gcc/libquadmath/math/j0q.c
David S. Miller 7cf8c994b6 atanq.c (atanq): Update from GLIBC.
2012-11-22  David S. Miller  <davem@davemloft.net>
            Tobias Burnus  <burnus@net-b.de>
            Joseph Myers  <joseph@codesourcery.com>

        * math/atanq.c (atanq): Update from GLIBC. Handle tiny and
        very large arguments properly.
        * math/j0q.c (y0q): Update from GLIBC. Avoid arithmetic
        underflow when 'x' is very small.
        * math/j1q.c (y1q): Ditto.
        * math/log1pq.c (log1pq): Update from GLIBC. Saturate
        nonzero exponents with absolute value below 0x1p-128 to
        +/- 0x1p-128.
        * math/powq.c (powq): Update from GLIBC. If xm1 is
        smaller than LDBL_EPSILON/2.0L, just return xm1.


Co-Authored-By: Joseph Myers <joseph@codesourcery.com>
Co-Authored-By: Tobias Burnus <burnus@net-b.de>

From-SVN: r193716
2012-11-22 00:55:29 +01:00

923 lines
31 KiB
C

/* j0l.c
*
* Bessel function of order zero
*
*
*
* SYNOPSIS:
*
* __float128 x, y, j0l();
*
* y = j0l( x );
*
*
*
* DESCRIPTION:
*
* Returns Bessel function of first kind, order zero of the argument.
*
* The domain is divided into two major intervals [0, 2] and
* (2, infinity). In the first interval the rational approximation
* is J0(x) = 1 - x^2 / 4 + x^4 R(x^2)
* The second interval is further partitioned into eight equal segments
* of 1/x.
*
* J0(x) = sqrt(2/(pi x)) (P0(x) cos(X) - Q0(x) sin(X)),
* X = x - pi/4,
*
* and the auxiliary functions are given by
*
* J0(x)cos(X) + Y0(x)sin(X) = sqrt( 2/(pi x)) P0(x),
* P0(x) = 1 + 1/x^2 R(1/x^2)
*
* Y0(x)cos(X) - J0(x)sin(X) = sqrt( 2/(pi x)) Q0(x),
* Q0(x) = 1/x (-.125 + 1/x^2 R(1/x^2))
*
*
*
* ACCURACY:
*
* Absolute error:
* arithmetic domain # trials peak rms
* IEEE 0, 30 100000 1.7e-34 2.4e-35
*
*
*/
/* y0l.c
*
* Bessel function of the second kind, order zero
*
*
*
* SYNOPSIS:
*
* __float128 x, y, y0l();
*
* y = y0l( x );
*
*
*
* DESCRIPTION:
*
* Returns Bessel function of the second kind, of order
* zero, of the argument.
*
* The approximation is the same as for J0(x), and
* Y0(x) = sqrt(2/(pi x)) (P0(x) sin(X) + Q0(x) cos(X)).
*
* ACCURACY:
*
* Absolute error, when y0(x) < 1; else relative error:
*
* arithmetic domain # trials peak rms
* IEEE 0, 30 100000 3.0e-34 2.7e-35
*
*/
/* Copyright 2001 by Stephen L. Moshier (moshier@na-net.ornl.gov).
This library is free software; you can redistribute it and/or
modify it under the terms of the GNU Lesser General Public
License as published by the Free Software Foundation; either
version 2.1 of the License, or (at your option) any later version.
This library 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
Lesser General Public License for more details.
You should have received a copy of the GNU Lesser General Public
License along with this library; if not, write to the Free Software
Foundation, Inc., 59 Temple Place, Suite 330, Boston, MA 02111-1307 USA */
#include "quadmath-imp.h"
/* 1 / sqrt(pi) */
static const __float128 ONEOSQPI = 5.6418958354775628694807945156077258584405E-1Q;
/* 2 / pi */
static const __float128 TWOOPI = 6.3661977236758134307553505349005744813784E-1Q;
static const __float128 zero = 0.0Q;
/* J0(x) = 1 - x^2/4 + x^2 x^2 R(x^2)
Peak relative error 3.4e-37
0 <= x <= 2 */
#define NJ0_2N 6
static const __float128 J0_2N[NJ0_2N + 1] = {
3.133239376997663645548490085151484674892E16Q,
-5.479944965767990821079467311839107722107E14Q,
6.290828903904724265980249871997551894090E12Q,
-3.633750176832769659849028554429106299915E10Q,
1.207743757532429576399485415069244807022E8Q,
-2.107485999925074577174305650549367415465E5Q,
1.562826808020631846245296572935547005859E2Q,
};
#define NJ0_2D 6
static const __float128 J0_2D[NJ0_2D + 1] = {
2.005273201278504733151033654496928968261E18Q,
2.063038558793221244373123294054149790864E16Q,
1.053350447931127971406896594022010524994E14Q,
