Mercurial > gnulib
annotate lib/expm1l.c @ 40231:9b3c79fdfe0b
strtod: fix clash with strtold
Problem reported for RHEL 5 by Jesse Caldwell (Bug#34817).
* lib/strtod.c (compute_minus_zero, minus_zero):
Simplify by remving the macro / external variable,
and having just a function. User changed. This avoids
the need for an external variable that might clash.
author | Paul Eggert <eggert@cs.ucla.edu> |
---|---|
date | Mon, 11 Mar 2019 16:40:29 -0700 |
parents | b06060465f09 |
children |
rev | line source |
---|---|
16585 | 1 /* Exponential function minus one. |
40057
b06060465f09
maint: Run 'make update-copyright'
Paul Eggert <eggert@cs.ucla.edu>
parents:
19484
diff
changeset
|
2 Copyright (C) 2011-2019 Free Software Foundation, Inc. |
16585 | 3 |
4 This program is free software: you can redistribute it and/or modify | |
5 it under the terms of the GNU General Public License as published by | |
6 the Free Software Foundation; either version 3 of the License, or | |
7 (at your option) any later version. | |
8 | |
9 This program is distributed in the hope that it will be useful, | |
10 but WITHOUT ANY WARRANTY; without even the implied warranty of | |
11 MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the | |
12 GNU General Public License for more details. | |
13 | |
14 You should have received a copy of the GNU General Public License | |
19190 | 15 along with this program. If not, see <https://www.gnu.org/licenses/>. */ |
16585 | 16 |
17 #include <config.h> | |
18 | |
19 /* Specification. */ | |
20 #include <math.h> | |
21 | |
22 #if HAVE_SAME_LONG_DOUBLE_AS_DOUBLE | |
23 | |
24 long double | |
25 expm1l (long double x) | |
26 { | |
27 return expm1 (x); | |
28 } | |
29 | |
30 #else | |
31 | |
32 # include <float.h> | |
33 | |
34 /* A value slightly larger than log(2). */ | |
35 #define LOG2_PLUS_EPSILON 0.6931471805599454L | |
36 | |
37 /* Best possible approximation of log(2) as a 'long double'. */ | |
38 #define LOG2 0.693147180559945309417232121458176568075L | |
39 | |
40 /* Best possible approximation of 1/log(2) as a 'long double'. */ | |
41 #define LOG2_INVERSE 1.44269504088896340735992468100189213743L | |
42 | |
43 /* Best possible approximation of log(2)/256 as a 'long double'. */ | |
44 #define LOG2_BY_256 0.00270760617406228636491106297444600221904L | |
45 | |
46 /* Best possible approximation of 256/log(2) as a 'long double'. */ | |
47 #define LOG2_BY_256_INVERSE 369.329930467574632284140718336484387181L | |
48 | |
49 /* The upper 32 bits of log(2)/256. */ | |
50 #define LOG2_BY_256_HI_PART 0.0027076061733168899081647396087646484375L | |
51 /* log(2)/256 - LOG2_HI_PART. */ | |
52 #define LOG2_BY_256_LO_PART \ | |
53 0.000000000000745396456746323365681353781544922399845L | |
54 | |
55 long double | |
56 expm1l (long double x) | |
57 { | |
58 if (isnanl (x)) | |
59 return x; | |
60 | |
61 if (x >= (long double) LDBL_MAX_EXP * LOG2_PLUS_EPSILON) | |
62 /* x > LDBL_MAX_EXP * log(2) | |
63 hence exp(x) > 2^LDBL_MAX_EXP, overflows to Infinity. */ | |
64 return HUGE_VALL; | |
65 | |
66 if (x <= (long double) (- LDBL_MANT_DIG) * LOG2_PLUS_EPSILON) | |
67 /* x < (- LDBL_MANT_DIG) * log(2) | |
68 hence 0 < exp(x) < 2^-LDBL_MANT_DIG, | |
69 hence -1 < exp(x)-1 < -1 + 2^-LDBL_MANT_DIG | |
70 rounds to -1. */ | |
71 return -1.0L; | |
72 | |
73 if (x <= - LOG2_PLUS_EPSILON) | |
74 /* 0 < exp(x) < 1/2. | |
75 Just compute exp(x), then subtract 1. */ | |
76 return expl (x) - 1.0L; | |
77 | |
78 if (x == 0.0L) | |
79 /* Return a zero with the same sign as x. */ | |
