| blob | 350034fd96ab1954e0eec724f592d44784f6ffa2 |
1 /* Math module -- standard C math library functions, pi and e */
3 /* Here are some comments from Tim Peters, extracted from the
4 discussion attached to http://bugs.python.org/issue1640. They
5 describe the general aims of the math module with respect to
6 special values, IEEE-754 floating-point exceptions, and Python
7 exceptions.
9 These are the "spirit of 754" rules:
11 1. If the mathematical result is a real number, but of magnitude too
12 large to approximate by a machine float, overflow is signaled and the
13 result is an infinity (with the appropriate sign).
15 2. If the mathematical result is a real number, but of magnitude too
16 small to approximate by a machine float, underflow is signaled and the
17 result is a zero (with the appropriate sign).
19 3. At a singularity (a value x such that the limit of f(y) as y
20 approaches x exists and is an infinity), "divide by zero" is signaled
21 and the result is an infinity (with the appropriate sign). This is
22 complicated a little by that the left-side and right-side limits may
23 not be the same; e.g., 1/x approaches +inf or -inf as x approaches 0
24 from the positive or negative directions. In that specific case, the
25 sign of the zero determines the result of 1/0.
27 4. At a point where a function has no defined result in the extended
28 reals (i.e., the reals plus an infinity or two), invalid operation is
29 signaled and a NaN is returned.
31 And these are what Python has historically /tried/ to do (but not
32 always successfully, as platform libm behavior varies a lot):
34 For #1, raise OverflowError.
36 For #2, return a zero (with the appropriate sign if that happens by
37 accident ;-)).
39 For #3 and #4, raise ValueError. It may have made sense to raise
40 Python's ZeroDivisionError in #3, but historically that's only been
41 raised for division by zero and mod by zero.
43 */
45 /*
46 In general, on an IEEE-754 platform the aim is to follow the C99
47 standard, including Annex 'F', whenever possible. Where the
48 standard recommends raising the 'divide-by-zero' or 'invalid'
49 floating-point exceptions, Python should raise a ValueError. Where
50 the standard recommends raising 'overflow', Python should raise an
51 OverflowError. In all other circumstances a value should be
52 returned.
53 */
58 #ifdef _OSF_SOURCE
59 /* OSF1 5.1 doesn't make this available with XOPEN_SOURCE_EXTENDED defined */
61 #endif
63 /*
64 sin(pi*x), giving accurate results for all finite x (especially x
65 integral or close to an integer). This is here for use in the
66 reflection formula for the gamma function. It conforms to IEEE
67 754-2008 for finite arguments, but not for infinities or nans.
68 */
72 static double
74 {
77 /* this function should only ever be called for finite arguments */
90 /* N.B. -sin(pi*(y-1.0)) is *not* equivalent: it would give
91 -0.0 instead of 0.0 when y == 1.0. */
103 }
105 }
107 /* Implementation of the real gamma function. In extensive but non-exhaustive
108 random tests, this function proved accurate to within <= 10 ulps across the
109 entire float domain. Note that accuracy may depend on the quality of the
110 system math functions, the pow function in particular. Special cases
111 follow C99 annex F. The parameters and method are tailored to platforms
112 whose double format is the IEEE 754 binary64 format.
114 Method: for x > 0.0 we use the Lanczos approximation with parameters N=13
115 and g=6.024680040776729583740234375; these parameters are amongst those
116 used by the Boost library. Following Boost (again), we re-express the
117 Lanczos sum as a rational function, and compute it that way. The
118 coefficients below were computed independently using MPFR, and have been
119 double-checked against the coefficients in the Boost source code.
