e_j1l.c source code [glibc_src_2.27/sysdeps/ieee754/ldbl-128/e_j1l.c]

1	/ j1l.c*
2	*
3	* Bessel function of order one
4	*
5	*
6	*
7	* SYNOPSIS:
8	*
9	* long double x, y, j1l();
10	*
11	* y = j1l( x );
12	*
13	*
14	*
15	* DESCRIPTION:
16	*
17	* Returns Bessel function of first kind, order one of the argument.
18	*
19	* The domain is divided into two major intervals [0, 2] and
20	* (2, infinity). In the first interval the rational approximation is
21	* J1(x) = .5x + x x^2 R(x^2)
22	*
23	* The second interval is further partitioned into eight equal segments
24	* of 1/x.
25	* J1(x) = sqrt(2/(pi x)) (P1(x) cos(X) - Q1(x) sin(X)),
26	* X = x - 3 pi / 4,
27	*
28	* and the auxiliary functions are given by
29	*
30	* J1(x)cos(X) + Y1(x)sin(X) = sqrt( 2/(pi x)) P1(x),
31	* P1(x) = 1 + 1/x^2 R(1/x^2)
32	*
33	* Y1(x)cos(X) - J1(x)sin(X) = sqrt( 2/(pi x)) Q1(x),
34	* Q1(x) = 1/x (.375 + 1/x^2 R(1/x^2)).
35	*
36	*
37	*
38	* ACCURACY:
39	*
40	* Absolute error:
41	* arithmetic domain # trials peak rms
42	* IEEE 0, 30 100000 2.8e-34 2.7e-35
43	*
44	*
45	*/
46
47	/ y1l.c*
48	*
49	* Bessel function of the second kind, order one
50	*
51	*
52	*
53	* SYNOPSIS:
54	*
55	* double x, y, y1l();
56	*
57	* y = y1l( x );
58	*
59	*
60	*
61	* DESCRIPTION:
62	*
63	* Returns Bessel function of the second kind, of order
64	* one, of the argument.
65	*
66	* The domain is divided into two major intervals [0, 2] and
67	* (2, infinity). In the first interval the rational approximation is
68	* Y1(x) = 2/pi * (log(x) * J1(x) - 1/x) + x R(x^2) .
69	* In the second interval the approximation is the same as for J1(x), and
70	* Y1(x) = sqrt(2/(pi x)) (P1(x) sin(X) + Q1(x) cos(X)),
71	* X = x - 3 pi / 4.
72	*
73	* ACCURACY:
74	*
75	* Absolute error, when y0(x) < 1; else relative error:
76	*
77	* arithmetic domain # trials peak rms
78	* IEEE 0, 30 100000 2.7e-34 2.9e-35
79	*
80	*/
81
82	/ Copyright 2001 by Stephen L. Moshier (moshier@na-net.onrl.gov).*
83
84	This library is free software; you can redistribute it and/or
85	modify it under the terms of the GNU Lesser General Public
86	License as published by the Free Software Foundation; either
87	version 2.1 of the License, or (at your option) any later version.
