/** * This file has no copyright assigned and is placed in the Public Domain. * This file is part of the mingw-w64 runtime package. * No warranty is given; refer to the file DISCLAIMER.PD within this package. */ #include "cephes_mconf.h" /* A[]: Stirling's formula expansion of log gamma * B[], C[]: log gamma function between 2 and 3 */ #ifdef UNK static uD A[] = { { { 8.11614167470508450300E-4 } }, { { -5.95061904284301438324E-4 } }, { { 7.93650340457716943945E-4 } }, { { -2.77777777730099687205E-3 } }, { { 8.33333333333331927722E-2 } } }; static uD B[] = { { { -1.37825152569120859100E3 } }, { { -3.88016315134637840924E4 } }, { { -3.31612992738871184744E5 } }, { { -1.16237097492762307383E6 } }, { { -1.72173700820839662146E6 } }, { { -8.53555664245765465627E5 } } }; static uD C[] = { { { -3.51815701436523470549E2 } }, { { -1.70642106651881159223E4 } }, { { -2.20528590553854454839E5 } }, { { -1.13933444367982507207E6 } }, { { -2.53252307177582951285E6 } }, { { -2.01889141433532773231E6 } } }; /* log( sqrt( 2*pi ) ) */ static double LS2PI = 0.91893853320467274178; #define MAXLGM 2.556348e305 static double LOGPI = 1.14472988584940017414; #endif #ifdef DEC static const uD A[] = { { { 0035524,0141201,0034633,0031405 } }, { { 0135433,0176755,0126007,0045030 } }, { { 0035520,0006371,0003342,0172730 } }, { { 0136066,0005540,0132605,0026407 } }, { { 0037252,0125252,0125252,0125132 } } }; static const uD B[] = { { { 0142654,0044014,0077633,0035410 } }, { { 0144027,0110641,0125335,0144760 } }, { { 0144641,0165637,0142204,0047447 } }, { { 0145215,0162027,0146246,0155211 } }, { { 0145322,0026110,0010317,0110130 } }, { { 0145120,0061472,0120300,0025363 } } }; static const uD C[] = { { { 0142257,0164150,0163630,0112622 } }, { { 0143605,0050153,0156116,0135272 } }, { { 0144527,0056045,0145642,0062332 } }, { { 0145213,0012063,0106250,0001025 } }, { { 0145432,0111254,0044577,0115142 } }, { { 0145366,0071133,0050217,0005122 } } }; /* log( sqrt( 2*pi ) ) */ static const uD LS2P[] = { {040153,037616,041445,0172645,} }; #define LS2PI LS2P[0].d #define MAXLGM 2.035093e36 static const uD LPI[] = { { 0040222,0103202,0043475,0006750, } }; #define LOGPI LPI[0].d #endif #ifdef IBMPC static const uD A[] = { { { 0x6661,0x2733,0x9850,0x3f4a } }, { { 0xe943,0xb580,0x7fbd,0xbf43 } }, { { 0x5ebb,0x20dc,0x019f,0x3f4a } }, { { 0xa5a1,0x16b0,0xc16c,0xbf66 } }, { { 0x554b,0x5555,0x5555,0x3fb5 } } }; static const uD B[] = { { { 0x6761,0x8ff3,0x8901,0xc095 } }, { { 0xb93e,0x355b,0xf234,0xc0e2 } }, { { 0x89e5,0xf890,0x3d73,0xc114 } }, { { 0xdb51,0xf994,0xbc82,0xc131 } }, { { 0xf20b,0x0219,0x4589,0xc13a } }, { { 0x055e,0x5418,0x0c67,0xc12a } } }; static const uD C[] = { { { 0x12b2,0x1cf3,0xfd0d,0xc075 } }, { { 0xd757,0x7b89,0xaa0d,0xc0d0 } }, { { 0x4c9b,0xb974,0xeb84,0xc10a } }, { { 0x0043,0x7195,0x6286,0xc131 } }, { { 0xf34c,0x892f,0x5255,0xc143 } }, { { 0xe14a,0x6a11,0xce4b,0xc13e } } }; /* log( sqrt( 