3.496556557558702583143527876385508882310E11Q,
8.249114511878616075860654484367133976306E8Q,
1.402965782449571800199759247964242790589E6Q,
1.619910762853439600957801751815074787351E3Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* J0(x)cosX + Y0(x)sinX = sqrt( 2/(pi x)) P0(x), P0(x) = 1 + 1/x^2 R(1/x^2),
0 <= 1/x <= .0625
Peak relative error 3.3e-36 */
#define NP16_IN 9
static const __float128 P16_IN[NP16_IN + 1] = {
-1.901689868258117463979611259731176301065E-16Q,
-1.798743043824071514483008340803573980931E-13Q,
-6.481746687115262291873324132944647438959E-11Q,
-1.150651553745409037257197798528294248012E-8Q,
-1.088408467297401082271185599507222695995E-6Q,
-5.551996725183495852661022587879817546508E-5Q,
-1.477286941214245433866838787454880214736E-3Q,
-1.882877976157714592017345347609200402472E-2Q,
-9.620983176855405325086530374317855880515E-2Q,
-1.271468546258855781530458854476627766233E-1Q,
};
#define NP16_ID 9
static const __float128 P16_ID[NP16_ID + 1] = {
2.704625590411544837659891569420764475007E-15Q,
2.562526347676857624104306349421985403573E-12Q,
9.259137589952741054108665570122085036246E-10Q,
1.651044705794378365237454962653430805272E-7Q,
1.573561544138733044977714063100859136660E-5Q,
8.134482112334882274688298469629884804056E-4Q,
2.219259239404080863919375103673593571689E-2Q,
2.976990606226596289580242451096393862792E-1Q,
1.713895630454693931742734911930937246254E0Q,
3.231552290717904041465898249160757368855E0Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* J0(x)cosX + Y0(x)sinX = sqrt( 2/(pi x)) P0(x), P0(x) = 1 + 1/x^2 R(1/x^2)
0.0625 <= 1/x <= 0.125
Peak relative error 2.4e-35 */
#define NP8_16N 10
static const __float128 P8_16N[NP8_16N + 1] = {
-2.335166846111159458466553806683579003632E-15Q,
-1.382763674252402720401020004169367089975E-12Q,
-3.192160804534716696058987967592784857907E-10Q,
-3.744199606283752333686144670572632116899E-8Q,
-2.439161236879511162078619292571922772224E-6Q,
-9.068436986859420951664151060267045346549E-5Q,
-1.905407090637058116299757292660002697359E-3Q,
-2.164456143936718388053842376884252978872E-2Q,
-1.212178415116411222341491717748696499966E-1Q,
-2.782433626588541494473277445959593334494E-1Q,
-1.670703190068873186016102289227646035035E-1Q,
};
#define NP8_16D 10
static const __float128 P8_16D[NP8_16D + 1] = {
3.321126181135871232648331450082662856743E-14Q,
1.971894594837650840586859228510007703641E-11Q,
4.571144364787008285981633719513897281690E-9Q,
5.396419143536287457142904742849052402103E-7Q,
3.551548222385845912370226756036899901549E-5Q,
1.342353874566932014705609788054598013516E-3Q,
2.899133293006771317589357444614157734385E-2Q,
3.455374978185770197704507681491574261545E-1Q,
2.116616964297512311314454834712634820514E0Q,
5.850768316827915470087758636881584174432E0Q,
5.655273858938766830855753983631132928968E0Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* J0(x)cosX + Y0(x)sinX = sqrt( 2/(pi x)) P0(x), P0(x) = 1 + 1/x^2 R(1/x^2)
0.125 <= 1/x <= 0.1875
Peak relative error 2.7e-35 */
#define NP5_8N 10
static const __float128 P5_8N[NP5_8N + 1] = {
-1.270478335089770355749591358934012019596E-12Q,
-4.007588712145412921057254992155810347245E-10Q,
-4.815187822989597568124520080486652009281E-8Q,
-2.867070063972764880024598300408284868021E-6Q,
-9.218742195161302204046454768106063638006E-5Q,
-1.635746821447052827526320629828043529997E-3Q,
-1.570376886640308408247709616497261011707E-2Q,
-7.656484795303305596941813361786219477807E-2Q,
-1.659371030767513274944805479908858628053E-1Q,
-1.185340550030955660015841796219919804915E-1Q,
-8.920026499909994671248893388013790366712E-3Q,
};
#define NP5_8D 9
static const __float128 P5_8D[NP5_8D + 1] = {
1.806902521016705225778045904631543990314E-11Q,
5.728502760243502431663549179135868966031E-9Q,
6.938168504826004255287618819550667978450E-7Q,