88
89	This library is distributed in the hope that it will be useful,
90	but WITHOUT ANY WARRANTY; without even the implied warranty of
91	MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
92	Lesser General Public License for more details.
93
94	You should have received a copy of the GNU Lesser General Public
95	License along with this library; if not, see
96	<http://www.gnu.org/licenses/>. /*
97
98	#include <errno.h>
99	#include <math.h>
100	#include <math_private.h>
101	#include <float.h>
102
103	/ 1 / sqrt(pi) /
104	static const _Float128 ONEOSQPI = L(`5.6418958354775628694807945156077258584405E-1`);
105	/ 2 / pi /
106	static const _Float128 TWOOPI = L(`6.3661977236758134307553505349005744813784E-1`);
107	static const _Float128 zero = `0`;
108
109	/ J1(x) = .5x + x x^2 R(x^2)*
110	Peak relative error 1.9e-35
111	0 <= x <= 2 /*
112	#define NJ0_2N 6
113	static const _Float128 J0_2N[NJ0_2N + `1`] = {
114	L(-`5.943799577386942855938508697619735179660E16`),
115	L(`1.812087021305009192259946997014044074711E15`),
116	L(-`2.761698314264509665075127515729146460895E13`),
117	L(`2.091089497823600978949389109350658815972E11`),
118	L(-`8.546413231387036372945453565654130054307E8`),
119	L(`1.797229225249742247475464052741320612261E6`),
120	L(-`1.559552840946694171346552770008812083969E3`)
121	};
122	#define NJ0_2D 6
123	static const _Float128 J0_2D[NJ0_2D + `1`] = {
124	L(`9.510079323819108569501613916191477479397E17`),
125	L(`1.063193817503280529676423936545854693915E16`),
126	L(`5.934143516050192600795972192791775226920E13`),
127	L(`2.168000911950620999091479265214368352883E11`),
128	L(`5.673775894803172808323058205986256928794E8`),
129	L(`1.080329960080981204840966206372671147224E6`),
130	L(`1.411951256636576283942477881535283304912E3`),
131	/ 1.000000000000000000000000000000000000000E0L /
132	};
133
134	/ J1(x)cosX + Y1(x)sinX = sqrt( 2/(pi x)) P1(x), P1(x) = 1 + 1/x^2 R(1/x^2),*
135	0 <= 1/x <= .0625
136	Peak relative error 3.6e-36 /*
137	#define NP16_IN 9
138	static const _Float128 P16_IN[NP16_IN + `1`] = {
139	L(`5.143674369359646114999545149085139822905E-16`),
140	L(`4.836645664124562546056389268546233577376E-13`),
141	L(`1.730945562285804805325011561498453013673E-10`),
142	L(`3.047976856147077889834905908605310585810E-8`),
143	L(`2.855227609107969710407464739188141162386E-6`),
144	L(`1.439362407936705484122143713643023998457E-4`),
145	L(`3.774489768532936551500999699815873422073E-3`),
146	L(`4.723962172984642566142399678920790598426E-2`),
147	L(`2.359289678988743939925017240478818248735E-1`),
148	L(`3.032580002220628812728954785118117124520E-1`),
149	};
150	#define NP16_ID 9
151	static const _Float128 P16_ID[NP16_ID + `1`] = {
152	L(`4.389268795186898018132945193912677177553E-15`),
153	L(`4.132671824807454334388868363256830961655E-12`),
154	L(`1.482133328179508835835963635130894413136E-9`),
155	L(`2.618941412861122118906353737117067376236E-7`),
156	L(`2.467854246740858470815714426201888034270E-5`),
157	L(`1.257192927368839847825938545925340230490E-3`),
158	L(`3.362739031941574274949719324644120720341E-2`),
159	L(`4.384458231338934105875343439265370178858E-1`),
160	L(`2.412830809841095249170909628197264854651E0`),
161	L(`4.176078204111348059102962617368214856874E0`),
162	/ 1.000000000000000000000000000000000000000E0 /
163	};
164
165	/ J1(x)cosX + Y1(x)sinX = sqrt( 2/(pi x)) P1(x), P1(x) = 1 + 1/x^2 R(1/x^2),*
166	0.0625 <= 1/x <= 0.125
167	Peak relative error 1.9e-36 /*