121 For x < 0.0 we use the reflection formula.
123 There's one minor tweak that deserves explanation: Lanczos' formula for
124 Gamma(x) involves computing pow(x+g-0.5, x-0.5) / exp(x+g-0.5). For many x
125 values, x+g-0.5 can be represented exactly. However, in cases where it
126 can't be represented exactly the small error in x+g-0.5 can be magnified
127 significantly by the pow and exp calls, especially for large x. A cheap
128 correction is to multiply by (1 + e*g/(x+g-0.5)), where e is the error
129 involved in the computation of x+g-0.5 (that is, e = computed value of
130 x+g-0.5 - exact value of x+g-0.5). Here's the proof:
132 Correction factor
133 -----------------
134 Write x+g-0.5 = y-e, where y is exactly representable as an IEEE 754
135 double, and e is tiny. Then:
137 pow(x+g-0.5,x-0.5)/exp(x+g-0.5) = pow(y-e, x-0.5)/exp(y-e)
138 = pow(y, x-0.5)/exp(y) * C,
140 where the correction_factor C is given by
142 C = pow(1-e/y, x-0.5) * exp(e)
144 Since e is tiny, pow(1-e/y, x-0.5) ~ 1-(x-0.5)*e/y, and exp(x) ~ 1+e, so:
146 C ~ (1-(x-0.5)*e/y) * (1+e) ~ 1 + e*(y-(x-0.5))/y
148 But y-(x-0.5) = g+e, and g+e ~ g. So we get C ~ 1 + e*g/y, and
150 pow(x+g-0.5,x-0.5)/exp(x+g-0.5) ~ pow(y, x-0.5)/exp(y) * (1 + e*g/y),
152 Note that for accuracy, when computing r*C it's better to do
154 r + e*g/y*r;
156 than
158 r * (1 + e*g/y);
160 since the addition in the latter throws away most of the bits of
161 information in e*g/y.
162 */
164 #define LANCZOS_N 13
180 2.5066282746310002701649081771338373386264310793408
181 };
183 /* denominator is x*(x+1)*...*(x+LANCZOS_N-2) */
188 /* gamma values for small positive integers, 1 though NGAMMA_INTEGRAL */
189 #define NGAMMA_INTEGRAL 23
196 };
198 /* Lanczos' sum L_g(x), for positive x */
200 static double
202 {
206 /* evaluate the rational function lanczos_sum(x). For large
207 x, the obvious algorithm risks overflow, so we instead
208 rescale the denominator and numerator of the rational
209 function by x**(1-LANCZOS_N) and treat this as a
210 rational function in 1/x. This also reduces the error for
211 larger x values. The choice of cutoff point (5.0 below) is
212 somewhat arbitrary; in tests, smaller cutoff values than
213 this resulted in lower accuracy. */
218 }
219 }
224 }
225 }
227 }
229 static double
231 {
234 /* special cases */
241 }
242 }
246 }
248 /* integer arguments */
253 }
256 }
259 /* tiny arguments: tgamma(x) ~ 1/x for x near 0 */
265 }
267 /* large arguments: assuming IEEE 754 doubles, tgamma(x) overflows for
268 x > 200, and underflows to +-0.0 for x < -200, not a negative
269 integer. */
273 }
277 }
278 }
281 /* compute error in sum */
283 /* note: the correction can be foiled by an optimizing
284 compiler that (incorrectly) thinks that an expression like
285 a + b - a - b can be optimized to 0.0. This shouldn't
286 happen in a standards-conforming compiler. */
289 }
293 }
300 }
305 }
306 }
312 }
317 }
318 }
322 }
324 /*
325 wrapper for atan2 that deals directly with special cases before
326 delegating to the platform libm for the remaining cases. This
327 is necessary to get consistent behaviour across platforms.
328 Windows, FreeBSD and alpha Tru64 are amongst platforms that don't
329 always follow C99.
330 */
332 static double
334 {
340 /* atan2(+-inf, +inf) == +-pi/4 */
342 else
343 /* atan2(+-inf, -inf) == +-pi*3/4 */
345 }
346 /* atan2(+-inf, x) == +-pi/2 for finite x */
348 }
351 /* atan2(+-y, +inf) = atan2(+-0, +x) = +-0. */
353 else
354 /* atan2(+-y, -inf) = atan2(+-0., -x) = +-pi. */
356 }
358 }
360 /*
361 Various platforms (Solaris, OpenBSD) do nonstandard things for log(0),
362 log(-ve), log(NaN). Here are wrappers for log and log10 that deal with
363 special values directly, passing positive non-special values through to
364 the system log/log10.