4.183769964807453250763325026573037785902E-5Q,
1.372660678476925468014882230851637878587E-3Q,
2.516452105242920335873286419212708961771E-2Q,
2.550502712902647803796267951846557316182E-1Q,
1.365861559418983216913629123778747617072E0Q,
3.523825618308783966723472468855042541407E0Q,
3.656365803506136165615111349150536282434E0Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* J0(x)cosX + Y0(x)sinX = sqrt( 2/(pi x)) P0(x), P0(x) = 1 + 1/x^2 R(1/x^2)
Peak relative error 3.5e-35
0.1875 <= 1/x <= 0.25 */
#define NP4_5N 9
static const __float128 P4_5N[NP4_5N + 1] = {
-9.791405771694098960254468859195175708252E-10Q,
-1.917193059944531970421626610188102836352E-7Q,
-1.393597539508855262243816152893982002084E-5Q,
-4.881863490846771259880606911667479860077E-4Q,
-8.946571245022470127331892085881699269853E-3Q,
-8.707474232568097513415336886103899434251E-2Q,
-4.362042697474650737898551272505525973766E-1Q,
-1.032712171267523975431451359962375617386E0Q,
-9.630502683169895107062182070514713702346E-1Q,
-2.251804386252969656586810309252357233320E-1Q,
};
#define NP4_5D 9
static const __float128 P4_5D[NP4_5D + 1] = {
1.392555487577717669739688337895791213139E-8Q,
2.748886559120659027172816051276451376854E-6Q,
2.024717710644378047477189849678576659290E-4Q,
7.244868609350416002930624752604670292469E-3Q,
1.373631762292244371102989739300382152416E-1Q,
1.412298581400224267910294815260613240668E0Q,
7.742495637843445079276397723849017617210E0Q,
2.138429269198406512028307045259503811861E1Q,
2.651547684548423476506826951831712762610E1Q,
1.167499382465291931571685222882909166935E1Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* J0(x)cosX + Y0(x)sinX = sqrt( 2/(pi x)) P0(x), P0(x) = 1 + 1/x^2 R(1/x^2)
Peak relative error 2.3e-36
0.25 <= 1/x <= 0.3125 */
#define NP3r2_4N 9
static const __float128 P3r2_4N[NP3r2_4N + 1] = {
-2.589155123706348361249809342508270121788E-8Q,
-3.746254369796115441118148490849195516593E-6Q,
-1.985595497390808544622893738135529701062E-4Q,
-5.008253705202932091290132760394976551426E-3Q,
-6.529469780539591572179155511840853077232E-2Q,
-4.468736064761814602927408833818990271514E-1Q,
-1.556391252586395038089729428444444823380E0Q,
-2.533135309840530224072920725976994981638E0Q,
-1.605509621731068453869408718565392869560E0Q,
-2.518966692256192789269859830255724429375E-1Q,
};
#define NP3r2_4D 9
static const __float128 P3r2_4D[NP3r2_4D + 1] = {
3.682353957237979993646169732962573930237E-7Q,
5.386741661883067824698973455566332102029E-5Q,
2.906881154171822780345134853794241037053E-3Q,
7.545832595801289519475806339863492074126E-2Q,
1.029405357245594877344360389469584526654E0Q,
7.565706120589873131187989560509757626725E0Q,
2.951172890699569545357692207898667665796E1Q,
5.785723537170311456298467310529815457536E1Q,
5.095621464598267889126015412522773474467E1Q,
1.602958484169953109437547474953308401442E1Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* J0(x)cosX + Y0(x)sinX = sqrt( 2/(pi x)) P0(x), P0(x) = 1 + 1/x^2 R(1/x^2)
Peak relative error 1.0e-35
0.3125 <= 1/x <= 0.375 */
#define NP2r7_3r2N 9
static const __float128 P2r7_3r2N[NP2r7_3r2N + 1] = {
-1.917322340814391131073820537027234322550E-7Q,
-1.966595744473227183846019639723259011906E-5Q,
-7.177081163619679403212623526632690465290E-4Q,
-1.206467373860974695661544653741899755695E-2Q,
-1.008656452188539812154551482286328107316E-1Q,
-4.216016116408810856620947307438823892707E-1Q,
-8.378631013025721741744285026537009814161E-1Q,
-6.973895635309960850033762745957946272579E-1Q,
-1.797864718878320770670740413285763554812E-1Q,
-4.098025357743657347681137871388402849581E-3Q,
};
#define NP2r7_3r2D 8
static const __float128 P2r7_3r2D[NP2r7_3r2D + 1] = {
2.726858489303036441686496086962545034018E-6Q,
2.840430827557109238386808968234848081424E-4Q,
1.063826772041781947891481054529454088832E-2Q,
1.864775537138364773178044431045514405468E-1Q,