2*pi ) ) */ static const union { unsigned short s[4]; double d; } ls2p = {{0xbeb5,0xc864,0x67f1,0x3fed}}; #define LS2PI (ls2p.d) #define MAXLGM 2.556348e305 /* log (pi) */ static const union { unsigned short s[4]; double d; } lpi = {{0xa1bd,0x48e7,0x50d0,0x3ff2}}; #define LOGPI (lpi.d) #endif #ifdef MIEEE static const uD A[] = { { { 0x3f4a,0x9850,0x2733,0x6661 } }, { { 0xbf43,0x7fbd,0xb580,0xe943 } }, { { 0x3f4a,0x019f,0x20dc,0x5ebb } }, { { 0xbf66,0xc16c,0x16b0,0xa5a1 } }, { { 0x3fb5,0x5555,0x5555,0x554b } } }; static const uD B[] = { { { 0xc095,0x8901,0x8ff3,0x6761 } }, { { 0xc0e2,0xf234,0x355b,0xb93e } }, { { 0xc114,0x3d73,0xf890,0x89e5 } }, { { 0xc131,0xbc82,0xf994,0xdb51 } }, { { 0xc13a,0x4589,0x0219,0xf20b } }, { { 0xc12a,0x0c67,0x5418,0x055e } } }; static const uD C[] = { { { 0xc075,0xfd0d,0x1cf3,0x12b2 } }, { { 0xc0d0,0xaa0d,0x7b89,0xd757 } }, { { 0xc10a,0xeb84,0xb974,0x4c9b } }, { { 0xc131,0x6286,0x7195,0x0043 } }, { { 0xc143,0x5255,0x892f,0xf34c } }, { { 0xc13e,0xce4b,0x6a11,0xe14a } } }; /* log( sqrt( 2*pi ) ) */ static const union { unsigned short s[4]; double d; } ls2p = {{0x3fed,0x67f1,0xc864,0xbeb5}}; #define LS2PI ls2p.d #define MAXLGM 2.556348e305 /* log (pi) */ static const union { unsigned short s[4]; double d; } lpi = {{0x3ff2, 0x50d0, 0x48e7, 0xa1bd}}; #define LOGPI (lpi.d) #endif /* Logarithm of gamma function */ /* Reentrant version */ double __lgamma_r(double x, int* sgngam); double __lgamma_r(double x, int* sgngam) { double p, q, u, w, z; int i; *sgngam = 1; #ifdef NANS if (isnan(x)) return (x); #endif #ifdef INFINITIES if (!isfinite(x)) return (INFINITY); #endif if (x < -34.0) { q = -x; w = __lgamma_r(q, sgngam); /* note this modifies sgngam! */ p = floor(q); if (p == q) { lgsing: _SET_ERRNO(EDOM); mtherr( "lgam", SING ); #ifdef INFINITIES return (INFINITY); #else return (MAXNUM); #endif } i = p; if ((i & 1) == 0) *sgngam = -1; else *sgngam = 1; z = q - p; if (z > 0.5) { p += 1.0; z = p - q; } z = q * sin( PI * z ); if (z == 0.0) goto lgsing; /* z = log(PI) - log( z ) - w;*/ z = LOGPI - log( z ) - w; return (z); } if (x < 13.0) { z = 1.0; p = 0.0; u = x; while (u >= 3.0) { p -= 1.0; u = x + p; z *= u; } while (u < 2.0) { if (u == 0.0) goto lgsing; z /= u; p += 1.0; u = x + p; } if (z < 0.0) { *sgngam = -1; z = -z; } else *sgngam = 1; if (u == 2.0) return ( log(z) ); p -= 2.0; x = x + p; p = x * polevl(x, B, 5) / p1evl(x, C, 6); return ( log(z) + p ); } if (x > MAXLGM) { _SET_ERRNO(ERANGE); mtherr("lgamma", OVERFLOW); #ifdef INFINITIES return (*sgngam * INFINITY); #else return (*sgngam * MAXNUM); #endif } q = (x - 0.5) * log(x) - x + LS2PI; if (x > 1.0e8) return (q); p = 1.0/(x*x); if (x >= 1000.0) q += (( 7.9365079365079365079365e-4 * p - 2.7777777777777777777778e-3) *p + 0.0833333333333333333333) / x; else q += polevl( p, A, 4 ) / x; return (q); } /* This is the C99 version */ double lgamma(double x) { return (__lgamma_r(x, &signgam)); }