[Top][All Lists]
[Date Prev][Date Next][Thread Prev][Thread Next][Date Index][Thread Index]
new modules 'exp2', 'exp2f', 'exp2l'
|
From: |
Bruno Haible |
|
Subject: |
new modules 'exp2', 'exp2f', 'exp2l' |
|
Date: |
Fri, 09 Mar 2012 02:19:58 +0100 |
|
User-agent: |
KMail/4.7.4 (Linux/3.1.0-1.2-desktop; KDE/4.7.4; x86_64; ; ) |
The next math function after exp() and expm1() is exp2(). Implemented for
all three floating-point types.
The notable bugs that had to be worked around:
OpenBSD 4.9:
exp2(0.6) = 1.517358639986284397 should be 1.515716566...
OpenBSD 4.9:
exp2l(NaN) = 0.0 should be NaN
IRIX 6.5:
exp2l(-Inf) = 1.0 should be 0.0
2012-03-08 Bruno Haible <address@hidden>
exp2l-ieee: Work around test failure on OpenBSD 4.9 and IRIX 6.5.
* m4/exp2l-ieee.m4: New file.
* m4/exp2l.m4 (gl_FUNC_EXP2L): If gl_FUNC_EXP2L_IEEE is present,
test whether exp2l works with a NaN argument and with a negative
infinity argument. Replace it if not.
* lib/math.in.h (exp2l): Override if REPLACE_EXP2L is 1.
* m4/math_h.m4 (gl_MATH_H_DEFAULTS): Initialize REPLACE_EXP2L.
* modules/math (Makefile.am): Substitute REPLACE_EXP2L.
* modules/exp2l (configure.ac): Consider REPLACE_EXP2L.
(Depends-on): Update conditions.
* modules/exp2l-ieee (Files): Add m4/exp2l-ieee.m4.
(configure.ac): Invoke gl_FUNC_EXP2L_IEEE.
* doc/posix-functions/exp2l.texi: Mention the exp2l-ieee module.
Tests for module 'exp2l-ieee'.
* modules/exp2l-ieee-tests: New file.
* tests/test-exp2l-ieee.c: New file.
New module 'exp2l-ieee'.
* modules/exp2l-ieee: New file.
Tests for module 'exp2-ieee'.
* modules/exp2-ieee-tests: New file.
* tests/test-exp2-ieee.c: New file.
New module 'exp2-ieee'.
* modules/exp2-ieee: New file.
Tests for module 'exp2f-ieee'.
* modules/exp2f-ieee-tests: New file.
* tests/test-exp2f-ieee.c: New file.
* tests/test-exp2-ieee.h: New file.
New module 'exp2f-ieee'.
* modules/exp2f-ieee: New file.
2012-03-08 Bruno Haible <address@hidden>
Tests for module 'exp2l'.
* modules/exp2l-tests: New file.
* tests/test-exp2l.c: New file.
New module 'exp2l'.
* lib/math.in.h (exp2l): New declaration.
* lib/exp2l.c: New file.
* lib/expl-table.c: New file, extracted from lib/expl.c.
* lib/expl.c (gl_expl_table): New declaration.
(expl): Remove expl_table. Update reference.
* m4/exp2l.m4: New file.
* m4/math_h.m4 (gl_MATH_H): Test whether exp2l is declared.
(gl_MATH_H_DEFAULTS): Initialize GNULIB_EXP2L, HAVE_DECL_EXP2L.
* modules/math (Makefile.am): Substitute GNULIB_EXP2L, HAVE_DECL_EXP2L.
* modules/exp2l: New file.
* modules/expl (Files): Add lib/expl-table.c.
(configure.ac): Compile also expl-table.c.
* tests/test-math-c++.cc: Check the declaration of exp2l.
* doc/posix-functions/exp2l.texi: Mention the new module and the IRIX
problem.
2012-03-08 Bruno Haible <address@hidden>
Tests for module 'exp2f'.