1.665660052857205170440952607701728254211E0Q,
7.723745889544331153080842168958348568395E0Q,
1.810726427571829798856428548102077799835E1Q,
1.986460672157794440666187503833545388527E1Q,
8.645503204552282306364296517220055815488E0Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* J0(x)cosX + Y0(x)sinX = sqrt( 2/(pi x)) P0(x), P0(x) = 1 + 1/x^2 R(1/x^2)
Peak relative error 1.3e-36
0.3125 <= 1/x <= 0.4375 */
#define NP2r3_2r7N 9
static const __float128 P2r3_2r7N[NP2r3_2r7N + 1] = {
-1.594642785584856746358609622003310312622E-6Q,
-1.323238196302221554194031733595194539794E-4Q,
-3.856087818696874802689922536987100372345E-3Q,
-5.113241710697777193011470733601522047399E-2Q,
-3.334229537209911914449990372942022350558E-1Q,
-1.075703518198127096179198549659283422832E0Q,
-1.634174803414062725476343124267110981807E0Q,
-1.030133247434119595616826842367268304880E0Q,
-1.989811539080358501229347481000707289391E-1Q,
-3.246859189246653459359775001466924610236E-3Q,
};
#define NP2r3_2r7D 8
static const __float128 P2r3_2r7D[NP2r3_2r7D + 1] = {
2.267936634217251403663034189684284173018E-5Q,
1.918112982168673386858072491437971732237E-3Q,
5.771704085468423159125856786653868219522E-2Q,
8.056124451167969333717642810661498890507E-1Q,
5.687897967531010276788680634413789328776E0Q,
2.072596760717695491085444438270778394421E1Q,
3.801722099819929988585197088613160496684E1Q,
3.254620235902912339534998592085115836829E1Q,
1.104847772130720331801884344645060675036E1Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* J0(x)cosX + Y0(x)sinX = sqrt( 2/(pi x)) P0(x), P0(x) = 1 + 1/x^2 R(1/x^2)
Peak relative error 1.2e-35
0.4375 <= 1/x <= 0.5 */
#define NP2_2r3N 8
static const __float128 P2_2r3N[NP2_2r3N + 1] = {
-1.001042324337684297465071506097365389123E-4Q,
-6.289034524673365824853547252689991418981E-3Q,
-1.346527918018624234373664526930736205806E-1Q,
-1.268808313614288355444506172560463315102E0Q,
-5.654126123607146048354132115649177406163E0Q,
-1.186649511267312652171775803270911971693E1Q,
-1.094032424931998612551588246779200724257E1Q,
-3.728792136814520055025256353193674625267E0Q,
-3.000348318524471807839934764596331810608E-1Q,
};
#define NP2_2r3D 8
static const __float128 P2_2r3D[NP2_2r3D + 1] = {
1.423705538269770974803901422532055612980E-3Q,
9.171476630091439978533535167485230575894E-2Q,
2.049776318166637248868444600215942828537E0Q,
2.068970329743769804547326701946144899583E1Q,
1.025103500560831035592731539565060347709E2Q,
2.528088049697570728252145557167066708284E2Q,
2.992160327587558573740271294804830114205E2Q,
1.540193761146551025832707739468679973036E2Q,
2.779516701986912132637672140709452502650E1Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* Y0(x)cosX - J0(x)sinX = sqrt( 2/(pi x)) Q0(x),
Q0(x) = 1/x (-.125 + 1/x^2 R(1/x^2))
Peak relative error 2.2e-35
0 <= 1/x <= .0625 */
#define NQ16_IN 10
static const __float128 Q16_IN[NQ16_IN + 1] = {
2.343640834407975740545326632205999437469E-18Q,
2.667978112927811452221176781536278257448E-15Q,
1.178415018484555397390098879501969116536E-12Q,
2.622049767502719728905924701288614016597E-10Q,
3.196908059607618864801313380896308968673E-8Q,
2.179466154171673958770030655199434798494E-6Q,
8.139959091628545225221976413795645177291E-5Q,
1.563900725721039825236927137885747138654E-3Q,
1.355172364265825167113562519307194840307E-2Q,
3.928058355906967977269780046844768588532E-2Q,
1.107891967702173292405380993183694932208E-2Q,
};
#define NQ16_ID 9
static const __float128 Q16_ID[NQ16_ID + 1] = {
3.199850952578356211091219295199301766718E-17Q,
3.652601488020654842194486058637953363918E-14Q,
1.620179741394865258354608590461839031281E-11Q,
3.629359209474609630056463248923684371426E-9Q,
4.473680923894354600193264347733477363305E-7Q,
3.106368086644715743265603656011050476736E-5Q,
1.198239259946770604954664925153424252622E-3Q,
2.446041004004283102372887804475767568272E-2Q,
