diff options
Diffstat (limited to 'usr/src/libm/src/m9x/tgammal.c')
| -rw-r--r-- | usr/src/libm/src/m9x/tgammal.c | 1166 |
1 files changed, 1166 insertions, 0 deletions
diff --git a/usr/src/libm/src/m9x/tgammal.c b/usr/src/libm/src/m9x/tgammal.c new file mode 100644 index 0000000..b0297de --- /dev/null +++ b/usr/src/libm/src/m9x/tgammal.c @@ -0,0 +1,1166 @@ +/* + * CDDL HEADER START + * + * The contents of this file are subject to the terms of the + * Common Development and Distribution License (the "License"). + * You may not use this file except in compliance with the License. + * + * You can obtain a copy of the license at usr/src/OPENSOLARIS.LICENSE + * or http://www.opensolaris.org/os/licensing. + * See the License for the specific language governing permissions + * and limitations under the License. + * + * When distributing Covered Code, include this CDDL HEADER in each + * file and include the License file at usr/src/OPENSOLARIS.LICENSE. + * If applicable, add the following below this CDDL HEADER, with the + * fields enclosed by brackets "[]" replaced with your own identifying + * information: Portions Copyright [yyyy] [name of copyright owner] + * + * CDDL HEADER END + */ + +/* + * Copyright 2006 Sun Microsystems, Inc. All rights reserved. + * Use is subject to license terms. + */ + +#pragma ident "@(#)tgammal.c 1.9 06/01/31 SMI" + +#if defined(ELFOBJ) +#pragma weak tgammal = __tgammal +#endif + +#include "libm.h" + +#if defined(__sparc) +#define H0_WORD(x) ((unsigned *) &x)[0] +#define H3_WORD(x) ((unsigned *) &x)[3] +#define CHOPPED(x) (long double) ((double) (x)) +#elif defined(__i386) +#define H0_WORD(x) ((((int *) &x)[2] << 16) | \ + (0x0000ffff & (((unsigned *) &x)[1] >> 15))) +#define H3_WORD(x) ((unsigned *) &x)[0] +#define CHOPPED(x) (long double) ((float) (x)) +#else +#error Unknown architecture +#endif + +struct LDouble { + long double h, l; +}; + +/* INDENT OFF */ +/* Primary interval GTi() */ +static const long double P1[] = { + +0.709086836199777919037185741507610124611513720557L, + +4.45754781206489035827915969367354835667391606951e-0001L, + +3.21049298735832382311662273882632210062918153852e-0002L, + -5.71296796342106617651765245858289197369688864350e-0003L, + +6.04666892891998977081619174969855831606965352773e-0003L, + +8.99106186996888711939627812174765258822658645168e-0004L, + -6.96496846144407741431207008527018441810175568949e-0005L, + +1.52597046118984020814225409300131445070213882429e-0005L, + +5.68521076168495673844711465407432189190681541547e-0007L, + +3.30749673519634895220582062520286565610418952979e-0008L, +}; +static const long double Q1[] = { + +1.0+0000L, + +1.35806511721671070408570853537257079579490650668e+0000L, + +2.97567810153429553405327140096063086994072952961e-0001L, + -1.52956835982588571502954372821681851681118097870e-0001L, + -2.88248519561420109768781615289082053597954521218e-0002L, + +1.03475311719937405219789948456313936302378395955e-0002L, + +4.12310203243891222368965360124391297374822742313e-0004L, + -3.12653708152290867248931925120380729518332507388e-0004L, + +2.36672170850409745237358105667757760527014332458e-0005L, +}; +static const long double P2[] = { + +0.428486815855585429730209907810650135255270600668084114L, + +2.62768479103809762805691743305424077975230551176e-0001L, + +3.81187532685392297608310837995193946591425896150e-0002L, + +3.00063075891811043820666846129131255948527925381e-0003L, + +2.47315407812279164228398470797498649142513408654e-0003L, + +3.62838199917848372586173483147214880464782938664e-0004L, + +3.43991105975492623982725644046473030098172692423e-0006L, + +4.56902151569603272237014240794257659159045432895e-0006L, + +2.13734755837595695602045100675540011352948958453e-0007L, + +9.74123440547918230781670266967882492234877125358e-0009L, +}; +static const long double Q2[] = { + +1.0L, + +9.18284118632506842664645516830761489700556179701e-0001L, + -6.41430858837830766045202076965923776189154874947e-0003L, + -1.24400885809771073213345747437964149775410921376e-0001L, + +4.69803798146251757538856567522481979624746875964e-0003L, + +7.18309447069495315914284705109868696262662082731e-0003L, + -8.75812626987894695112722600697653425786166399105e-0004L, + -1.23539972377769277995959339188431498626674835169e-0004L, + +3.10019017590151598732360097849672925448587547746e-0005L, + -1.77260223349332617658921874288026777465782364070e-0006L, +}; +static const long double