* modules/exp2f-tests: New file.
* tests/test-exp2f.c: New file.
New module 'exp2f'.
* lib/math.in.h (exp2f): New declaration.
* lib/exp2f.c: New file.
* m4/exp2f.m4: New file.
* m4/math_h.m4 (gl_MATH_H): Test whether exp2f is declared.
(gl_MATH_H_DEFAULTS): Initialize GNULIB_EXP2F, HAVE_DECL_EXP2F.
* modules/math (Makefile.am): Substitute GNULIB_EXP2F, HAVE_DECL_EXP2F.
* modules/exp2f: New file.
* tests/test-math-c++.cc: Check the declaration of exp2f.
* doc/posix-functions/exp2f.texi: Mention the new module and the
IRIX problem.
2012-03-08 Bruno Haible <address@hidden>
Tests for module 'exp2'.
* modules/exp2-tests: New file.
* tests/test-exp2.c: New file.
* tests/test-exp2.h: New file.
New module 'exp2'.
* lib/math.in.h (exp2): New declaration.
* lib/exp2.c: New file.
* m4/exp2.m4: New file.
* m4/math_h.m4 (gl_MATH_H): Test whether exp2 is declared.
(gl_MATH_H_DEFAULTS): Initialize GNULIB_EXP2, HAVE_DECL_EXP2,
REPLACE_EXP2.
* modules/math (Makefile.am): Substitute GNULIB_EXP2, HAVE_DECL_EXP2,
REPLACE_EXP2.
* modules/exp2: New file.
* tests/test-math-c++.cc: Check the declaration of exp2.
* doc/posix-functions/exp2.texi: Mention the new module and the IRIX
and OpenBSD problems.
Here are the most important files.
================================= lib/exp2.c =================================
/* Exponential base 2 function.
Copyright (C) 2012 Free Software Foundation, Inc.
This program is free software: you can redistribute it and/or modify
it under the terms of the GNU General Public License as published by
the Free Software Foundation; either version 3 of the License, or
(at your option) any later version.
This program is distributed in the hope that it will be useful,
but WITHOUT ANY WARRANTY; without even the implied warranty of
MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
GNU General Public License for more details.
You should have received a copy of the GNU General Public License
along with this program. If not, see <http://www.gnu.org/licenses/>. */
#include <config.h>
/* Specification. */
#include <math.h>
#include <float.h>
/* Best possible approximation of log(2) as a 'double'. */
#define LOG2 0.693147180559945309417232121458176568075
/* Best possible approximation of 1/log(2) as a 'double'. */
#define LOG2_INVERSE 1.44269504088896340735992468100189213743
/* Best possible approximation of log(2)/256 as a 'double'. */
#define LOG2_BY_256 0.00270760617406228636491106297444600221904
/* Best possible approximation of 256/log(2) as a 'double'. */
#define LOG2_BY_256_INVERSE 369.329930467574632284140718336484387181
double
exp2 (double x)
{
/* exp2(x) = exp(x*log(2)).
If we would compute it like this, there would be rounding errors for
integer or near-integer values of x. To avoid these, we inline the
algorithm for exp(), and the multiplication with log(2) cancels a
division by log(2). */
if (isnand (x))
return x;
if (x > (double) DBL_MAX_EXP)
/* x > DBL_MAX_EXP
hence exp2(x) > 2^DBL_MAX_EXP, overflows to Infinity. */
return HUGE_VAL;
if (x < (double) (DBL_MIN_EXP - 1 - DBL_MANT_DIG))
/* x < (DBL_MIN_EXP - 1 - DBL_MANT_DIG)
hence exp2(x) < 2^(DBL_MIN_EXP-1-DBL_MANT_DIG),
underflows to zero. */
return 0.0;
/* Decompose x into
x = n + m/256 + y/log(2)
where
n is an integer,
m is an integer, -128 <= m <= 128,
y is a number, |y| <= log(2)/512 + epsilon = 0.00135...