2.403235525011860603014707768815113698768E-1Q,
9.491006790682158612266270665136910927149E-1Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* Y0(x)cosX - J0(x)sinX = sqrt( 2/(pi x)) Q0(x),
Q0(x) = 1/x (-.125 + 1/x^2 R(1/x^2))
Peak relative error 5.1e-36
0.0625 <= 1/x <= 0.125 */
#define NQ8_16N 11
static const __float128 Q8_16N[NQ8_16N + 1] = {
1.001954266485599464105669390693597125904E-17Q,
7.545499865295034556206475956620160007849E-15Q,
2.267838684785673931024792538193202559922E-12Q,
3.561909705814420373609574999542459912419E-10Q,
3.216201422768092505214730633842924944671E-8Q,
1.731194793857907454569364622452058554314E-6Q,
5.576944613034537050396518509871004586039E-5Q,
1.051787760316848982655967052985391418146E-3Q,
1.102852974036687441600678598019883746959E-2Q,
5.834647019292460494254225988766702933571E-2Q,
1.290281921604364618912425380717127576529E-1Q,
7.598886310387075708640370806458926458301E-2Q,
};
#define NQ8_16D 11
static const __float128 Q8_16D[NQ8_16D + 1] = {
1.368001558508338469503329967729951830843E-16Q,
1.034454121857542147020549303317348297289E-13Q,
3.128109209247090744354764050629381674436E-11Q,
4.957795214328501986562102573522064468671E-9Q,
4.537872468606711261992676606899273588899E-7Q,
2.493639207101727713192687060517509774182E-5Q,
8.294957278145328349785532236663051405805E-4Q,
1.646471258966713577374948205279380115839E-2Q,
1.878910092770966718491814497982191447073E-1Q,
1.152641605706170353727903052525652504075E0Q,
3.383550240669773485412333679367792932235E0Q,
3.823875252882035706910024716609908473970E0Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* Y0(x)cosX - J0(x)sinX = sqrt( 2/(pi x)) Q0(x),
Q0(x) = 1/x (-.125 + 1/x^2 R(1/x^2))
Peak relative error 3.9e-35
0.125 <= 1/x <= 0.1875 */
#define NQ5_8N 10
static const __float128 Q5_8N[NQ5_8N + 1] = {
1.750399094021293722243426623211733898747E-13Q,
6.483426211748008735242909236490115050294E-11Q,
9.279430665656575457141747875716899958373E-9Q,
6.696634968526907231258534757736576340266E-7Q,
2.666560823798895649685231292142838188061E-5Q,
6.025087697259436271271562769707550594540E-4Q,
7.652807734168613251901945778921336353485E-3Q,
5.226269002589406461622551452343519078905E-2Q,
1.748390159751117658969324896330142895079E-1Q,
2.378188719097006494782174902213083589660E-1Q,
8.383984859679804095463699702165659216831E-2Q,
};
#define NQ5_8D 10
static const __float128 Q5_8D[NQ5_8D + 1] = {
2.389878229704327939008104855942987615715E-12Q,
8.926142817142546018703814194987786425099E-10Q,
1.294065862406745901206588525833274399038E-7Q,
9.524139899457666250828752185212769682191E-6Q,
3.908332488377770886091936221573123353489E-4Q,
9.250427033957236609624199884089916836748E-3Q,
1.263420066165922645975830877751588421451E-1Q,
9.692527053860420229711317379861733180654E-1Q,
3.937813834630430172221329298841520707954E0Q,
7.603126427436356534498908111445191312181E0Q,
5.670677653334105479259958485084550934305E0Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* Y0(x)cosX - J0(x)sinX = sqrt( 2/(pi x)) Q0(x),
Q0(x) = 1/x (-.125 + 1/x^2 R(1/x^2))
Peak relative error 3.2e-35
0.1875 <= 1/x <= 0.25 */
#define NQ4_5N 10
static const __float128 Q4_5N[NQ4_5N + 1] = {
2.233870042925895644234072357400122854086E-11Q,
5.146223225761993222808463878999151699792E-9Q,
4.459114531468296461688753521109797474523E-7Q,
1.891397692931537975547242165291668056276E-5Q,
4.279519145911541776938964806470674565504E-4Q,
5.275239415656560634702073291768904783989E-3Q,
3.468698403240744801278238473898432608887E-2Q,
1.138773146337708415188856882915457888274E-1Q,
1.622717518946443013587108598334636458955E-1Q,
7.249040006390586123760992346453034628227E-2Q,
1.941595365256460232175236758506411486667E-3Q,
};
#define NQ4_5D 9
static const __float128 Q4_5D[NQ4_5D + 1] = {
3.049977232266999249626430127217988047453E-10Q,