365 */
367 static double
369 {
376 else
378 }
386 }
387 }
389 static double
391 {
398 else
400 }
408 }
409 }
412 /* Call is_error when errno != 0, and where x is the result libm
413 * returned. is_error will usually set up an exception and return
414 * true (1), but may return false (0) without setting up an exception.
415 */
416 static int
418 {
425 /* ANSI C generally requires libm functions to set ERANGE
426 * on overflow, but also generally *allows* them to set
427 * ERANGE on underflow too. There's no consistency about
428 * the latter across platforms.
429 * Alas, C99 never requires that errno be set.
430 * Here we suppress the underflow errors (libm functions
431 * should return a zero on underflow, and +- HUGE_VAL on
432 * overflow, so testing the result for zero suffices to
433 * distinguish the cases).
434 *
435 * On some platforms (Ubuntu/ia64) it seems that errno can be
436 * set to ERANGE for subnormal results that do *not* underflow
437 * to zero. So to be safe, we'll ignore ERANGE whenever the
438 * function result is less than one in absolute value.
439 */
442 else
445 }
446 else
447 /* Unexpected math error */
450 }
452 /*
453 math_1 is used to wrap a libm function f that takes a double
454 arguments and returns a double.
456 The error reporting follows these rules, which are designed to do
457 the right thing on C89/C99 platforms and IEEE 754/non IEEE 754
458 platforms.
460 - a NaN result from non-NaN inputs causes ValueError to be raised
461 - an infinite result from finite inputs causes OverflowError to be
462 raised if can_overflow is 1, or raises ValueError if can_overflow
463 is 0.
464 - if the result is finite and errno == EDOM then ValueError is
465 raised
466 - if the result is finite and nonzero and errno == ERANGE then
467 OverflowError is raised
469 The last rule is used to catch overflow on platforms which follow
470 C89 but for which HUGE_VAL is not an infinity.
472 For the majority of one-argument functions these rules are enough
473 to ensure that Python's functions behave as specified in 'Annex F'
474 of the C99 standard, with the 'invalid' and 'divide-by-zero'
475 floating-point exceptions mapping to Python's ValueError and the
476 'overflow' floating-point exception mapping to OverflowError.
477 math_1 only works for functions that don't have singularities *and*
478 the possibility of overflow; fortunately, that covers everything we
479 care about right now.
480 */
484 {
496 else
498 }
502 else
504 }
507 else
509 }
511 /* variant of math_1, to be used when the function being wrapped is known to
512 set errno properly (that is, errno = EDOM for invalid or divide-by-zero,
513 errno = ERANGE for overflow). */
517 {
529 }
531 /*
532 math_2 is used to wrap a libm function f that takes two double
533 arguments and returns a double.
535 The error reporting follows these rules, which are designed to do
536 the right thing on C89/C99 platforms and IEEE 754/non IEEE 754
537 platforms.
539 - a NaN result from non-NaN inputs causes ValueError to be raised
540 - an infinite result from finite inputs causes OverflowError to be
541 raised.