P3[] = { + +0.3824094797345675048502747661075355640070439388902L, + +3.42198093076618495415854906335908427159833377774e-0001L, + +9.63828189500585568303961406863153237440702754858e-0002L, + +8.76069421042696384852462044188520252156846768667e-0003L, + +1.86477890389161491224872014149309015261897537488e-0003L, + +8.16871354540309895879974742853701311541286944191e-0004L, + +6.83783483674600322518695090864659381650125625216e-0005L, + -1.10168269719261574708565935172719209272190828456e-0006L, + +9.66243228508380420159234853278906717065629721016e-0007L, + +2.31858885579177250541163820671121664974334728142e-0008L, +}; +static const long double Q3[] = { + +1.0L, + +8.25479821168813634632437430090376252512793067339e-0001L, + -1.62251363073937769739639623669295110346015576320e-0002L, + -1.10621286905916732758745130629426559691187579852e-0001L, + +3.48309693970985612644446415789230015515365291459e-0003L, + +6.73553737487488333032431261131289672347043401328e-0003L, + -7.63222008393372630162743587811004613050245128051e-0004L, + -1.35792670669190631476784768961953711773073251336e-0004L, + +3.19610150954223587006220730065608156460205690618e-0005L, + -1.82096553862822346610109522015129585693354348322e-0006L, +}; + +static const long double +#if defined(__i386) +GZ1_h = 0.938204627909682449364570100414084663498215377L, +GZ1_l = 4.518346116624229420055327632718530617227944106e-20L, +GZ2_h = 0.885603194410888700264725126309883762587560340L, +GZ2_l = 1.409077427270497062039119290776508217077297169e-20L, +GZ3_h = 0.936781411463652321613537060640553022494714241L, +GZ3_l = 5.309836440284827247897772963887219035221996813e-21L, +#else +GZ1_h = 0.938204627909682449409753561580326910854647031L, +GZ1_l = 4.684412162199460089642452580902345976446297037e-35L, +GZ2_h = 0.885603194410888700278815900582588658192658794L, +GZ2_l = 7.501529273890253789219935569758713534641074860e-35L, +GZ3_h = 0.936781411463652321618846897080837818855399840L, +GZ3_l = 3.088721217404784363585591914529361687403776917e-35L, +#endif +TZ1 = -0.3517214357852935791015625L, +TZ3 = 0.280530631542205810546875L; +/* INDENT ON */ + +/* INDENT OFF */ +/* + * compute gamma(y=yh+yl) for y in GT1 = [1.0000, 1.2845] + * ...assume yh got 53 or 24(i386) significant bits + */ +/* INDENT ON */ +static struct LDouble +GT1(long double yh, long double yl) { + long double t3, t4, y; + int i; + struct LDouble r; + + y = yh + yl; + for (t4 = Q1[8], t3 = P1[8] + y * P1[9], i = 7; i >= 0; i--) { + t4 = t4 * y + Q1[i]; + t3 = t3 * y + P1[i]; + } + t3 = (y * y) * t3 / t4; + t3 += (TZ1 * yl + GZ1_l); + t4 = TZ1 * yh; + r.h = CHOPPED((t4 + GZ1_h + t3)); + t3 += (t4 - (r.h - GZ1_h)); + r.l = t3; + return (r); +} + +/* INDENT OFF */ +/* + * compute gamma(y=yh+yl) for y in GT2 = [1.2844, 1.6374] + * ...assume yh got 53 significant bits + */ +/* INDENT ON */ +static struct LDouble +GT2(long double yh, long double yl) { + long double t3, t4, y; + int i; + struct LDouble r; + + y = yh + yl; + for (t4 = Q2[9], t3 = P2[9], i = 8; i >= 0; i--) { + t4 = t4 * y + Q2[i]; + t3 = t3 * y + P2[i]; + } + t3 = GZ2_l + (y * y) * t3 / t4; + r.h = CHOPPED((GZ2_h + t3)); + r.l = t3 - (r.h - GZ2_h); + return (r); +} + +/* INDENT OFF */ +/* + * compute gamma(y=yh+yl) for y in GT3 = [1.6373, 2.0000] + * ...assume yh got 53 significant bits + */ +/* INDENT ON */ +static struct LDouble +GT3(long double yh, long double yl) { + long double t3, t4, y; + int i; + struct LDouble r; + + y = yh + yl; + for (t4 = Q3[9], t3 = P3[9], i = 8; i >= 0; i--) { + t4 = t4 * y + Q3[i]; + t3 = t3 * y + P3[i]; + } + t3 = (y * y) * t3 / t4; + t3 += (TZ3 * yl + GZ3_l); + t4 = TZ3 * yh; + r.h = CHOPPED((t4 + GZ3_h + t3)); + t3 += (t4 - (r.h - GZ3_h)); + r.l = t3; + return (r); +} + +/* INDENT OFF */ +/* Hex value of GP[0] shoule be 3FB55555 55555555 */ +static const long double GP[] = { + +0.083333333333333333333333333333333172839171301L, + -2.77777777777777777777777777492501211999399424104e-0003L, + +7.93650793650793650793635650541638236350020883243e-0004L, + -5.95238095238095238057299772679324503339241961704e-0004L, + +8.41750841750841696138422987977683524926142600321e-0004L, + -1.91752691752686682825032547823699662178842123308e-0003L, + +6.41025641022403480921891559356473451161279359322e-0003L, + -2.95506535798414019189819587455577003732808185071e-0002L, + +1.79644367229970031486079180060923073476568732136e-0001L, + -1.39243086487274662174562872567057200255649290646e+0000L, + +1.34025874044417962188677816477842265259608269775e+0001L, + -1.56803713480127469414495545399982508700748274318e+0002L, + +2.18739841656201561694927630335099313968924493891e+0003L, + -3.55249848644100338419187038090925410976237921269e+0004L, + +6.43464880437835286216768959439484376449179576452e+0005L, + -1.20459154385577014992600342782821389605893904624e+0007L, + +2.09263249637351298563934942349749718491071093210e+0008L, + -2.96247483183169219343745316433899599834685703457e+0009L, + +2.88984933605896033154727626086506756972327292981e+0010L, + -1.40960434146030007732838382416230610302678063984e+0011L, /* 