7.120883230531035857746096928889676144099E-8Q,
6.301786064753734446784637919554359588859E-6Q,
2.762010530095069598480766869426308077192E-4Q,
6.572163250572867859316828886203406361251E-3Q,
8.752566114841221958200215255461843397776E-2Q,
6.487654992874805093499285311075289932664E-1Q,
2.576550017826654579451615283022812801435E0Q,
5.056392229924022835364779562707348096036E0Q,
4.179770081068251464907531367859072157773E0Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* Y0(x)cosX - J0(x)sinX = sqrt( 2/(pi x)) Q0(x),
Q0(x) = 1/x (-.125 + 1/x^2 R(1/x^2))
Peak relative error 1.4e-36
0.25 <= 1/x <= 0.3125 */
#define NQ3r2_4N 10
static const __float128 Q3r2_4N[NQ3r2_4N + 1] = {
6.126167301024815034423262653066023684411E-10Q,
1.043969327113173261820028225053598975128E-7Q,
6.592927270288697027757438170153763220190E-6Q,
2.009103660938497963095652951912071336730E-4Q,
3.220543385492643525985862356352195896964E-3Q,
2.774405975730545157543417650436941650990E-2Q,
1.258114008023826384487378016636555041129E-1Q,
2.811724258266902502344701449984698323860E-1Q,
2.691837665193548059322831687432415014067E-1Q,
7.949087384900985370683770525312735605034E-2Q,
1.229509543620976530030153018986910810747E-3Q,
};
#define NQ3r2_4D 9
static const __float128 Q3r2_4D[NQ3r2_4D + 1] = {
8.364260446128475461539941389210166156568E-9Q,
1.451301850638956578622154585560759862764E-6Q,
9.431830010924603664244578867057141839463E-5Q,
3.004105101667433434196388593004526182741E-3Q,
5.148157397848271739710011717102773780221E-2Q,
4.901089301726939576055285374953887874895E-1Q,
2.581760991981709901216967665934142240346E0Q,
7.257105880775059281391729708630912791847E0Q,
1.006014717326362868007913423810737369312E1Q,
5.879416600465399514404064187445293212470E0Q,
/* 1.000000000000000000000000000000000000000E0*/
};
/* Y0(x)cosX - J0(x)sinX = sqrt( 2/(pi x)) Q0(x),
Q0(x) = 1/x (-.125 + 1/x^2 R(1/x^2))
Peak relative error 3.8e-36
0.3125 <= 1/x <= 0.375 */
#define NQ2r7_3r2N 9
static const __float128 Q2r7_3r2N[NQ2r7_3r2N + 1] = {
7.584861620402450302063691901886141875454E-8Q,
9.300939338814216296064659459966041794591E-6Q,
4.112108906197521696032158235392604947895E-4Q,
8.515168851578898791897038357239630654431E-3Q,
8.971286321017307400142720556749573229058E-2Q,
4.885856732902956303343015636331874194498E-1Q,
1.334506268733103291656253500506406045846E0Q,
1.681207956863028164179042145803851824654E0Q,
8.165042692571721959157677701625853772271E-1Q,
9.805848115375053300608712721986235900715E-2Q,
};
#define NQ2r7_3r2D 9
static const __float128 Q2r7_3r2D[NQ2r7_3r2D + 1] = {
1.035586492113036586458163971239438078160E-6Q,
1.301999337731768381683593636500979713689E-4Q,
5.993695702564527062553071126719088859654E-3Q,
1.321184892887881883489141186815457808785E-1Q,
1.528766555485015021144963194165165083312E0Q,
9.561463309176490874525827051566494939295E0Q,
3.203719484883967351729513662089163356911E1Q,
5.497294687660930446641539152123568668447E1Q,
4.391158169390578768508675452986948391118E1Q,
1.347836630730048077907818943625789418378E1Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* Y0(x)cosX - J0(x)sinX = sqrt( 2/(pi x)) Q0(x),
Q0(x) = 1/x (-.125 + 1/x^2 R(1/x^2))
Peak relative error 2.2e-35
0.375 <= 1/x <= 0.4375 */
#define NQ2r3_2r7N 9
static const __float128 Q2r3_2r7N[NQ2r3_2r7N + 1] = {
4.455027774980750211349941766420190722088E-7Q,
4.031998274578520170631601850866780366466E-5Q,
1.273987274325947007856695677491340636339E-3Q,
1.818754543377448509897226554179659122873E-2Q,
1.266748858326568264126353051352269875352E-1Q,
4.327578594728723821137731555139472880414E-1Q,
6.892532471436503074928194969154192615359E-1Q,
4.490775818438716873422163588640262036506E-1Q,
8.649615949297322440032000346117031581572E-2Q,
7.261345286655345047417257611469066147561E-4Q,
};
#define NQ2r3_2r7D 8
static const __float128 Q2r3_2r7D[NQ2r3_2r7D + 1] = {