542 - if the result is finite and errno == EDOM then ValueError is
543 raised
544 - if the result is finite and nonzero and errno == ERANGE then
545 OverflowError is raised
547 The last rule is used to catch overflow on platforms which follow
548 C89 but for which HUGE_VAL is not an infinity.
550 For most two-argument functions (copysign, fmod, hypot, atan2)
551 these rules are enough to ensure that Python's functions behave as
552 specified in 'Annex F' of the C99 standard, with the 'invalid' and
553 'divide-by-zero' floating-point exceptions mapping to Python's
554 ValueError and the 'overflow' floating-point exception mapping to
555 OverflowError.
556 */
560 {
576 else
578 }
582 else
584 }
587 else
589 }
591 #define FUNC1(funcname, func, can_overflow, docstring) \
592 static PyObject * math_##funcname(PyObject *self, PyObject *args) { \
593 return math_1(args, func, can_overflow); \
594 }\
595 PyDoc_STRVAR(math_##funcname##_doc, docstring);
597 #define FUNC1A(funcname, func, docstring) \
598 static PyObject * math_##funcname(PyObject *self, PyObject *args) { \
599 return math_1a(args, func); \
600 }\
601 PyDoc_STRVAR(math_##funcname##_doc, docstring);
603 #define FUNC2(funcname, func, docstring) \
604 static PyObject * math_##funcname(PyObject *self, PyObject *args) { \
605 return math_2(args, func, #funcname); \
606 }\
607 PyDoc_STRVAR(math_##funcname##_doc, docstring);
656 /* Precision summation function as msum() by Raymond Hettinger in
657 <http://aspn.activestate.com/ASPN/Cookbook/Python/Recipe/393090>,
658 enhanced with the exact partials sum and roundoff from Mark
659 Dickinson's post at <http://bugs.python.org/file10357/msum4.py>.
660 See those links for more details, proofs and other references.
662 Note 1: IEEE 754R floating point semantics are assumed,
663 but the current implementation does not re-establish special
664 value semantics across iterations (i.e. handling -Inf + Inf).
666 Note 2: No provision is made for intermediate overflow handling;
667 therefore, sum([1e+308, 1e-308, 1e+308]) returns 1e+308 while
668 sum([1e+308, 1e+308, 1e-308]) raises an OverflowError due to the
669 overflow of the first partial sum.
671 Note 3: The intermediate values lo, yr, and hi are declared volatile so
672 aggressive compilers won't algebraically reduce lo to always be exactly 0.0.
673 Also, the volatile declaration forces the values to be stored in memory as
674 regular doubles instead of extended long precision (80-bit) values. This
675 prevents double rounding because any addition or subtraction of two doubles
676 can be resolved exactly into double-sized hi and lo values. As long as the
677 hi value gets forced into a double before yr and lo are computed, the extra
678 bits in downstream extended precision operations (x87 for example) will be
679 exactly zero and therefore can be losslessly stored back into a double,
680 thereby preventing double rounding.
682 Note 4: A similar implementation is in Modules/cmathmodule.c.
683 Be sure to update both when making changes.
685 Note 5: The signature of math.fsum() differs from __builtin__.sum()
686 because the start argument doesn't make sense in the context of
687 accurate summation. Since the partials table is collapsed before
688 returning a result, sum(seq2, start=sum(seq1)) may not equal the
689 accurate result returned by sum(itertools.chain(seq1, seq2)).
690 */
694 /* Extend the partials array p[] by doubling its size. */
698 {
709 }
710 else
712 }
716 }
720 }
722 /* Full precision summation of a sequence of floats.
724 def msum(iterable):
725 partials = [] # sorted, non-overlapping partial sums
726 for x in iterable:
727 i = 0
728 for y in partials:
729 if abs(x) < abs(y):
730 x, y = y, x
731 hi = x + y
732 lo = y - (hi - x)
733 if lo:
734 partials[i] = lo
735 i += 1
736 x = hi
737 partials[i:] = [x]
738 return sum_exact(partials)
740 Rounded x+y stored in hi with the roundoff stored in lo. Together hi+lo
741 are exactly equal to x+y. The inner loop applies hi/lo summation to each
742 partial so that the list of partial sums remains exact.
744 Sum_exact() adds the partial sums exactly and correctly rounds the final
745 result (using the round-half-to-even rule). The items in partials remain
746 non-zero, non-special, non-overlapping and strictly increasing in
747 magnitude, but possibly not all having the same sign.