80 return x; | |
81 | |
82 /* Decompose x into | |
83 x = n * log(2) + m * log(2)/256 + y | |
84 where | |
85 n is an integer, n >= -1, | |
86 m is an integer, -128 <= m <= 128, | |
87 y is a number, |y| <= log(2)/512 + epsilon = 0.00135... | |
88 Then | |
89 exp(x) = 2^n * exp(m * log(2)/256) * exp(y) | |
90 Compute each factor minus one, then combine them through the | |
91 formula (1+a)*(1+b) = 1 + (a+b*(1+a)), | |
92 that is (1+a)*(1+b) - 1 = a + b*(1+a). | |
93 The first factor is an ldexpl() call. | |
94 The second factor is a table lookup. | |
95 The third factor minus one is computed | |
96 - either as sinh(y) + sinh(y)^2 / (cosh(y) + 1) | |
97 where sinh(y) is computed through the power series: | |
98 sinh(y) = y + y^3/3! + y^5/5! + ... | |
99 and cosh(y) is computed as hypot(1, sinh(y)), | |
100 - or as exp(2*z) - 1 = 2 * tanh(z) / (1 - tanh(z)) | |
101 where z = y/2 | |
102 and tanh(z) is computed through its power series: | |
103 tanh(z) = z | |
104 - 1/3 * z^3 | |
105 + 2/15 * z^5 | |
106 - 17/315 * z^7 | |
107 + 62/2835 * z^9 | |
108 - 1382/155925 * z^11 | |
109 + 21844/6081075 * z^13 | |
110 - 929569/638512875 * z^15 | |
111 + ... | |
16651 | 112 Since |z| <= log(2)/1024 < 0.0007, the relative contribution of the |
113 z^13 term is < 0.0007^12 < 2^-120 <= 2^-LDBL_MANT_DIG, therefore we | |
114 can truncate the series after the z^11 term. | |
16585 | 115 |
116 Given the usual bounds LDBL_MAX_EXP <= 16384, LDBL_MANT_DIG <= 120, we | |
117 can estimate x: -84 <= x <= 11357. | |
118 This means, when dividing x by log(2), where we want x mod log(2) | |
119 to be precise to LDBL_MANT_DIG bits, we have to use an approximation | |
120 to log(2) that has 14+LDBL_MANT_DIG bits. */ | |
121 | |
122 { | |
123 long double nm = roundl (x * LOG2_BY_256_INVERSE); /* = 256 * n + m */ | |
124 /* n has at most 15 bits, nm therefore has at most 23 bits, therefore | |
125 n * LOG2_HI_PART is computed exactly, and n * LOG2_LO_PART is computed | |
126 with an absolute error < 2^15 * 2e-10 * 2^-LDBL_MANT_DIG. */ | |
127 long double y_tmp = x - nm * LOG2_BY_256_HI_PART; | |
128 long double y = y_tmp - nm * LOG2_BY_256_LO_PART; | |
129 long double z = 0.5L * y; | |
130 | |
131 /* Coefficients of the power series for tanh(z). */ | |
132 #define TANH_COEFF_1 1.0L | |
133 #define TANH_COEFF_3 -0.333333333333333333333333333333333333334L | |
134 #define TANH_COEFF_5 0.133333333333333333333333333333333333334L | |
135 #define TANH_COEFF_7 -0.053968253968253968253968253968253968254L | |
136 #define TANH_COEFF_9 0.0218694885361552028218694885361552028218L | |
137 #define TANH_COEFF_11 -0.00886323552990219656886323552990219656886L | |
138 #define TANH_COEFF_13 0.00359212803657248101692546136990581435026L | |
139 #define TANH_COEFF_15 -0.00145583438705131826824948518070211191904L | |
140 | |
141 long double z2 = z * z; | |
142 long double tanh_z = | |
143 (((((TANH_COEFF_11 | |
144 * z2 + TANH_COEFF_9) | |
145 * z2 + TANH_COEFF_7) | |
146 * z2 + TANH_COEFF_5) | |
147 * z2 + TANH_COEFF_3) | |
148 * z2 + TANH_COEFF_1) | |
149 * z; | |
150 | |
151 long double exp_y_minus_1 = 2.0L * tanh_z / (1.0L - tanh_z); | |
152 | |
153 int n = (int) roundl (nm * (1.0L / 256.0L)); | |
154 int m = (int) nm - 256 * n; | |
155 | |
156 /* expm1l_table[i] = exp((i - 128) * log(2)/256) - 1. | |
157 Computed in GNU clisp through | |
158 (setf (long-float-digits) 128) | |
159 (setq a 0L0) | |
160 (setf (long-float-digits) 256) | |
161 (dotimes (i 257) | |
162 (format t " ~D,~%" | |