168	#define NP8_16N 11
169	static const _Float128 P8_16N[NP8_16N + `1`] = {
170	L(`2.984612480763362345647303274082071598135E-16`),
171	L(`1.923651877544126103941232173085475682334E-13`),
172	L(`4.881258879388869396043760693256024307743E-11`),
173	L(`6.368866572475045408480898921866869811889E-9`),
174	L(`4.684818344104910450523906967821090796737E-7`),
175	L(`2.005177298271593587095982211091300382796E-5`),
176	L(`4.979808067163957634120681477207147536182E-4`),
177	L(`6.946005761642579085284689047091173581127E-3`),
178	L(`5.074601112955765012750207555985299026204E-2`),
179	L(`1.698599455896180893191766195194231825379E-1`),
180	L(`1.957536905259237627737222775573623779638E-1`),
181	L(`2.991314703282528370270179989044994319374E-2`),
182	};
183	#define NP8_16D 10
184	static const _Float128 P8_16D[NP8_16D + `1`] = {
185	L(`2.546869316918069202079580939942463010937E-15`),
186	L(`1.644650111942455804019788382157745229955E-12`),
187	L(`4.185430770291694079925607420808011147173E-10`),
188	L(`5.485331966975218025368698195861074143153E-8`),
189	L(`4.062884421686912042335466327098932678905E-6`),
190	L(`1.758139661060905948870523641319556816772E-4`),
191	L(`4.445143889306356207566032244985607493096E-3`),
192	L(`6.391901016293512632765621532571159071158E-2`),
193	L(`4.933040207519900471177016015718145795434E-1`),
194	L(`1.839144086168947712971630337250761842976E0`),
195	L(`2.715120873995490920415616716916149586579E0`),
196	/ 1.000000000000000000000000000000000000000E0 /
197	};
198
199	/ J1(x)cosX + Y1(x)sinX = sqrt( 2/(pi x)) P1(x), P1(x) = 1 + 1/x^2 R(1/x^2),*
200	0.125 <= 1/x <= 0.1875
201	Peak relative error 1.3e-36 /*
202	#define NP5_8N 10
203	static const _Float128 P5_8N[NP5_8N + `1`] = {
204	L(`2.837678373978003452653763806968237227234E-12`),
205	L(`9.726641165590364928442128579282742354806E-10`),
206	L(`1.284408003604131382028112171490633956539E-7`),
207	L(`8.524624695868291291250573339272194285008E-6`),
208	L(`3.111516908953172249853673787748841282846E-4`),
209	L(`6.423175156126364104172801983096596409176E-3`),
210	L(`7.430220589989104581004416356260692450652E-2`),
211	L(`4.608315409833682489016656279567605536619E-1`),
212	L(`1.396870223510964882676225042258855977512E0`),
213	L(`1.718500293904122365894630460672081526236E0`),
214	L(`5.465927698800862172307352821870223855365E-1`)
215	};
216	#define NP5_8D 10
217	static const _Float128 P5_8D[NP5_8D + `1`] = {
218	L(`2.421485545794616609951168511612060482715E-11`),
219	L(`8.329862750896452929030058039752327232310E-9`),
220	L(`1.106137992233383429630592081375289010720E-6`),
221	L(`7.405786153760681090127497796448503306939E-5`),
222	L(`2.740364785433195322492093333127633465227E-3`),
223	L(`5.781246470403095224872243564165254652198E-2`),
224	L(`6.927711353039742469918754111511109983546E-1`),
225	L(`4.558679283460430281188304515922826156690E0`),
226	L(`1.534468499844879487013168065728837900009E1`),
227	L(`2.313927430889218597919624843161569422745E1`),
228	L(`1.194506341319498844336768473218382828637E1`),
229	/ 1.000000000000000000000000000000000000000E0 /
230	};
231
232	/ J1(x)cosX + Y1(x)sinX = sqrt( 2/(pi x)) P1(x), P1(x) = 1 + 1/x^2 R(1/x^2),*
233	Peak relative error 1.4e-36
234	0.1875 <= 1/x <= 0.25 /*
235	#define NP4_5N 10
236	static const _Float128 P4_5N[NP4_5N + `1`] = {
237	L(`1.846029078268368685834261260420933914621E-10`),
238	L(`3.916295939611376119377869680335444207768E-8`),
239	L(`3.122158792018920627984597530935323997312E-6`),