6.082600739680555266312417978064954793142E-6Q,
5.693622538165494742945717226571441747567E-4Q,
1.901625907009092204458328768129666975975E-2Q,
2.958689532697857335456896889409923371570E-1Q,
2.343124711045660081603809437993368799568E0Q,
9.665894032187458293568704885528192804376E0Q,
2.035273104990617136065743426322454881353E1Q,
2.044102010478792896815088858740075165531E1Q,
8.445937177863155827844146643468706599304E0Q,
/* 1.000000000000000000000000000000000000000E0 */
};
/* Y0(x)cosX - J0(x)sinX = sqrt( 2/(pi x)) Q0(x),
Q0(x) = 1/x (-.125 + 1/x^2 R(1/x^2))
Peak relative error 3.1e-36
0.4375 <= 1/x <= 0.5 */
#define NQ2_2r3N 9
static const __float128 Q2_2r3N[NQ2_2r3N + 1] = {
2.817566786579768804844367382809101929314E-6Q,
2.122772176396691634147024348373539744935E-4Q,
5.501378031780457828919593905395747517585E-3Q,
6.355374424341762686099147452020466524659E-2Q,
3.539652320122661637429658698954748337223E-1Q,
9.571721066119617436343740541777014319695E-1Q,
1.196258777828426399432550698612171955305E0Q,
6.069388659458926158392384709893753793967E-1Q,
9.026746127269713176512359976978248763621E-2Q,
5.317668723070450235320878117210807236375E-4Q,
};
#define NQ2_2r3D 8
static const __float128 Q2_2r3D[NQ2_2r3D + 1] = {
3.846924354014260866793741072933159380158E-5Q,
3.017562820057704325510067178327449946763E-3Q,
8.356305620686867949798885808540444210935E-2Q,
1.068314930499906838814019619594424586273E0Q,
6.900279623894821067017966573640732685233E0Q,
2.307667390886377924509090271780839563141E1Q,
3.921043465412723970791036825401273528513E1Q,
3.167569478939719383241775717095729233436E1Q,
1.051023841699200920276198346301543665909E1Q,
/* 1.000000000000000000000000000000000000000E0*/
};
/* Evaluate P[n] x^n + P[n-1] x^(n-1) + ... + P[0] */
static __float128
neval (__float128 x, const __float128 *p, int n)
{
__float128 y;
p += n;
y = *p--;
do
{
y = y * x + *p--;
}
while (--n > 0);
return y;
}
/* Evaluate x^n+1 + P[n] x^(n) + P[n-1] x^(n-1) + ... + P[0] */
static __float128
deval (__float128 x, const __float128 *p, int n)
{
__float128 y;
p += n;
y = x + *p--;
do
{
y = y * x + *p--;
}
while (--n > 0);
return y;
}
/* Bessel function of the first kind, order zero. */
__float128
j0q (__float128 x)
{
__float128 xx, xinv, z, p, q, c, s, cc, ss;
if (! finiteq (x))
{
if (x != x)
return x;
else
return 0.0Q;
}
if (x == 0.0Q)
return 1.0Q;
xx = fabsq (x);
if (xx <= 2.0Q)
{
/* 0 <= x <= 2 */
z = xx * xx;
p = z * z * neval (z, J0_2N, NJ0_2N) / deval (z, J0_2D, NJ0_2D);
p -= 0.25Q * z;
p += 1.0Q;
return p;
}
xinv = 1.0Q / xx;
z = xinv * xinv;
if (xinv <= 0.25)
{
if (xinv <= 0.125)
{
if (xinv <= 0.0625)
{
p = neval (z, P16_IN, NP16_IN) / deval (z, P16_ID, NP16_ID);
q = neval (z, Q16_IN, NQ16_IN) / deval (z, Q16_ID, NQ16_ID);
}
else
{
p = neval (z, P8_16N, NP8_16N) / deval (z, P8_16D, NP8_16D);
q = neval (z, Q8_16N, NQ8_16N) / deval (z, Q8_16D, NQ8_16D);
}
}
else if (xinv <= 0.1875)
{
p = neval (z, P5_8N, NP5_8N) / deval (z, P5_8D, NP5_8D);
q = neval (z, Q5_8N, NQ5_8N) / deval (z, Q5_8D, NQ5_8D);
}
else
{
p = neval (z, P4_5N, NP4_5N) / deval (z, P4_5D, NP4_5D);
q = neval (z, Q4_5N, NQ4_5N) / deval (z, Q4_5D, NQ4_5D);
}
} /* .25 */
else /* if (xinv <= 0.5) */
{
if (xinv <= 0.375)
{
if (xinv <= 0.3125)
{
p = neval (z, P3r2_4N, NP3r2_4N) / deval (z, P3r2_4D, NP3r2_4D);
q = neval (z, Q3r2_4N, NQ3r2_4N) / deval (z, Q3r2_4D, NQ3r2_4D);
}
else
{
p = neval (z, P2r7_3r2N, NP2r7_3r2N)
/ deval (z, P2r7_3r2D, NP2r7_3r2D);
q = neval (z, Q2r7_3r2N, NQ2r7_3r2N)
/ deval (z, Q2r7_3r2D, NQ2r7_3r2D);
}
}
else if (xinv <= 0.4375)
{
p = neval (z, P2r3_2r7N, NP2r3_2r7N)
/ deval (z, P2r3_2r7D, NP2r3_2r7D);
q = neval (z, Q2r3_2r7N, NQ2r3_2r7N)
/ deval (z, Q2r3_2r7D, NQ2r3_2r7D);
}
else
{
p = neval (z, P2_2r3N, NP2_2r3N) / deval (z, P2_2r3D, NP2_2r3D);
q = neval (z, Q2_2r3N, NQ2_2r3N) / deval (z, Q2_2r3D, NQ2_2r3D);
}
}
p = 1.0Q + z * p;