Then
exp2(x) = 2^n * exp(m * log(2)/256) * exp(y)
The first factor is an ldexpl() call.
The second factor is a table lookup.
The third factor is computed
- either as sinh(y) + cosh(y)
where sinh(y) is computed through the power series:
sinh(y) = y + y^3/3! + y^5/5! + ...
and cosh(y) is computed as hypot(1, sinh(y)),
- or as exp(2*z) = (1 + tanh(z)) / (1 - tanh(z))
where z = y/2
and tanh(z) is computed through its power series:
tanh(z) = z
- 1/3 * z^3
+ 2/15 * z^5
- 17/315 * z^7
+ 62/2835 * z^9
- 1382/155925 * z^11
+ 21844/6081075 * z^13
- 929569/638512875 * z^15
+ ...
Since |z| <= log(2)/1024 < 0.0007, the relative error of the z^7 term
is < 0.0007^6 < 2^-60 <= 2^-DBL_MANT_DIG, therefore we can truncate
the series after the z^5 term. */
{
double nm = round (x * 256.0); /* = 256 * n + m */
double z = (x * 256.0 - nm) * (LOG2_BY_256 * 0.5);
/* Coefficients of the power series for tanh(z). */
#define TANH_COEFF_1 1.0
#define TANH_COEFF_3 -0.333333333333333333333333333333333333334
#define TANH_COEFF_5 0.133333333333333333333333333333333333334
#define TANH_COEFF_7 -0.053968253968253968253968253968253968254
#define TANH_COEFF_9 0.0218694885361552028218694885361552028218
#define TANH_COEFF_11 -0.00886323552990219656886323552990219656886
#define TANH_COEFF_13 0.00359212803657248101692546136990581435026
#define TANH_COEFF_15 -0.00145583438705131826824948518070211191904
double z2 = z * z;
double tanh_z =
((TANH_COEFF_5
* z2 + TANH_COEFF_3)
* z2 + TANH_COEFF_1)
* z;
double exp_y = (1.0 + tanh_z) / (1.0 - tanh_z);
int n = (int) round (nm * (1.0 / 256.0));
int m = (int) nm - 256 * n;
/* exp_table[i] = exp((i - 128) * log(2)/256).
Computed in GNU clisp through
(setf (long-float-digits) 128)
(setq a 0L0)
(setf (long-float-digits) 256)
(dotimes (i 257)
(format t " ~D,~%"
(float (exp (* (/ (- i 128) 256) (log 2L0))) a))) */
static const double exp_table[257] =
{
0.707106781186547524400844362104849039284,
0.709023942160207598920563322257676190836,
0.710946301084582779904674297352120049962,
0.71287387205274715340350157671438300618,
0.714806669195985005617532889137569953044,
0.71674470668389442125974978427737336719,
0.71868799872449116280161304224785251353,
0.720636559564312831364255957304947586072,
0.72259040348852331001850312073583545284,
0.724549544821017490259402705487111270714,
0.726513997924526282423036245842287293786,
0.728483777200721910815451524818606761737,
0.730458897090323494325651445155310766577,
0.732439372073202913296664682112279175616,
0.734425216668490963430822513132890712652,
0.736416445434683797507470506133110286942,
0.738413072969749655693453740187024961962,
0.740415113911235885228829945155951253966,
0.742422582936376250272386395864403155277,
0.744435494762198532693663597314273242753,
0.746453864145632424600321765743336770838,
0.748477705883617713391824861712720862423,
0.750507034813212760132561481529764324813,
0.752541865811703272039672277899716132493,
0.75458221379671136988300977551659676571,
0.756628093726304951096818488157633113612,
0.75867952059910734940489114658718937343,
0.760736509454407291763130627098242426467,
0.762799075372269153425626844758470477304,
0.76486723347364351194254345936342587308,
0.766940998920478000900300751753859329456,
0.769020386915828464216738479594307884331,
0.771105412703970411806145931045367420652,
0.773196091570510777431255778146135325272,
0.77529243884249997956151370535341912283,
0.777394469888544286059157168801667390437,
0.779502200118918483516864044737428940745,
0.781615644985678852072965367573877941354,
0.783734819982776446532455855478222575498,
0.78585974064617068462428149076570281356,
0.787990422553943243227635080090952504452,
0.790126881326412263402248482007960521995,
0.79226913262624686505993407346567890838,
0.794417192158581972116898048814333564685,
0.796571075671133448968624321559534367934,
0.798730798954313549131410147104316569576,