19 */ +}; + +static const long double T3[] = { + +0.666666666666666666666666666666666634567834260213L, /* T3[0] */ + +0.400000000000000000000000000040853636176634934140L, /* T3[1] */ + +0.285714285714285714285696975252753987869020263448L, /* T3[2] */ + +0.222222222222222225593221101192317258554772129875L, /* T3[3] */ + +0.181818181817850192105847183461778186703779262916L, /* T3[4] */ + +0.153846169861348633757101285952333369222567014596L, /* T3[5] */ + +0.133033462889260193922261296772841229985047571265L, /* T3[6] */ +}; + +static const long double c[] = { +0.0L, +1.0L, +2.0L, +0.5L, +1.0e-4930L, /* tiny */ +4.18937683105468750000e-01L, /* hln2pim1_h */ +8.50099203991780329736405617639861397473637783412817152e-07L, /* hln2pim1_l */ +0.418938533204672741780329736405617639861397473637783412817152L, /* hln2pim1 */ +2.16608493865351192653179168701171875e-02L, /* ln2_32hi */ +5.96317165397058692545083025235937919875797669127130e-12L, /* ln2_32lo */ +46.16624130844682903551758979206054839765267053289554989233L, /* invln2_32 */ +#if defined(__i386) +1.7555483429044629170023839037639845628291e+03L, /* overflow */ +#else +1.7555483429044629170038892160702032034177e+03L, /* overflow */ +#endif +}; + +#define zero c[0] +#define one c[1] +#define two c[2] +#define half c[3] +#define tiny c[4] +#define hln2pim1_h c[5] +#define hln2pim1_l c[6] +#define hln2pim1 c[7] +#define ln2_32hi c[8] +#define ln2_32lo c[9] +#define invln2_32 c[10] +#define overflow c[11] + +/* + * |exp(r) - (1+r+Et0*r^2+...+Et10*r^12)| <= 2^(-128.88) for |r|<=ln2/64 + */ +static const long double Et[] = { + +5.0000000000000000000e-1L, + +1.66666666666666666666666666666828835166292152466e-0001L, + +4.16666666666666666666666666666693398646592712189e-0002L, + +8.33333333333333333333331748774512601775591115951e-0003L, + +1.38888888888888888888888845356011511394764753997e-0003L, + +1.98412698412698413237140350092993252684198882102e-0004L, + +2.48015873015873016080222025357442659895814371694e-0005L, + +2.75573192239028921114572986441972140933432317798e-0006L, + +2.75573192239448470555548102895526369739856219317e-0007L, + +2.50521677867683935940853997995937600214167232477e-0008L, + +2.08767928899010367374984448513685566514152147362e-0009L, +}; + +/* + * long double precision coefficients for computing log(x)-1 in tgamma. + * See "algorithm" for details + * + * log(x) - 1 = T1(n) + T2(j) + T3(s), where x = 2**n * y, 1<=y<2, + * j=[64*y], z[j]=1+j/64+1/128, s = (y-z[j])/(y+z[j]), and + * T1(n) = T1[2n,2n+1] = n*log(2)-1, + * T2(j) = T2[2j,2j+1] = log(z[j]), + * T3(s) = 2s + T3[0]s^3 + T3[1]s^5 + T3[2]s^7 + ... + T3[6]s^15 + * Note + * (1) the leading entries are truncated to 24 binary point. + * (2) Remez error for T3(s) is bounded by 2**(-136.54) + */ +static const long double T1[] = { +-1.000000000000000000000000000000000000000000e+00L, + +0.000000000000000000000000000000000000000000e+00L, +-3.068528175354003906250000000000000000000000e-01L, +-1.904654299957767878541823431924500011926579e-09L, + +3.862943053245544433593750000000000000000000e-01L, + +5.579533617547508924291635313615100141107647e-08L, + +1.079441487789154052734375000000000000000000e+00L, + +5.389068187551732136437452970422650211661470e-08L, + +1.772588670253753662109375000000000000000000e+00L, + +5.198602757555955348583270627230200282215294e-08L, + +2.465735852718353271484375000000000000000000e+00L, + +5.008137327560178560729088284037750352769117e-08L, + +3.158883035182952880859375000000000000000000e+00L, + +4.817671897564401772874905940845299849351090e-08L, + +3.852030217647552490234375000000000000000000e+00L, + +4.627206467568624985020723597652849919904913e-08L, + +4.545177400112152099609375000000000000000000e+00L, + +4.436741037572848197166541254460399990458737e-08L, + +5.238324582576751708984375000000000000000000e+00L, + +4.246275607577071409312358911267950061012560e-08L, + +5.931471765041351318359375000000000000000000e+00L, + +4.055810177581294621458176568075500131566384e-08L, +}; + +/* + * T2[2i,2i+1] = log(1+i/64+1/128) + */ +static const long double T2[] = { + +7.7821016311645507812500000000000000000000e-03L, + +3.8810890398166212900061136763678127453570e-08L, + +2.3167014122009277343750000000000000000000e-02L, + +4.5159525100885049160962289916579411752759e-08L, + +3.8318812847137451171875000000000000000000e-02L, + +5.1454999148021880325123797290345960518164e-08L, + +5.3244471549987792968750000000000000000000e-02L, + +4.2968824489897120193786528776939573415076e-08L, + +6.7950606346130371093750000000000000000000e-02L, + 