163 (float (- (exp (* (/ (- i 128) 256) (log 2L0))) 1) a))) */ | |
164 static const long double expm1l_table[257] = | |
165 { | |
166 -0.292893218813452475599155637895150960716L, | |
167 -0.290976057839792401079436677742323809165L, | |
168 -0.289053698915417220095325702647879950038L, | |
169 -0.287126127947252846596498423285616993819L, | |
170 -0.285193330804014994382467110862430046956L, | |
171 -0.283255293316105578740250215722626632811L, | |
172 -0.281312001275508837198386957752147486471L, | |
173 -0.279363440435687168635744042695052413926L, | |
174 -0.277409596511476689981496879264164547161L, | |
175 -0.275450455178982509740597294512888729286L, | |
176 -0.273486002075473717576963754157712706214L, | |
177 -0.271516222799278089184548475181393238264L, | |
178 -0.269541102909676505674348554844689233423L, | |
179 -0.267560627926797086703335317887720824384L, | |
180 -0.265574783331509036569177486867109287348L, | |
181 -0.263583554565316202492529493866889713058L, | |
182 -0.261586927030250344306546259812975038038L, | |
183 -0.259584886088764114771170054844048746036L, | |
184 -0.257577417063623749727613604135596844722L, | |
185 -0.255564505237801467306336402685726757248L, | |
186 -0.253546135854367575399678234256663229163L, | |
187 -0.251522294116382286608175138287279137577L, | |
188 -0.2494929651867872398674385184702356751864L, | |
189 -0.247458134188296727960327722100283867508L, | |
190 -0.24541778620328863011699022448340323429L, | |
191 -0.243371906273695048903181511842366886387L, | |
192 -0.24132047940089265059510885341281062657L, | |
193 -0.239263490545592708236869372901757573532L, | |
194 -0.237200924627730846574373155241529522695L, | |
195 -0.23513276652635648805745654063657412692L, | |
196 -0.233059001079521999099699248246140670544L, | |
197 -0.230979613084171535783261520405692115669L, | |
198 -0.228894587296029588193854068954632579346L, | |
199 -0.226803908429489222568744221853864674729L, | |
200 -0.224707561157500020438486294646580877171L, | |
201 -0.222605530111455713940842831198332609562L, | |
202 -0.2204977998810815164831359552625710592544L, | |
203 -0.218384355014321147927034632426122058645L, | |
204 -0.2162651800172235534675441445217774245016L, | |
205 -0.214140259353829315375718509234297186439L, | |
206 -0.212009577446056756772364919909047495547L, | |
207 -0.209873118673587736597751517992039478005L, | |
208 -0.2077308673737531349400659265343210916196L, | |
209 -0.205582807841418027883101951185666435317L, | |
210 -0.2034289243288665510313756784404656320656L, | |
211 -0.201269201045686450868589852895683430425L, | |
212 -0.199103622158653323103076879204523186316L, | |
213 -0.196932171791614537151556053482436428417L, | |
214 -0.19475483402537284591023966632129970827L, | |
215 -0.192571592897569679960015418424270885733L, | |
216 -0.190382432402568125350119133273631796029L, | |
217 -0.188187336491335584102392022226559177731L, | |
218 -0.185986289071326116575890738992992661386L, | |
219 -0.183779274006362464829286135533230759947L, | |
220 -0.181566275116517756116147982921992768975L, | |
221 -0.17934727617799688564586793151548689933L, | |
222 -0.1771222609230175777406216376370887771665L, | |
223 -0.1748912130396911245164132617275148983224L, | |
224 -0.1726541161719028012138814282020908791644L, | |
225 -0.170410953919191957302175212789218768074L, | |
226 -0.168161709836631782476831771511804777363L, | |
227 -0.165906367434708746670203829291463807099L, | |
228 -0.1636449101792017131905953879307692887046L, | |
229 -0.161377321491060724103867675441291294819L, | |