749 Depends on IEEE 754 arithmetic guarantees and half-even rounding.
750 */
754 {
777 }
788 }
795 }
800 /* a nonfinite x could arise either as
801 a result of intermediate overflow, or
802 as a result of a nan or inf in the
803 summands */
808 }
812 /* reset partials */
814 }
817 else
819 }
820 }
826 else
829 }
834 /* sum_exact(ps, hi) from the top, stop when the sum becomes
835 inexact. */
845 }
846 /* Make half-even rounding work across multiple partials.
847 Needed so that sum([1e-16, 1, 1e16]) will round-up the last
848 digit to two instead of down to zero (the 1e-16 makes the 1
849 slightly closer to two). With a potential 1 ULP rounding
850 error fixed-up, math.fsum() can guarantee commutativity. */
858 }
859 }
862 _fsum_error:
868 }
870 #undef NUM_PARTIALS
879 {
889 }
890 }
899 }
914 }
917 error:
920 }
929 {
931 }
940 {
945 /* deal with special cases directly, to sidestep platform
946 differences */
949 }
954 }
956 }
967 {
975 /* on overflow, replace exponent with either LONG_MAX
976 or LONG_MIN, depending on the sign. */
982 }
985 }
987 }
989 /* propagate any unexpected exception */
991 }
992 }
993 }
996 }
999 "Expected an int or long as second argument "
1002 }
1005 /* NaNs, zeros and infinities are returned unchanged */
1009 /* overflow */
1013 /* underflow to +-0 */
1023 }
1028 }
1036 {
1040 /* some platforms don't do the right thing for NaNs and
1041 infinities, so we take care of special cases directly. */
1047 }
1054 }
1062 /* A decent logarithm is easy to compute even for huge longs, but libm can't
1063 do that by itself -- loghelper can. func is log or log10, and name is
1064 "log" or "log10". Note that overflow isn't possible: a long can contain
1065 no more than INT_MAX * SHIFT bits, so has value certainly less than
1066 2**(2**64 * 2**16) == 2**2**80, and log2 of that is 2**80, which is
1067 small enough to fit in an IEEE single. log and log10 are even smaller.
1068 */
1072 {
1073 /* If it is long, do it ourselves. */
1082 }
1083 /* Value is ~= x * 2**(e*PyLong_SHIFT), so the log ~=
1084 log(x) + log(2) * e * PyLong_SHIFT.
1085 CAUTION: e*PyLong_SHIFT may overflow using int arithmetic,
1086 so force use of double. */
1089 }
1091 /* Else let libm handle it by itself. */
1093 }
1097 {
1114 }
1120 }
1129 {
1131 }
1138 {
1147 /* fmod(x, +/-Inf) returns x for finite x. */
1157 else
1159 }
1162 else
1164 }
1172 {
1181 /* hypot(x, +/-Inf) returns Inf, even if x is a NaN. */
1193 else
1195 }
1199 else
1201 }
1204 else
1206 }
1211 /* pow can't use math_2, but needs its own wrapper: the problem is
1212 that an infinite result can arise either as a result of overflow
1213 (in which case OverflowError should be raised) or as a result of
1214 e.g. 0.**-5. (for which ValueError needs to be raised.)
1215 */
1219 {
1231 /* deal directly with IEEE specials, to cope with problems on various
1232 platforms whose semantics don't exactly match C99 */
1248 }
1258 }
1259 else
1261 }
1262 }
1264 /* let libm handle finite**finite */
1269 /* a NaN result should arise only from (-ve)**(finite
1270 non-integer); in this case we want to raise ValueError. */
1274 }
1275 /*
1276 an infinite result here arises either from:
1277 (A) (+/-0.)**negative (-> divide-by-zero)
1278 (B) overflow of x**y with x and y finite
1279 */
1283 else
1285 }
1286 }
1287 }
1291 else
1293 }
1303 {
1308 }
1316 {
1321 }
1329 {
1334 }
1342 {
1347 }
1391 };
1398 PyMODINIT_FUNC
1400 {
1410 finally:
1412 }