0.800896377841346676896923120795476813684,
0.803067828208385462848443946517563571584,
0.805245165974627154089760333678700291728,
0.807428407102430320039984581575729114268,
0.809617567597431874649880866726368203972,
0.81181266350866441589760797777344082227,
0.814013710928673883424109261007007338614,
0.816220725993637535170713864466769240053,
0.818433724883482243883852017078007231025,
0.82065272382200311435413206848451310067,
0.822877739076982422259378362362911222833,
0.825108786960308875483586738272485101678,
0.827345883828097198786118571797909120834,
0.829589046080808042697824787210781231927,
0.831838290163368217523168228488195222638,
0.834093632565291253329796170708536192903,
0.836355089820798286809404612069230711295,
0.83862267850893927589613232455870870518,
0.84089641525371454303112547623321489504,
0.84317631672419664796432298771385230143,
0.84546239963465259098692866759361830709,
0.84775468074466634749045860363936420312,
0.850053176859261734750681286748751167545,
0.852357904829025611837203530384718316326,
0.854668881550231413551897437515331498025,
0.856986123964963019301812477839166009452,
0.859309649061238957814672188228156252257,
0.861639473873136948607517116872358729753,
0.863975615480918781121524414614366207052,
0.866318091011155532438509953514163469652,
0.868666917636853124497101040936083380124,
0.871022112577578221729056715595464682243,
0.873383693099584470038708278290226842228,
0.875751676515939078050995142767930296012,
0.878126080186649741556080309687656610647,
0.880506921518791912081045787323636256171,
0.882894217966636410521691124969260937028,
0.885287987031777386769987907431242017412,
0.88768824626326062627527960009966160388,
0.89009501325771220447985955243623523504,
0.892508305659467490072110281986409916153,
0.8949281411607004980029443898876582985,
0.897354537501553593213851621063890907178,
0.899787512470267546027427696662514569756,
0.902227083903311940153838631655504844215,
0.904673269685515934269259325789226871994,
0.907126087750199378124917300181170171233,
0.909585556079304284147971563828178746372,
0.91205169270352665549806275316460097744,
0.914524515702448671545983912696158354092,
0.91700404320467123174354159479414442804,
0.919490293387946858856304371174663918816,
0.921983284479312962533570386670938449637,
0.92448303475522546419252726694739603678,
0.92698956254169278419622653516884831976,
0.929502886214410192307650717745572682403,
0.932023024198894522404814545597236289343,
0.934549994970619252444512104439799143264,
0.93708381705514995066499947497722326722,
0.93962450902828008902058735120448448827,
0.942172089516167224843810351983745154882,
0.944726577195469551733539267378681531548,
0.947287990793482820670109326713462307376,
0.949856349088277632361251759806996099924,
0.952431670908837101825337466217860725517,
0.955013975135194896221170529572799135168,
0.957603280698573646936305635147915443924,
0.960199606581523736948607188887070611744,
0.962802971818062464478519115091191368377,
0.965413395493813583952272948264534783197,
0.968030896746147225299027952283345762418,
0.970655494764320192607710617437589705184,
0.973287208789616643172102023321302921373,
0.97592605811548914795551023340047499377,
0.978572062087700134509161125813435745597,
0.981225240104463713381244885057070325016,
0.983885611616587889056366801238014683926,
0.98655319612761715646797006813220671315,
0.989228013193975484129124959065583667775,
0.99191008242510968492991311132615581644,
0.994599423483633175652477686222166314457,
0.997296056085470126257659913847922601123,
1.0,
1.00271127505020248543074558845036204047,
1.0054299011128028213513839559347998147,
1.008155898118417515783094890817201039276,
1.01088928605170046002040979056186052439,
1.013630084951489438840258929063939929597,
1.01637831491095303794049311378629406276,
1.0191339960777379496848780958207928794,