230 -0.15910358474628545696887452376678510496L, | |
231 -0.15682368327580335203567701228614769857L, | |
232 -0.154537600365347409013071332406381692911L, | |
233 -0.152245319255333652509541396360635796882L, | |
234 -0.149946823140738265249318713251248832456L, | |
235 -0.147642095170974388162796469615281683674L, | |
236 -0.145331118449768586448102562484668501975L, | |
237 -0.143013876035036980698187522160833990549L, | |
238 -0.140690350938761042185327811771843747742L, | |
239 -0.138360526126863051392482883127641270248L, | |
240 -0.136024384519081218878475585385633792948L, | |
241 -0.133681908988844467561490046485836530346L, | |
242 -0.131333082363146875502898959063916619876L, | |
243 -0.128977887422421778270943284404535317759L, | |
244 -0.126616306900415529961291721709773157771L, | |
245 -0.1242483234840609219490048572320697039866L, | |
246 -0.121873919813350258443919690312343389353L, | |
247 -0.1194930784812080879189542126763637438278L, | |
248 -0.11710578203336358947830887503073906297L, | |
249 -0.1147120129682226132300120925687579825894L, | |
250 -0.1123117537367393737247203999003383961205L, | |
251 -0.1099049867422877955201404475637647649574L, | |
252 -0.1074916943405325099278897180135900838485L, | |
253 -0.1050718588392995019970556101123417014993L, | |
254 -0.102645462498446406786148378936109092823L, | |
255 -0.1002124875297324539725723033374854302454L, | |
256 -0.097772916096688059846161368344495155786L, | |
257 -0.0953267303144840657307406742107731280055L, | |
258 -0.092873912249800621875082699818829828767L, | |
259 -0.0904144439206957158520284361718212536293L, | |
260 -0.0879483072964733445019372468353990225585L, | |
261 -0.0854754842975513284540160873038416459095L, | |
262 -0.0829959567953287682564584052058555719614L, | |
263 -0.080509706612053141143695628825336081184L, | |
264 -0.078016715520687037466429613329061550362L, | |
265 -0.075516965244774535807472733052603963221L, | |
266 -0.073010437458307215803773464831151680239L, | |
267 -0.070497113785589807692349282254427317595L, | |
268 -0.067976975801105477595185454402763710658L, | |
269 -0.0654500050293807475554878955602008567352L, | |
270 -0.06291618294485004933500052502277673278L, | |
271 -0.0603754909717199109794126487955155117284L, | |
272 -0.0578279104838327751561896480162548451191L, | |
273 -0.055273422804530448266460732621318468453L, | |
274 -0.0527120092065171793298906732865376926237L, | |
275 -0.0501436509117223676387482401930039000769L, | |
276 -0.0475683290911628981746625337821392744829L, | |
277 -0.044986024864805103778829470427200864833L, | |
278 -0.0423967193014263530636943648520845560749L, | |
279 -0.0398003934184762630513928111129293882558L, | |
280 -0.0371970281819375355214808849088086316225L, | |
281 -0.0345866045061864160477270517354652168038L, | |
282 -0.0319691032538527747009720477166542375817L, | |
283 -0.0293445052356798073922893825624102948152L, | |
284 -0.0267127912103833568278979766786970786276L, | |
285 -0.0240739418845108520444897665995250062307L, | |
286 -0.0214279379122998654908388741865642544049L, | |
287 -0.018774759895536286618755114942929674984L, | |
288 -0.016114388383412110943633198761985316073L, | |
289 -0.01344680387238284353202993186779328685225L, | |
290 -0.0107719868060245158708750409344163322253L, | |
291 -0.00808991757489031507008688867384418356197L, | |
292 -0.00540057651636682434752231377783368554176L, | |
293 -0.00270394391452987374234008615207739887604L, | |
294 0.0L, | |
295 0.00271127505020248543074558845036204047301L, | |
