc/NEWS
+++ b/Misc/NEWS
@ -443,7 +443,7 @@ Extension Modules
 - Issue #7078: Set struct.__doc__ from _struct.__doc__.
- Issue #3366: Add gamma function to math module.
+- Issue #3366: Add gamma, lgamma functions to math module.
 - Issue #6877: It is now possible to link the readline extension to the
  libedit readline emulation on OSX 10.5 or later.
--- a/Modules/mathmodule.c
+++ b/Modules/mathmodule.c
@ -321,6 +321,60 @@ m_tgamma(double x)
 	return r;
 }
 /*
   lgamma:  natural log of the absolute value of the Gamma function.
   For large arguments, Lanczos' formula works extremely well here.
 */
 static double
 m_lgamma(double x)
 {
 	double r, absx;
 	/* special cases */
 	if (!Py_IS_FINITE(x)) {
 		if (Py_IS_NAN(x))
 			return x;  /* lgamma(nan) = nan */
 		else
 			return Py_HUGE_VAL; /* lgamma(+-inf) = +inf */
 	}
 	/* integer arguments */
 	if (x == floor(x) && x <= 2.0) {
 		if (x <= 0.0) {
 			errno = EDOM;  /* lgamma(n) = inf, divide-by-zero for */
 			return Py_HUGE_VAL; /* integers n <= 0 */
 		}
 		else {
 			return 0.0; /* lgamma(1) = lgamma(2) = 0.0 */
 		}
 	}
 	absx = fabs(x);
 	/* tiny arguments: lgamma(x) ~ -log(fabs(x)) for small x */
 	if (absx < 1e-20)
 		return -log(absx);
 	/* Lanczos' formula */
 	if (x > 0.0) {
 		/* we could save a fraction of a ulp in accuracy by having a
 		   second set of numerator coefficients for lanczos_sum that
 		   absorbed the exp(-lanczos_g) term, and throwing out the
 		   lanczos_g subtraction below; it's probably not worth it. */
 		r = log(lanczos_sum(x)) - lanczos_g +
 			(x-0.5)*(log(x+lanczos_g-0.5)-1);
 	}
 	else {
 		r = log(pi) - log(fabs(sinpi(absx))) - log(absx) -
 			(log(lanczos_sum(absx)) - lanczos_g +
 			 (absx-0.5)*(log(absx+lanczos_g-0.5)-1));
 	}
 	if (Py_IS_INFINITY(r))
 		errno = ERANGE;
 	return r;
 }
 /*
   wrapper for atan2 that deals directly with special cases before
   delegating to the platform libm for the remaining cases.  This
@ -694,6 +748,8 @@ PyDoc_STRVAR(math_floor_doc,
 FUNC1A(gamma, m_tgamma,
      "gamma(x)\n\nGamma function at x.")
 FUNC1A(lgamma, m_lgamma,
      "lgamma(x)\n\nNatural logarithm of absolute value of Gamma function at x.")
 FUNC1(log1p, log1p, 1,
      "log1p(x)\n\nReturn the natural logarithm of 1+x (base e).\n"
      "The result is computed in a way which is accurate for x near zero.")
@ -1448,6 +1504,7 @@ static PyMethodDef math_methods[] = {
 	{"isinf",	math_isinf,	METH_O,		math_isinf_doc},
 	{"isnan",	math_isnan,	METH_O,		math_isnan_doc},
 	{"ldexp",	math_ldexp,	METH_VARARGS,	math_ldexp_doc},
 	{"lgamma",	math_lgamma,	METH_O,		math_lgamma_doc},
 	{"log",		math_log,	METH_VARARGS,	math_log_doc},
 	{"log1p",	math_log1p,	METH_O,		math_log1p_doc},
 	{"log10",	math_log10,	METH_O,		math_log10_doc},