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+5.5247449548366574919228323824878565745713e-08L, + +5.1860773563385009765625000000000000000000e-01L, + +2.8574195534496726996364798698556235730848e-08L, + +5.2786707878112792968750000000000000000000e-01L, + +1.0839714455426392217778300963558522088193e-08L, + +5.3704142570495605468750000000000000000000e-01L, + +4.0191927599879229244153832299023744345999e-08L, + +5.4613238573074340820312500000000000000000e-01L, + +5.1867392242179272209231209163864971792889e-08L, + +5.5514144897460937500000000000000000000000e-01L, + +5.8565892217715480359515904050170125743178e-08L, + +5.6407010555267333984375000000000000000000e-01L, + +3.2732129626227634290090190711817681692354e-08L, + +5.7291972637176513671875000000000000000000e-01L, + +2.7190020372374006726626261068626400393936e-08L, + +5.8169168233871459960937500000000000000000e-01L, + +5.7295907882911235753725372340709967597394e-08L, + +5.9038740396499633789062500000000000000000e-01L, + +4.2637180036751291708123598757577783615014e-08L, + +5.9900814294815063476562500000000000000000e-01L, + +4.6697932764615975024461651502060474048774e-08L, + +6.0755521059036254882812500000000000000000e-01L, + +3.9634179246672960152791125371893149820625e-08L, + +6.1602985858917236328125000000000000000000e-01L, + +1.8626341656366315928196700650292529688219e-08L, + +6.2443327903747558593750000000000000000000e-01L, + +8.9744179151050387440546731199093039879228e-09L, + +6.3276666402816772460937500000000000000000e-01L, + +5.5428701049364114685035797584887586099726e-09L, + +6.4103114604949951171875000000000000000000e-01L, + +3.3371431779336851334405392546708949047361e-08L, + +6.4922791719436645507812500000000000000000e-01L, + +2.9430743363812714969905311122271269100885e-08L, + +6.5735805034637451171875000000000000000000e-01L, + +2.2361985518423140023245936165514147093250e-08L, + +6.6542261838912963867187500000000000000000e-01L, + +1.4155960810278217610006660181148303091649e-08L, + +6.7342263460159301757812500000000000000000e-01L, + +4.0610573702719835388801017264750843477878e-08L, + +6.8135917186737060546875000000000000000000e-01L, + +5.2940532463479321559568089441735584156689e-08L, + +6.8923324346542358398437500000000000000000e-01L, + +3.7773385396340539337814603903232796216537e-08L, +}; + +/* + * S[j],S_trail[j] = 2**(j/32.) for the final computation of exp(t+w) + */ +static const long double S[] = { +#if defined(__i386) + +1.0000000000000000000000000e+00L, + +1.0218971486541166782081522e+00L, + +1.0442737824274138402382006e+00L, + +1.0671404006768236181297224e+00L, + +1.0905077326652576591003302e+00L, + +1.1143867425958925362894369e+00L, + +1.1387886347566916536971221e+00L, + +1.1637248587775775137938619e+00L, + +1.1892071150027210666875674e+00L, + +1.2152473599804688780476325e+00L, + +1.2418578120734840485256747e+00L, + +1.2690509571917332224885722e+00L, + +1.2968395546510096659215822e+00L, + +1.3252366431597412945939118e+00L, + +1.3542555469368927282668852e+00L, + +1.3839098819638319548151403e+00L, + +1.4142135623730950487637881e+00L, + +1.4451808069770466200253470e+00L, + +1.4768261459394993113155431e+00L, + +1.5091644275934227397133885e+00L, + +1.5422108254079408235859630e+00L, + +1.5759808451078864864006862e+00L, + +1.6104903319492543080837174e+00L, + +1.6457554781539648445110730e+00L, + +1.6817928305074290860378350e+00L, + +1.7186192981224779156032914e+00L, + +1.7562521603732994831094730e+00L, + +1.7947090750031071864148413e+00L, + +1.8340080864093424633989166e+00L, + +1.8741676341102999013002103e+00L, + +1.9152065613971472938202589e+00L, + +1.9571441241754002689657438e+00L, +#else + +1.00000000000000000000000000000000000e+00L, + +1.02189714865411667823448013478329942e+00L, + +1.04427378242741384032196647873992910e+00L, + +1.06714040067682361816952112099280918e+00L, + +1.09050773266525765920701065576070789e+00L, + +1.11438674259589253630881295691960313e+00L, + +1.13878863475669165370383028384151134e+00L, + +1.16372485877757751381357359909218536e+00L, + +1.18920711500272106671749997056047593e+00L, + +1.21524735998046887811652025133879836e+00L, + +1.24185781207348404859367746872659561e+00L, + +1.26905095719173322255441908103233805e+00L, + +1.29683955465100966593375411779245118e+00L, + +1.32523664315974129462953709549872168e+00L, + +1.35425554693689272829801474014070273e+00L, + +1.38390988196383195487265952726519287e+00L, + +1.41421356237309504880168872420969798e+00L, + +1.44518080