296 0.0054299011128028213513839559347998147001L, | |
297 0.00815589811841751578309489081720103927357L, | |
298 0.0108892860517004600204097905618605243881L, | |
299 0.01363008495148943884025892906393992959584L, | |
300 0.0163783149109530379404931137862940627635L, | |
301 0.0191339960777379496848780958207928793998L, | |
302 0.0218971486541166782344801347832994397821L, | |
303 0.0246677928971356451482890762708149276281L, | |
304 0.0274459491187636965388611939222137814994L, | |
305 0.0302316376860410128717079024539045670944L, | |
306 0.0330248790212284225001082839704609180866L, | |
307 0.0358256936019571200299832090180813718441L, | |
308 0.0386341019613787906124366979546397325796L, | |
309 0.0414501246883161412645460790118931264803L, | |
310 0.0442737824274138403219664787399290087847L, | |
311 0.0471050958792898661299072502271122405627L, | |
312 0.049944085800687266082038126515907909062L, | |
313 0.0527907730046263271198912029807463031904L, | |
314 0.05564517836055715880834132515293865216L, | |
315 0.0585073227945126901057721096837166450754L, | |
316 0.0613772272892620809505676780038837262945L, | |
317 0.0642549128844645497886112570015802206798L, | |
318 0.0671404006768236181695211209928091626068L, | |
319 0.070033711820241773542411936757623568504L, | |
320 0.0729348675259755513850354508738275853402L, | |
321 0.0758438890627910378032286484760570740623L, | |
322 0.0787607977571197937406800374384829584908L, | |
323 0.081685614993215201942115594422531125645L, | |
324 0.0846183622133092378161051719066143416095L, | |
325 0.0875590609177696653467978309440397078697L, | |
326 0.090507732665257659207010655760707978993L, | |
327 0.0934643990728858542282201462504471620805L, | |
328 0.096429081816376823386138295859248481766L, | |
329 0.099401802630221985463696968238829904039L, | |
330 0.1023825833078409435564142094256468575113L, | |
331 0.1053714457017412555882746962569503110404L, | |
332 0.1083684117236786380094236494266198501387L, | |
333 0.111373503344817603850149254228916637444L, | |
334 0.1143867425958925363088129569196030678004L, | |
335 0.1174081515673691990545799630857802666544L, | |
336 0.120437752409606684429003879866313012766L, | |
337 0.1234755673330198007337297397753214319548L, | |
338 0.1265216186082418997947986437870347776336L, | |
339 0.12957592856628814599726498884024982591L, | |
340 0.1326385195987192279870737236776230843835L, | |
341 0.135709414157805514240390330676117013429L, | |
342 0.1387886347566916537038302838415112547204L, | |
343 0.14187620396956162271229760828788093894L, | |
344 0.144972144431804219394413888222915895793L, | |
345 0.148076478840179006778799662697342680031L, | |
346 0.15118922995298270581775963520198253612L, | |
347 0.154310420590216039548221528724806960684L, | |
348 0.157440073633751029613085766293796821108L, | |
349 0.160578212027498746369459472576090986253L, | |
350 0.163724858777577513813573599092185312343L, | |
351 0.166880036952481570555516298414089287832L, | |
352 0.1700437696832501880802590357927385730016L, | |
353 0.1732160801636372475348043545132453888896L, | |
354 0.176396991650281276284645728483848641053L, | |
355 0.1795865274628759454861005667694405189764L, | |
356 0.182784710984341029924457204693850757963L, | |
357 0.185991565660993831371265649534215563735L, | |
358 0.189207115002721066717499970560475915293L, | |
359 0.192431382583151222142727558145431011481L, | |
360 0.1956643920398273745838370498654519757025L, | |
361 0.1989061670743804817703025579763002069494L, | |
362 0.202156731452703142096396957497765876L, | |