240	L(`1.218073444893078303994045653603392272450E-4`),
241	L(`2.536420827983485448140477159977981844883E-3`),
242	L(`2.883011322006690823959367922241169171315E-2`),
243	L(`1.755255190734902907438042414495469810830E-1`),
244	L(`5.379317079922628599870898285488723736599E-1`),
245	L(`7.284904050194300773890303361501726561938E-1`),
246	L(`3.270110346613085348094396323925000362813E-1`),
247	L(`1.804473805689725610052078464951722064757E-2`),
248	};
249	#define NP4_5D 9
250	static const _Float128 P4_5D[NP4_5D + `1`] = {
251	L(`1.575278146806816970152174364308980863569E-9`),
252	L(`3.361289173657099516191331123405675054321E-7`),
253	L(`2.704692281550877810424745289838790693708E-5`),
254	L(`1.070854930483999749316546199273521063543E-3`),
255	L(`2.282373093495295842598097265627962125411E-2`),
256	L(`2.692025460665354148328762368240343249830E-1`),
257	L(`1.739892942593664447220951225734811133759E0`),
258	L(`5.890727576752230385342377570386657229324E0`),
259	L(`9.517442287057841500750256954117735128153E0`),
260	L(`6.100616353935338240775363403030137736013E0`),
261	/ 1.000000000000000000000000000000000000000E0 /
262	};
263
264	/ J1(x)cosX + Y1(x)sinX = sqrt( 2/(pi x)) P1(x), P1(x) = 1 + 1/x^2 R(1/x^2),*
265	Peak relative error 3.0e-36
266	0.25 <= 1/x <= 0.3125 /*
267	#define NP3r2_4N 9
268	static const _Float128 P3r2_4N[NP3r2_4N + `1`] = {
269	L(`8.240803130988044478595580300846665863782E-8`),
270	L(`1.179418958381961224222969866406483744580E-5`),
271	L(`6.179787320956386624336959112503824397755E-4`),
272	L(`1.540270833608687596420595830747166658383E-2`),
273	L(`1.983904219491512618376375619598837355076E-1`),
274	L(`1.341465722692038870390470651608301155565E0`),
275	L(`4.617865326696612898792238245990854646057E0`),
276	L(`7.435574801812346424460233180412308000587E0`),
277	L(`4.671327027414635292514599201278557680420E0`),
278	L(`7.299530852495776936690976966995187714739E-1`),
279	};
280	#define NP3r2_4D 9
281	static const _Float128 P3r2_4D[NP3r2_4D + `1`] = {
282	L(`7.032152009675729604487575753279187576521E-7`),
283	L(`1.015090352324577615777511269928856742848E-4`),
284	L(`5.394262184808448484302067955186308730620E-3`),
285	L(`1.375291438480256110455809354836988584325E-1`),
286	L(`1.836247144461106304788160919310404376670E0`),
287	L(`1.314378564254376655001094503090935880349E1`),
288	L(`4.957184590465712006934452500894672343488E1`),
289	L(`9.287394244300647738855415178790263465398E1`),
290	L(`7.652563275535900609085229286020552768399E1`),
291	L(`2.147042473003074533150718117770093209096E1`),
292	/ 1.000000000000000000000000000000000000000E0 /
293	};
294
295	/ J1(x)cosX + Y1(x)sinX = sqrt( 2/(pi x)) P1(x), P1(x) = 1 + 1/x^2 R(1/x^2),*
296	Peak relative error 1.0e-35
297	0.3125 <= 1/x <= 0.375 /*
298	#define NP2r7_3r2N 9
299	static const _Float128 P2r7_3r2N[NP2r7_3r2N + `1`] = {
300	L(`4.599033469240421554219816935160627085991E-7`),
301	L(`4.665724440345003914596647144630893997284E-5`),
302	L(`1.684348845667764271596142716944374892756E-3`),
303	L(`2.802446446884455707845985913454440176223E-2`),
304	L(`2.321937586453963310008279956042545173930E-1`),
305	L(`9.640277413988055668692438709376437553804E-1`),
306	L(`1.911021064710270904508663334033003246028E0`),
307	L(`1.600811610164341450262992138893970224971E0`),
308	L(`4.266299218652587901171386591543457861138E-1`),
309	L(`1.316470424456061252962568223251247207325E-2`),
310	};
311	#define NP2r7_3r2D 8