1.02189714865411667823448013478329943978,
1.02466779289713564514828907627081492763,
1.0274459491187636965388611939222137815,
1.030231637686041012871707902453904567093,
1.033024879021228422500108283970460918086,
1.035825693601957120029983209018081371844,
1.03863410196137879061243669795463973258,
1.04145012468831614126454607901189312648,
1.044273782427413840321966478739929008784,
1.04710509587928986612990725022711224056,
1.04994408580068726608203812651590790906,
1.05279077300462632711989120298074630319,
1.05564517836055715880834132515293865216,
1.058507322794512690105772109683716645074,
1.061377227289262080950567678003883726294,
1.06425491288446454978861125700158022068,
1.06714040067682361816952112099280916261,
1.0700337118202417735424119367576235685,
1.072934867525975551385035450873827585343,
1.075843889062791037803228648476057074063,
1.07876079775711979374068003743848295849,
1.081685614993215201942115594422531125643,
1.08461836221330923781610517190661434161,
1.087559060917769665346797830944039707867,
1.09050773266525765920701065576070797899,
1.09346439907288585422822014625044716208,
1.096429081816376823386138295859248481766,
1.09940180263022198546369696823882990404,
1.10238258330784094355641420942564685751,
1.10537144570174125558827469625695031104,
1.108368411723678638009423649426619850137,
1.111373503344817603850149254228916637444,
1.1143867425958925363088129569196030678,
1.11740815156736919905457996308578026665,
1.12043775240960668442900387986631301277,
1.123475567333019800733729739775321431954,
1.12652161860824189979479864378703477763,
1.129575928566288145997264988840249825907,
1.13263851959871922798707372367762308438,
1.13570941415780551424039033067611701343,
1.13878863475669165370383028384151125472,
1.14187620396956162271229760828788093894,
1.14497214443180421939441388822291589579,
1.14807647884017900677879966269734268003,
1.15118922995298270581775963520198253612,
1.154310420590216039548221528724806960684,
1.157440073633751029613085766293796821106,
1.16057821202749874636945947257609098625,
1.16372485877757751381357359909218531234,
1.166880036952481570555516298414089287834,
1.170043769683250188080259035792738573,
1.17321608016363724753480435451324538889,
1.176396991650281276284645728483848641054,
1.17958652746287594548610056676944051898,
1.182784710984341029924457204693850757966,
1.18599156566099383137126564953421556374,
1.18920711500272106671749997056047591529,
1.19243138258315122214272755814543101148,
1.195664392039827374583837049865451975705,
1.19890616707438048177030255797630020695,
1.202156731452703142096396957497765876003,
1.205416109005123825604211432558411335666,
1.208684323626581577354792255889216998484,
1.21196139927680119446816891773249304545,
1.215247359980468878116520251338798457624,
1.218542229827408361758207148117394510724,
1.221846032972757516903891841911570785836,
1.225158793637145437709464594384845353707,
1.22848053610687000569400895779278184036,
1.2318112847340759358845566532127948166,
1.235151063936933305692912507415415760294,
1.238499898199816567833368865859612431545,
1.24185781207348404859367746872659560551,
1.24522483017525793277520496748615267417,
1.24860097718920473662176609730249554519,
1.25198627786631627006020603178920359732,
1.255380757024691089579390657442301194595,
1.25878443954971644307786044181516261876,
1.26219735039425070801401025851841645967,
1.265619514578806324196273999873453036296,
1.26905095719173322255441908103233800472,
1.27249170338940275123669204418460217677,
1.27594177839639210038120243475928938891,
1.27940120750566922691358797002785254596,
1.28287001607877828072666978102151405111,
1.286348229546025533601482208069738348355,
1.28983587340666581223274729549155218968,
1.293332973229089436725559789048704304684,
1.296839554651009665933754117792451159835,
1.30035564337965065101414056707091779129,
1.30388126519193589857452364895199736833,