363 0.205416109005123825604211432558411335666L, | |
364 0.208684323626581577354792255889216998483L, | |
365 0.211961399276801194468168917732493045449L, | |
366 0.2152473599804688781165202513387984576236L, | |
367 0.218542229827408361758207148117394510722L, | |
368 0.221846032972757516903891841911570785834L, | |
369 0.225158793637145437709464594384845353705L, | |
370 0.2284805361068700056940089577927818403626L, | |
371 0.231811284734075935884556653212794816605L, | |
372 0.235151063936933305692912507415415760296L, | |
373 0.238499898199816567833368865859612431546L, | |
374 0.241857812073484048593677468726595605511L, | |
375 0.245224830175257932775204967486152674173L, | |
376 0.248600977189204736621766097302495545187L, | |
377 0.251986277866316270060206031789203597321L, | |
378 0.255380757024691089579390657442301194598L, | |
379 0.258784439549716443077860441815162618762L, | |
380 0.262197350394250708014010258518416459672L, | |
381 0.265619514578806324196273999873453036297L, | |
382 0.269050957191733222554419081032338004715L, | |
383 0.272491703389402751236692044184602176772L, | |
384 0.27594177839639210038120243475928938891L, | |
385 0.279401207505669226913587970027852545961L, | |
386 0.282870016078778280726669781021514051111L, | |
387 0.286348229546025533601482208069738348358L, | |
388 0.289835873406665812232747295491552189677L, | |
389 0.293332973229089436725559789048704304684L, | |
390 0.296839554651009665933754117792451159835L, | |
391 0.300355643379650651014140567070917791291L, | |
392 0.303881265191935898574523648951997368331L, | |
393 0.30741644593467724479715157747196172848L, | |
394 0.310961211524764341922991786330755849366L, | |
395 0.314515587949354658485983613383997794966L, | |
396 0.318079601266063994690185647066116617661L, | |
397 0.321653277603157514326511812330609226158L, | |
398 0.325236643159741294629537095498721674113L, | |
399 0.32882972420595439547865089632866510792L, | |
400 0.33243254708316144935164337949073577407L, | |
401 0.336045138204145773442627904371869759286L, | |
402 0.339667524053303005360030669724352576023L, | |
403 0.343299731186835263824217146181630875424L, | |
404 0.346941786232945835788173713229537282073L, | |
405 0.350593715892034391408522196060133960038L, | |
406 0.354255546936892728298014740140702804344L, | |
407 0.357927306212901046494536695671766697444L, | |
408 0.361609020638224755585535938831941474643L, | |
409 0.365300717204011815430698360337542855432L, | |
410 0.369002422974590611929601132982192832168L, | |
411 0.372714165087668369284997857144717215791L, | |
412 0.376435970754530100216322805518686960261L, | |
413 0.380167867260238095581945274358283464698L, | |
414 0.383909881963831954872659527265192818003L, | |
415 0.387662042298529159042861017950775988895L, | |
416 0.391424375771926187149835529566243446678L, | |
417 0.395196909966200178275574599249220994717L, | |
418 0.398979672538311140209528136715194969206L, | |
419 0.402772691220204706374713524333378817108L, | |
420 0.40657599381901544248361973255451684411L, | |
421 0.410389608217270704414375128268675481146L, | |
422 0.414213562373095048801688724209698078569L | |
423 }; | |
424 | |
425 long double t = expm1l_table[128 + m]; | |
426 | |
427 /* (1+t) * (1+exp_y_minus_1) - 1 = t + (1+t)*exp_y_minus_1 */ | |
428 long double p_minus_1 = t + (1.0L + t) * exp_y_minus_1; | |
429 | |
430 long double s = ldexpl (1.0L, n) - 1.0L; | |
431 | |
432 /* (1+s) * (1+p_minus_1) - 1 = s + (1+s)*p_minus_1 */ | |
433 return s + (1.0L + s) * p_minus_1; | |
434 } | |
435 } | |
436 | |
437 #endif |