697704662003700624147167095e+00L, + +1.47682614593949931138690748037404985e+00L, + +1.50916442759342273976601955103319352e+00L, + +1.54221082540794082361229186209073479e+00L, + +1.57598084510788648645527016018190504e+00L, + +1.61049033194925430817952066735740067e+00L, + +1.64575547815396484451875672472582254e+00L, + +1.68179283050742908606225095246642969e+00L, + +1.71861929812247791562934437645631244e+00L, + +1.75625216037329948311216061937531314e+00L, + +1.79470907500310718642770324212778174e+00L, + +1.83400808640934246348708318958828892e+00L, + +1.87416763411029990132999894995444645e+00L, + +1.91520656139714729387261127029583086e+00L, + +1.95714412417540026901832225162687149e+00L, +#endif +}; +static const long double S_trail[] = { +#if defined(__i386) + +0.0000000000000000000000000e+00L, + +2.6327965667180882569382524e-20L, + +8.3765863521895191129661899e-20L, + +3.9798705777454504249209575e-20L, + +1.0668046596651558640993042e-19L, + +1.9376009847285360448117114e-20L, + +6.7081819456112953751277576e-21L, + +1.9711680502629186462729727e-20L, + +2.9932584438449523689104569e-20L, + +6.8887754153039109411061914e-20L, + +6.8002718741225378942847820e-20L, + +6.5846917376975403439742349e-20L, + +1.2171958727511372194876001e-20L, + +3.5625253228704087115438260e-20L, + +3.1129551559077560956309179e-20L, + +5.7519192396164779846216492e-20L, + +3.7900651177865141593101239e-20L, + +1.1659262405698741798080115e-20L, + +7.1364385105284695967172478e-20L, + +5.2631003710812203588788949e-20L, + +2.6328853788732632868460580e-20L, + +5.4583950085438242788190141e-20L, + +9.5803254376938269960718656e-20L, + +7.6837733983874245823512279e-21L, + +2.4415965910835093824202087e-20L, + +2.6052966871016580981769728e-20L, + +2.6876456344632553875309579e-21L, + +1.2861930155613700201703279e-20L, + +8.8166633394037485606572294e-20L, + +2.9788615389580190940837037e-20L, + +5.2352341619805098677422139e-20L, + +5.2578463064010463732242363e-20L, +#else + +0.00000000000000000000000000000000000e+00L, + +1.80506787420330954745573333054573786e-35L, +-9.37452029228042742195756741973083214e-35L, +-1.59696844729275877071290963023149997e-35L, + +9.11249341012502297851168610167248666e-35L, +-6.50422820697854828723037477525938871e-35L, +-8.14846884452585113732569176748815532e-35L, +-5.06621457672180031337233074514290335e-35L, +-1.35983097468881697374987563824591912e-35L, + +9.49742763556319647030771056643324660e-35L, +-3.28317052317699860161506596533391526e-36L, +-5.01723570938719041029018653045842895e-35L, +-2.39147479768910917162283430160264014e-35L, +-8.35057135763390881529889073794408385e-36L, + +7.03675688907326504242173719067187644e-35L, +-5.18248485306464645753689301856695619e-35L, + +9.42224254862183206569211673639406488e-35L, +-3.96750082539886230916730613021641828e-35L, + +7.14352899156330061452327361509276724e-35L, + +1.15987125286798512424651783410044433e-35L, + +4.69693347835811549530973921320187447e-35L, +-3.38651317599500471079924198499981917e-35L, +-8.58731877429824706886865593510387445e-35L, +-9.60595154874935050318549936224606909e-35L, + +9.60973393212801278450755869714178581e-35L, + +6.37839792144002843924476144978084855e-35L, + +7.79243078569586424945646112516927770e-35L, + +7.36133776758845652413193083663393220e-35L, +-6.47299514791334723003521457561217053e-35L, + +8.58747441795369869427879806229522962e-35L, + +2.37181542282517483569165122830269098e-35L, +-3.02689168209611877300459737342190031e-37L, +#endif +}; +/* INDENT ON */ + +/* INDENT OFF */ +/* + * return tgamma(x) scaled by 2**-m for 8<x<=171.62... using Stirling's formula + * log(G(x)) ~= (x-.5)*(log(x)-1) + .5(log(2*pi)-1) + (1/x)*P(1/(x*x)) + * = L1 + L2 + L3, + */ +/* INDENT ON */ +static struct LDouble +large_gam(long double x, int *m) { + long double z, t1, t2, t3, z2, t5, w, y, u, r, v; + long double t24 = 16777216.0L, p24 = 1.0L / 16777216.0L; + int n2, j2, k, ix, j, i; + struct LDouble zz; + long double u2, ss_h, ss_l, r_h, w_h, w_l, t4; + +/* INDENT OFF */ +/* + * compute ss = ss.h+ss.l = log(x)-1 (see tgamma_log.h for details) + * + * log(x) - 1 = T1(n) + T2(j) + T3(s), where x = 2**n * y, 1<=y<2, + * j=[64*y], z[j]=1+j/64+1/128, s = (y-z[j])/(y+z[j]), and + * T1(n) = T1[2n,2n+1] = n*log(2)-1, + * T2(j) = T2[2j,2j+1] = log(z[j]), + * T3(s) = 2s + T3[0]s^3 + T3[1]s^5 + ... + T3[6]s^15 + * Note + * (1) the leading entries are truncated to 24 binary point. + * (2) Remez error for T3(s) is bounded by 2**(-72.4) + * 2**(-24) + * _________V___________________ + * T1(n): |_________|___________________| + * _______ ______________________ + * T2(j): |_______|______________________| + * ____ _______________________ + * 2s: |____|_______________________| + * __________________________ + * + T3(s)-2s: |__________________________| + * ------------------------------------------- + * [leading] + [Trailing] + */ + /* INDENT ON */ + ix = H0_WORD(x); + n2 = (ix >> 16) - 0x3fff; /* exponent of x, range:3-10 */ + y = scalbnl(x, -n2); /* y = scale x to [1,2] */ + n2 += n2; /* 2n */ + j = (ix >> 10) & 0x3f; /* j */ + z = 1.0078125L + (long double) j * 0.015625L; /* z[j]=1+j/64+1/128 */ + j2 = j + j; + t1 = y + z; + t2 = y - z; + r = one / t1; + u = r * t2; /* u = (y-z)/(y+z) */ + t1 = CHOPPED(t1); + t4 = T2[j2 + 1] + T1[n2 + 1]; + z2 = u * u; + k = H0_WORD(u) & 0x7fffffff; + t3 = T2[j2] + T1[n2]; + for (t5 = T3[6], i = 5; i >= 0; i--) + t5 = z2 * t5 + T3[i]; + if ((k >> 16) < 0x3fec) { /* |u|<2**-19 */ + t2 = t4 + u * (two + z2 * t5); + } else { + t5 = t4 + (u * z2) * t5; + u2 = u + u; + v = (long double) ((int) (u2 * t24)) * p24; + t2 = t5 + r * ((two * t2 - v * t1) - v * (y - (t1 - z))); + t3 += v; + } + ss_h = CHOPPED((t2 + t3)); + ss_l = t2 - (ss_h - t3); +/* INDENT OFF */ +/* + * compute ww = (x-.5)*(log(x)-1) + .5*(log(2pi)-1) + 1/x*(P(1/x^2))) + * where ss = log(x) - 1 in already in extra precision + */ + /* INDENT ON */ + z = one / x; + r = x - half; + r_h = CHOPPED((r)); + w_h = r_h * ss_h + hln2pim1_h; + z2 = z * z; + w = (r - r_h) * ss_h + r * ss_l; + t1 = GP[19]; + for (i = 18; i > 0; i--) + t1 = z2 * t1 + GP[i]; + w += hln2pim1_l; + w_l = z * (GP[0] + z2 * t1) + w; + k = (int) ((w_h + w_l) * invln2_32 + half); + + /* compute the exponential of w_h+w_l */ + + j = k & 0x1f; + *m = k >> 5; + t3 = (long double) k; + + /* perform w - k*ln2_32 (represent as w_h - w_l) */ + t1 = w_h - t3 * ln2_32hi; + t2 = t3 * ln2_32lo; + w = t2 - w_l; + w_h = t1 - w; + w_l = w - (t1 - w_h); + + /* compute exp(w_h-w_l) */ + z = w_h - w_l; + for (t1 = Et[10], i = 9; i >= 0; i--) + t1 = z * t1 + Et[i]; + t3 = w_h - (w_l - (z * z) * t1); /* t3 = expm1(z) */ + zz.l = S_trail[j] * (one + t3) + S[j] * t3; + zz.h = S[j]; + return (zz); +} + +/* INDENT OFF */ +/* + * kpsin(x)= sin(pi*x)/pi + * 3 5 7 9 11 27 + * = x+ks[0]*x +ks[1]*x +ks[2]*x +ks[3]*x +ks[4]*x + ... + ks[12]*x + */ +static const long double ks[] = { + -1.64493406684822643647241516664602518705158902870e+0000L, + +8.11742425283353643637002772405874238094995726160e-0001L, + -1.90751824122084213696472111835337366232282723933e-0001L, + +2.61478478176548005046532613563241288115395517084e-0002L, + -2.34608103545582363750893072647117829448016479971e-0003L, + +1.48428793031071003684606647212534027556262040158e-0004L, + -6.97587366165638046518462722252768122615952898698e-0006L, + +2.53121740413702536928659271747187500934840057929e-0007L, + -7.30471182221385990397683641695766121301933621956e-0009L, + +1.71653847451163495739958249695549313987973589884e-0010L, + -3.34813314714560776122245796929054813458341420565e-0012L, + +5.50724992262622033449487808306969135431411753047e-0014L, + -7.67678132753577998601234393215802221104236979928e-0016L, +}; +/* INDENT ON */ + +/* + * assume x is not tiny and positive + */ +static struct LDouble +kpsin(long double x) { + long double z, t1, t2; + struct LDouble xx; + int i; + + z = x * x; + xx.h = x; + for (t2 = ks[12], i = 11; i > 0; i--) + t2 = z * t2 + ks[i]; + t1 = z * x; + t2 *= z * t1; + xx.l = t1 * ks[0] + t2; + return (xx); +} + +/* INDENT OFF */ +/* + * kpcos(x)= cos(pi*x)/pi + * 2 4 6 8 10 12 + * = 1/pi +kc[0]*x +kc[1]*x +kc[2]*x +kc[3]*x +kc[4]*x +kc[5]*x + * + * 2 4 6 8 10 22 + * = 1/pi - pi/2*x +kc[0]*x +kc[1]*x +kc[2]*x +kc[3]*x +...+kc[9]*x + * + * -pi/2*x*x = (npi_2_h + npi_2_l) * (x_f+x_l)*(x_f+x_l) + * = npi_2_h*(x_f+x_l)*(x_f+x_l) + npi_2_l*x*x + * = npi_2_h*x_f*x_f + npi_2_h*(x*x-x_f*x_f) + npi_2_l*x*x + * = npi_2_h*x_f*x_f + npi_2_h*(x+x_f)*(x-x_f) + npi_2_l*x*x + * Here x_f = (long double) (float)x + * Note that pi/2(in hex) = + * 1.921FB54442D18469898CC51701B839A252049C1114CF98E804177D4C76273644A29 + * npi_2_h = -pi/2 chopped to 25 bits = -1.921FB50000000000000000000000000 = + * -1.570796310901641845703125000000000 and + * npi_2_l = + * -0.0000004442D18469898CC51701B839A252049C1114CF98E804177D4C76273644A29 = + * -.0000000158932547735281966916397514420985846996875529104874722961539 = + * -1.5893254773528196691639751442098584699687552910487472296153e-8 + * 1/pi(in hex) = + * .517CC1B727220A94FE13ABE8FA9A6EE06DB14ACC9E21C820FF28B1D5EF5DE2B + * will be splitted into: + * one_pi_h = 1/pi chopped to 48 bits = .517CC1B727220000000000... and + * one_pi_l = .0000000000000A94FE13ABE8FA9A6EE06DB14ACC9E21C820FF28B1D5EF5DE2B + */ + +static const long double +#if defined(__i386) +one_pi_h = 0.3183098861481994390487670898437500L, /* 31 bits */ +one_pi_l = 3.559123248900043690127872406891929148e-11L, +#else +one_pi_h = 0.31830988618379052468299050815403461456298828125L, +one_pi_l = 1.46854777018590994109505931010230912897495334688117e-16L, +#endif +npi_2_h = -1.570796310901641845703125000000000L, +npi_2_l = -1.5893254773528196691639751442098584699687552910e-8L; + +static const long double kc[] = { + +1.29192819501249250731151312779548918765320728489e+0000L, + -4.25027339979557573976029596929319207009444090366e-0001L, + +7.49080661650990096109672954618317623888421628613e-0002L, + -8.21458866111282287985539464173976555436050215120e-0003L, + +6.14202578809529228503205255165761204750211603402e-0004L, + -3.33073432691149607007217330302595267179545908740e-0005L, + +1.36970959047832085796809745461530865597993680204e-0006L, + -4.41780774262583514450246512727201806217271097336e-0008L, + +1.14741409212381858820016567664488123478660705759e-0009L, + -2.44261236114707374558437500654381006300502749632e-0011L, +}; +/* INDENT ON */ + +/* + * assume x is not tiny and positive + */ +static struct LDouble +kpcos(long double x) { + long double z, t1, t2, t3, t4, x4, x8; + int i; + struct LDouble xx; + + z = x * x; + xx.h = one_pi_h; + t1 = (long double) ((float) x); + x4 = z * z; + t2 = npi_2_l * z + npi_2_h * (x + t1) * (x - t1); + for (i = 8, t3 = kc[9]; i >= 0; i--) + t3 = z * t3 + kc[i]; + t3 = one_pi_l + x4 * t3; + t4 = t1 * t1 * npi_2_h; + x8 = t2 + t3; + xx.l = x8 + t4; + return (xx); +} + +/* INDENT OFF */ +static const long double + /* 0.13486180573279076968979393577465291700642511139552429398233 */ +#if defined(__i386) +t0z1 = 0.1348618057327907696779385054997035808810L, +t0z1_l = 1.1855430274949336125392717150257379614654e-20L, +#else +t0z1 = 0.1348618057327907696897939357746529168654L, +t0z1_l = 1.4102088588676879418739164486159514674310e-37L, +#endif + /* 0.46163214496836234126265954232572132846819620400644635129599 */ +#if defined(__i386) +t0z2 = 0.4616321449683623412538115843295472018326L, +t0z2_l = 8.84795799617412663558532305039261747030640e-21L, +#else +t0z2 = 0.46163214496836234126265954232572132343318L, +t0z2_l = 5.03501162329616380465302666480916271611101e-36L, +#endif + /* 0.81977310110050060178786870492160699631174407846245179119586 */ +#if defined(__i386) +t0z3 = 0.81977310110050060178773362329351925836817L, +t0z3_l = 1.350816280877379435658077052534574556256230e-22L +#else +t0z3 = 0.8197731011005006017878687049216069516957449L, +t0z3_l = 4.461599916947014419045492615933551648857380e-35L +#endif +; +/* INDENT ON */ + +/* + * gamma(x+i) for 0 <= x < 1 + */ +static struct LDouble +gam_n(int i, long double x) { + struct LDouble rr, yy; + long double r1, r2, t2, z, xh, xl, yh, yl, zh, z1, z2, zl, x5, wh, wl; + + /* compute yy = gamma(x+1) */ + if (x > 0.2845L) { + if (x > 0.6374L) { + r1 = x - t0z3; + r2 = CHOPPED((r1 - t0z3_l)); + t2 = r1 - r2; + yy = GT3(r2, t2 - t0z3_l); + } else { + r1 = x - t0z2; + r2 = CHOPPED((r1 - t0z2_l)); + t2 = r1 - r2; + yy = GT2(r2, t2 - t0z2_l); + } + } else { + r1 = x - t0z1; + r2 = CHOPPED((r1 - t0z1_l)); + t2 = r1 - r2; + yy = GT1(r2, t2 - t0z1_l); + } + /* compute gamma(x+i) = (x+i-1)*...*(x+1)*yy, 0<i<8 */ + switch (i) { + case 0: /* yy/x */ + r1 = one / x; + xh = CHOPPED((x)); /* x is not tiny */ + rr.h = CHOPPED(((yy.h + yy.l) * r1)); + rr.l = r1 * (yy.h - rr.h * xh) - ((r1 * rr.h) * (x - xh) - + r1 * yy.l); + break; + case 1: /* yy */ + rr.h = yy.h; + rr.l = yy.l; + break; + case 2: /* (x+1)*yy */ + z = x + one; /* may not be exact */ + zh = CHOPPED((z)); + rr.h = zh * yy.h; + rr.l = z * yy.l + (x - (zh - one)) * yy.h; + break; + case 3: /* (x+2)*(x+1)*yy */ + z1 = x + one; + z2 = x + 2.0L; + z = z1 * z2; + xh = CHOPPED((z)); + zh = CHOPPED((z1)); + xl = (x - (zh - one)) * (z2 + zh) - (xh - zh * (zh + one)); + + rr.h = xh * yy.h; + rr.l = z * yy.l + xl * yy.h; + break; + + case 4: /* (x+1)*(x+3)*(x+2)*yy */ + z1 = x + 2.0L; + z2 = (x + one) * (x + 3.0L); + zh = CHOPPED(z1); + zl = x - (zh - 2.0L); + xh = CHOPPED(z2); + xl = zl * (zh + z1) - (xh - (zh * zh - one)); + + /* wh+wl=(x+2)*yy */ + wh = CHOPPED((z1 * (yy.h + yy.l))); + wl = (zl * yy.h + z1 * yy.l) - (wh - zh * yy.h); + + rr.h = xh * wh; + rr.l = z2 * wl + xl * wh; + + break; + case 5: /* ((x+1)*(x+4)*(x+2)*(x+3))*yy */ + z1 = x + 2.0L; + z2 = x + 3.0L; + z = z1 * z2; + zh = CHOPPED((z1)); + yh = CHOPPED((z)); + yl = (x - (zh - 2.0L)) * (z2 + zh) - (yh - zh * (zh + one)); + z2 = z - 2.0L; + z *= z2; + xh = CHOPPED((z)); + xl = yl * (z2 + yh) - (xh - yh * (yh - 2.0L)); + rr.h = xh * yy.h; + rr.l = z * yy.l + xl * yy.h; + break; + case 6: /* ((x+1)*(x+2)*(x+3)*(x+4)*(x+5))*yy */ + z1 = x + 2.0L; + z2 = x + 3.0L; + z = z1 * z2; + zh = CHOPPED((z1)); + yh = CHOPPED((z)); + z1 = x - (zh - 2.0L); + yl = z1 * (z2 + zh) - (yh - zh * (zh + one)); + z2 = z - 2.0L; + x5 = x + 5.0L; + z *= z2; + xh = CHOPPED(z); + zh += 3.0; + xl = yl * (z2 + yh) - (xh - yh * (yh - 2.0L)); + /* xh+xl=(x+1)*...