q = z * xinv * q;
q = q - 0.125Q * xinv;
/* X = x - pi/4
cos(X) = cos(x) cos(pi/4) + sin(x) sin(pi/4)
= 1/sqrt(2) * (cos(x) + sin(x))
sin(X) = sin(x) cos(pi/4) - cos(x) sin(pi/4)
= 1/sqrt(2) * (sin(x) - cos(x))
sin(x) +- cos(x) = -cos(2x)/(sin(x) -+ cos(x))
cf. Fdlibm. */
sincosq (xx, &s, &c);
ss = s - c;
cc = s + c;
z = - cosq (xx + xx);
if ((s * c) < 0)
cc = z / ss;
else
ss = z / cc;
z = ONEOSQPI * (p * cc - q * ss) / sqrtq (xx);
return z;
}
/* Y0(x) = 2/pi * log(x) * J0(x) + R(x^2)
Peak absolute error 1.7e-36 (relative where Y0 > 1)
0 <= x <= 2 */
#define NY0_2N 7
static __float128 Y0_2N[NY0_2N + 1] = {
-1.062023609591350692692296993537002558155E19Q,
2.542000883190248639104127452714966858866E19Q,
-1.984190771278515324281415820316054696545E18Q,
4.982586044371592942465373274440222033891E16Q,
-5.529326354780295177243773419090123407550E14Q,
3.013431465522152289279088265336861140391E12Q,
-7.959436160727126750732203098982718347785E9Q,
8.230845651379566339707130644134372793322E6Q,
};
#define NY0_2D 7
static __float128 Y0_2D[NY0_2D + 1] = {
1.438972634353286978700329883122253752192E20Q,
1.856409101981569254247700169486907405500E18Q,
1.219693352678218589553725579802986255614E16Q,
5.389428943282838648918475915779958097958E13Q,
1.774125762108874864433872173544743051653E11Q,
4.522104832545149534808218252434693007036E8Q,
8.872187401232943927082914504125234454930E5Q,
1.251945613186787532055610876304669413955E3Q,
/* 1.000000000000000000000000000000000000000E0 */
};
static const long double U0 = -7.3804295108687225274343927948483016310862e-02Q;
/* Bessel function of the second kind, order zero. */
__float128
y0q (__float128 x)
{
__float128 xx, xinv, z, p, q, c, s, cc, ss;
if (! finiteq (x))
{
if (x != x)
return x;
else
return 0.0Q;
}
if (x <= 0.0Q)
{
if (x < 0.0Q)
return (zero / (zero * x));
return -HUGE_VALQ + x;
}
xx = fabsq (x);
if (xx <= 0x1p-57)
return U0 + TWOOPI * logq (x);
if (xx <= 2.0Q)
{
/* 0 <= x <= 2 */
z = xx * xx;
p = neval (z, Y0_2N, NY0_2N) / deval (z, Y0_2D, NY0_2D);
p = TWOOPI * logq (x) * j0q (x) + p;
return p;
}
xinv = 1.0Q / xx;
z = xinv * xinv;
if (xinv <= 0.25)
{
if (xinv <= 0.125)
{
if (xinv <= 0.0625)
{
p = neval (z, P16_IN, NP16_IN) / deval (z, P16_ID, NP16_ID);
q = neval (z, Q16_IN, NQ16_IN) / deval (z, Q16_ID, NQ16_ID);
}
else
{
p = neval (z, P8_16N, NP8_16N) / deval (z, P8_16D, NP8_16D);
q = neval (z, Q8_16N, NQ8_16N) / deval (z, Q8_16D, NQ8_16D);
}
}
else if (xinv <= 0.1875)
{
p = neval (z, P5_8N, NP5_8N) / deval (z, P5_8D, NP5_8D);
q = neval (z, Q5_8N, NQ5_8N) / deval (z, Q5_8D, NQ5_8D);
}
else
{
p = neval (z, P4_5N, NP4_5N) / deval (z, P4_5D, NP4_5D);
q = neval (z, Q4_5N, NQ4_5N) / deval (z, Q4_5D, NQ4_5D);
}
} /* .25 */
else /* if (xinv <= 0.5) */
{
if (xinv <= 0.375)
{
if (xinv <= 0.3125)
{
p = neval (z, P3r2_4N, NP3r2_4N) / deval (z, P3r2_4D, NP3r2_4D);
q = neval (z, Q3r2_4N, NQ3r2_4N) / deval (z, Q3r2_4D, NQ3r2_4D);
}
else
{
p = neval (z, P2r7_3r2N, NP2r7_3r2N)
/ deval (z, P2r7_3r2D, NP2r7_3r2D);
q = neval (z, Q2r7_3r2N, NQ2r7_3r2N)
/ deval (z, Q2r7_3r2D, NQ2r7_3r2D);
}
}
else if (xinv <= 0.4375)
{
p = neval (z, P2r3_2r7N, NP2r3_2r7N)
/ deval (z, P2r3_2r7D, NP2r3_2r7D);
q = neval (z, Q2r3_2r7N, NQ2r3_2r7N)
/ deval (z, Q2r3_2r7D, NQ2r3_2r7D);
}
else
{
p = neval (z, P2_2r3N, NP2_2r3N) / deval (z, P2_2r3D, NP2_2r3D);
q = neval (z, Q2_2r3N, NQ2_2r3N) / deval (z, Q2_2r3D, NQ2_2r3D);
}
}
p = 1.0Q + z * p;
q = z * xinv * q;
q = q - 0.125Q * xinv;
/* X = x - pi/4
cos(X) = cos(x) cos(pi/4) + sin(x) sin(pi/4)
= 1/sqrt(2) * (cos(x) + sin(x))
sin(X) = sin(x) cos(pi/4) - cos(x) sin(pi/4)
= 1/sqrt(2) * (sin(x) - cos(x))
sin(x) +- cos(x) = -cos(2x)/(sin(x) -+ cos(x))
cf. Fdlibm. */
sincosq (x, &s, &c);
ss = s - c;
cc = s + c;
z = - cosq (x + x);
if ((s * c) < 0)
cc = z / ss;
else
ss = z / cc;
z = ONEOSQPI * (p * ss + q * cc) / sqrtq (x);
return z;
}