1.30741644593467724479715157747196172848,
1.310961211524764341922991786330755849366,
1.314515587949354658485983613383997794965,
1.318079601266063994690185647066116617664,
1.32165327760315751432651181233060922616,
1.32523664315974129462953709549872167411,
1.32882972420595439547865089632866510792,
1.33243254708316144935164337949073577407,
1.33604513820414577344262790437186975929,
1.33966752405330300536003066972435257602,
1.34329973118683526382421714618163087542,
1.346941786232945835788173713229537282075,
1.35059371589203439140852219606013396004,
1.35425554693689272829801474014070280434,
1.357927306212901046494536695671766697446,
1.36160902063822475558553593883194147464,
1.36530071720401181543069836033754285543,
1.36900242297459061192960113298219283217,
1.37271416508766836928499785714471721579,
1.37643597075453010021632280551868696026,
1.380167867260238095581945274358283464697,
1.383909881963831954872659527265192818,
1.387662042298529159042861017950775988896,
1.39142437577192618714983552956624344668,
1.395196909966200178275574599249220994716,
1.398979672538311140209528136715194969206,
1.40277269122020470637471352433337881711,
1.40657599381901544248361973255451684411,
1.410389608217270704414375128268675481145,
1.41421356237309504880168872420969807857
};
return ldexp (exp_table[128 + m] * exp_y, n);
}
}
================================= lib/exp2f.c =================================
/* Exponential base 2 function.
Copyright (C) 2011-2012 Free Software Foundation, Inc.
This program is free software: you can redistribute it and/or modify
it under the terms of the GNU General Public License as published by
the Free Software Foundation; either version 3 of the License, or
(at your option) any later version.
This program is distributed in the hope that it will be useful,
but WITHOUT ANY WARRANTY; without even the implied warranty of
MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
GNU General Public License for more details.
You should have received a copy of the GNU General Public License
along with this program. If not, see <http://www.gnu.org/licenses/>. */
#include <config.h>
/* Specification. */
#include <math.h>
float
exp2f (float x)
{
return (float) exp2 ((double) x);
}
================================= lib/exp2l.c =================================
/* Exponential base 2 function.
Copyright (C) 2011-2012 Free Software Foundation, Inc.
This program is free software: you can redistribute it and/or modify
it under the terms of the GNU General Public License as published by
the Free Software Foundation; either version 3 of the License, or
(at your option) any later version.
This program is distributed in the hope that it will be useful,
but WITHOUT ANY WARRANTY; without even the implied warranty of
MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
GNU General Public License for more details.
You should have received a copy of the GNU General Public License
along with this program. If not, see <http://www.gnu.org/licenses/>. */
#include <config.h>
/* Specification. */
#include <math.h>
#if HAVE_SAME_LONG_DOUBLE_AS_DOUBLE
long double
exp2l (long double x)
{
return exp2 (x);
}
#else
# include <float.h>
/* gl_expl_table[i] = exp((i - 128) * log(2)/256). */
extern const long double gl_expl_table[257];
/* Best possible approximation of log(2) as a 'long double'. */
#define LOG2 0.693147180559945309417232121458176568075L
/* Best possible approximation of 1/log(2) as a 'long double'. */
#define LOG2_INVERSE 1.44269504088896340735992468100189213743L
/* Best possible approximation of log(2)/256 as a 'long double'. */
#define LOG2_BY_256 0.00270760617406228636491106297444600221904L
/* Best possible approximation of 256/log(2) as a 'long double'. */
#define LOG2_BY_256_INVERSE 369.329930467574632284140718336484387181L
long double
exp2l (long double x)
{
/* exp2(x) = exp(x*log(2)).