*(x+4) */ + /* wh+wl=(x+5)*yy */ + wh = CHOPPED((x5 * (yy.h + yy.l))); + wl = (z1 * yy.h + x5 * yy.l) - (wh - zh * yy.h); + rr.h = wh * xh; + rr.l = z * wl + xl * wh; + break; + case 7: /* ((x+1)*(x+2)*(x+3)*(x+4)*(x+5)*(x+6))*yy */ + z1 = x + 3.0L; + z2 = x + 4.0L; + z = z2 * z1; + zh = CHOPPED((z1)); + yh = CHOPPED((z)); /* yh+yl = (x+3)(x+4) */ + yl = (x - (zh - 3.0L)) * (z2 + zh) - (yh - (zh * (zh + one))); + z1 = x + 6.0L; + z2 = z - 2.0L; /* z2 = (x+2)*(x+5) */ + z *= z2; + xh = CHOPPED((z)); + xl = yl * (z2 + yh) - (xh - yh * (yh - 2.0L)); + /* xh+xl=(x+2)*...*(x+5) */ + /* wh+wl=(x+1)(x+6)*yy */ + z2 -= 4.0L; /* z2 = (x+1)(x+6) */ + wh = CHOPPED((z2 * (yy.h + yy.l))); + wl = (z2 * yy.l + yl * yy.h) - (wh - (yh - 6.0L) * yy.h); + rr.h = wh * xh; + rr.l = z * wl + xl * wh; + } + return (rr); +} + +long double +tgammal(long double x) { + struct LDouble ss, ww; + long double t, t1, t2, t3, t4, t5, w, y, z, z1, z2, z3, z5; + int i, j, m, ix, hx, xk; + unsigned lx; + + hx = H0_WORD(x); + lx = H3_WORD(x); + ix = hx & 0x7fffffff; + y = x; + if (ix < 0x3f8e0000) { /* x < 2**-113 */ + return (one / x); + } + if (ix >= 0x7fff0000) + return (x * ((hx < 0)? zero : x)); /* Inf or NaN */ + if (x > overflow) /* overflow threshold */ + return (x * 1.0e4932L); + if (hx >= 0x40020000) { /* x >= 8 */ + ww = large_gam(x, &m); + w = ww.h + ww.l; + return (scalbnl(w, m)); + } + + if (hx > 0) { /* x from 0 to 8 */ + i = (int) x; + ww = gam_n(i, x - (long double) i); + return (ww.h + ww.l); + } + /* INDENT OFF */ + /* negative x */ + /* + * compute xk = + * -2 ... x is an even int (-inf is considered an even #) + * -1 ... x is an odd int + * +0 ... x is not an int but chopped to an even int + * +1 ... x is not an int but chopped to an odd int + */ + /* INDENT ON */ + xk = 0; +#if defined(__i386) + if (ix >= 0x403e0000) { /* x >= 2**63 } */ + if (ix >= 0x403f0000) + xk = -2; + else + xk = -2 + (lx & 1); +#else + if (ix >= 0x406f0000) { /* x >= 2**112 */ + if (ix >= 0x40700000) + xk = -2; + else + xk = -2 + (lx & 1); +#endif + } else if (ix >= 0x3fff0000) { + w = -x; + t1 = floorl(w); + t2 = t1 * half; + t3 = floorl(t2); + if (t1 == w) { + if (t2 == t3) + xk = -2; + else + xk = -1; + } else { + if (t2 == t3) + xk = 0; + else + xk = 1; + } + } + + if (xk < 0) { + /* return NaN. Ideally gamma(-n)= (-1)**(n+1) * inf */ + return (x - x) / (x - x); + } + + /* + * negative underflow thresold -(1774+9ulp) + */ + if (x < -1774.0000000000000000000000000000017749370L) { + z = tiny / x; + if (xk == 1) + z = -z; + return (z * tiny); + } + + /* INDENT OFF */ + /* + * now compute gamma(x) by -1/((sin(pi*y)/pi)*gamma(1+y)), y = -x + */ + /* + * First compute ss = -sin(pi*y)/pi so that + * gamma(x) = 1/(ss*gamma(1+y)) + */ + /* INDENT ON */ + y = -x; + j = (int) y; + z = y - (long double) j; + if (z > 0.3183098861837906715377675L) + if (z > 0.6816901138162093284622325L) + ss = kpsin(one - z); + else + ss = kpcos(0.5L - z); + else + ss = kpsin(z); + if (xk == 0) { + ss.h = -ss.h; + ss.l = -ss.l; + } + + /* Then compute ww = gamma(1+y), note that result scale to 2**m */ + m = 0; + if (j < 7) { + ww = gam_n(j + 1, z); + } else { + w = y + one; + if ((lx & 1) == 0) { /* y+1 exact (note that y<184) */ + ww = large_gam(w, &m); + } else { + t = w - one; + if (t == y) { /* y+one exact */ + ww = large_gam(w, &m); + } else { /* use y*gamma(y) */ + if (j == 7) + ww = gam_n(j, z); + else + ww = large_gam(y, &m); + t4 = ww.h + ww.l; + t1 = CHOPPED((y)); + t2 = CHOPPED((t4)); + /* t4 will not be too large */ + ww.l = y * (ww.l - (t2 - ww.h)) + (y - t1) * t2; + ww.h = t1 * t2; + } + } + } + + /* compute 1/(ss*ww) */ + t3 = ss.h + ss.l; + t4 = ww.h + ww.l; + t1 = CHOPPED((t3)); + t2 = CHOPPED((t4)); + z1 = ss.l - (t1 - ss.h); /* (t1,z1) = ss */ + z2 = ww.l - (t2 - ww.h); /* (t2,z2) = ww */ + t3 = t3 * t4; /* t3 = ss*ww */ + z3 = one / t3; /* z3 = 1/(ss*ww) */ + t5 = t1 * t2; + z5 = z1 * t4 + t1 * z2; /* (t5,z5) = ss*ww */ + t1 = CHOPPED((t3)); /* (t1,z1) = ss*ww */ + z1 = z5 - (t1 - t5); + t2 = CHOPPED((z3)); /* leading 1/(ss*ww) */ + z2 = z3 * (t2 * z1 - (one - t2 * t1)); + z = t2 - z2; + + return (scalbnl(z, -m)); +} |