If we would compute it like this, there would be rounding errors for
integer or near-integer values of x. To avoid these, we inline the
algorithm for exp(), and the multiplication with log(2) cancels a
division by log(2). */
if (isnanl (x))
return x;
if (x > (long double) LDBL_MAX_EXP)
/* x > LDBL_MAX_EXP
hence exp2(x) > 2^LDBL_MAX_EXP, overflows to Infinity. */
return HUGE_VALL;
if (x < (long double) (LDBL_MIN_EXP - 1 - LDBL_MANT_DIG))
/* x < (LDBL_MIN_EXP - 1 - LDBL_MANT_DIG)
hence exp2(x) < 2^(LDBL_MIN_EXP-1-LDBL_MANT_DIG),
underflows to zero. */
return 0.0L;
/* Decompose x into
x = n + m/256 + y/log(2)
where
n is an integer,
m is an integer, -128 <= m <= 128,
y is a number, |y| <= log(2)/512 + epsilon = 0.00135...
Then
exp2(x) = 2^n * exp(m * log(2)/256) * exp(y)
The first factor is an ldexpl() call.
The second factor is a table lookup.
The third factor is computed
- either as sinh(y) + cosh(y)
where sinh(y) is computed through the power series:
sinh(y) = y + y^3/3! + y^5/5! + ...
and cosh(y) is computed as hypot(1, sinh(y)),
- or as exp(2*z) = (1 + tanh(z)) / (1 - tanh(z))
where z = y/2
and tanh(z) is computed through its power series:
tanh(z) = z
- 1/3 * z^3
+ 2/15 * z^5
- 17/315 * z^7
+ 62/2835 * z^9
- 1382/155925 * z^11
+ 21844/6081075 * z^13
- 929569/638512875 * z^15
+ ...
Since |z| <= log(2)/1024 < 0.0007, the relative error of the z^13 term
is < 0.0007^12 < 2^-120 <= 2^-LDBL_MANT_DIG, therefore we can truncate
the series after the z^11 term. */
{
long double nm = roundl (x * 256.0L); /* = 256 * n + m */
long double z = (x * 256.0L - nm) * (LOG2_BY_256 * 0.5L);
/* Coefficients of the power series for tanh(z). */
#define TANH_COEFF_1 1.0L
#define TANH_COEFF_3 -0.333333333333333333333333333333333333334L
#define TANH_COEFF_5 0.133333333333333333333333333333333333334L
#define TANH_COEFF_7 -0.053968253968253968253968253968253968254L
#define TANH_COEFF_9 0.0218694885361552028218694885361552028218L
#define TANH_COEFF_11 -0.00886323552990219656886323552990219656886L
#define TANH_COEFF_13 0.00359212803657248101692546136990581435026L
#define TANH_COEFF_15 -0.00145583438705131826824948518070211191904L
long double z2 = z * z;
long double tanh_z =
(((((TANH_COEFF_11
* z2 + TANH_COEFF_9)
* z2 + TANH_COEFF_7)
* z2 + TANH_COEFF_5)
* z2 + TANH_COEFF_3)
* z2 + TANH_COEFF_1)
* z;
long double exp_y = (1.0L + tanh_z) / (1.0L - tanh_z);
int n = (int) roundl (nm * (1.0L / 256.0L));
int m = (int) nm - 256 * n;
return ldexpl (gl_expl_table[128 + m] * exp_y, n);
}
}
#endif
===============================================================================
| [Prev in Thread] |
Current Thread |
[Next in Thread] |
- new modules 'exp2', 'exp2f', 'exp2l',
Bruno Haible <=