312	static const _Float128 P2r7_3r2D[NP2r7_3r2D + `1`] = {
313	L(`3.924508608545520758883457108453520099610E-6`),
314	L(`4.029707889408829273226495756222078039823E-4`),
315	L(`1.484629715787703260797886463307469600219E-2`),
316	L(`2.553136379967180865331706538897231588685E-1`),
317	L(`2.229457223891676394409880026887106228740E0`),
318	L(`1.005708903856384091956550845198392117318E1`),
319	L(`2.277082659664386953166629360352385889558E1`),
320	L(`2.384726835193630788249826630376533988245E1`),
321	L(`9.700989749041320895890113781610939632410E0`),
322	/ 1.000000000000000000000000000000000000000E0 /
323	};
324
325	/ J1(x)cosX + Y1(x)sinX = sqrt( 2/(pi x)) P1(x), P1(x) = 1 + 1/x^2 R(1/x^2),*
326	Peak relative error 1.7e-36
327	0.3125 <= 1/x <= 0.4375 /*
328	#define NP2r3_2r7N 9
329	static const _Float128 P2r3_2r7N[NP2r3_2r7N + `1`] = {
330	L(`3.916766777108274628543759603786857387402E-6`),
331	L(`3.212176636756546217390661984304645137013E-4`),
332	L(`9.255768488524816445220126081207248947118E-3`),
333	L(`1.214853146369078277453080641911700735354E-1`),
334	L(`7.855163309847214136198449861311404633665E-1`),
335	L(`2.520058073282978403655488662066019816540E0`),
336	L(`3.825136484837545257209234285382183711466E0`),
337	L(`2.432569427554248006229715163865569506873E0`),
338	L(`4.877934835018231178495030117729800489743E-1`),
339	L(`1.109902737860249670981355149101343427885E-2`),
340	};
341	#define NP2r3_2r7D 8
342	static const _Float128 P2r3_2r7D[NP2r3_2r7D + `1`] = {
343	L(`3.342307880794065640312646341190547184461E-5`),
344	L(`2.782182891138893201544978009012096558265E-3`),
345	L(`8.221304931614200702142049236141249929207E-2`),
346	L(`1.123728246291165812392918571987858010949E0`),
347	L(`7.740482453652715577233858317133423434590E0`),
348	L(`2.737624677567945952953322566311201919139E1`),
349	L(`4.837181477096062403118304137851260715475E1`),
350	L(`3.941098643468580791437772701093795299274E1`),
351	L(`1.245821247166544627558323920382547533630E1`),
352	/ 1.000000000000000000000000000000000000000E0 /
353	};
354
355	/ J1(x)cosX + Y1(x)sinX = sqrt( 2/(pi x)) P1(x), P1(x) = 1 + 1/x^2 R(1/x^2),*
356	Peak relative error 1.7e-35
357	0.4375 <= 1/x <= 0.5 /*
358	#define NP2_2r3N 8
359	static const _Float128 P2_2r3N[NP2_2r3N + `1`] = {
360	L(`3.397930802851248553545191160608731940751E-4`),
361	L(`2.104020902735482418784312825637833698217E-2`),
362	L(`4.442291771608095963935342749477836181939E-1`),
363	L(`4.131797328716583282869183304291833754967E0`),
364	L(`1.819920169779026500146134832455189917589E1`),
365	L(`3.781779616522937565300309684282401791291E1`),
366	L(`3.459605449728864218972931220783543410347E1`),
367	L(`1.173594248397603882049066603238568316561E1`),
368	L(`9.455702270242780642835086549285560316461E-1`),
369	};
370	#define NP2_2r3D 8
371	static const _Float128 P2_2r3D[NP2_2r3D + `1`] = {
372	L(`2.899568897241432883079888249845707400614E-3`),
373	L(`1.831107138190848460767699919531132426356E-1`),
374	L(`3.999350044057883839080258832758908825165E0`),
375	L(`3.929041535867957938340569419874195303712E1`),
376	L(`1.884245613422523323068802689915538908291E2`),
377	L(`4.461469948819229734353852978424629815929E2`),
378	L(`5.004998753999796821224085972610636347903E2`),
379	L(`2.386342520092608513170837883757163414100E2`),
380	L(`3.791322528149347975999851588922424189957E1`),
381	/ 1.000000000000000000000000000000000000000E0 /
382	};
383
384	/ Y1(x)cosX - J1(x)sinX = sqrt( 2/(pi x)) Q1(x),*
385	Q1(x) = 1/x (.375 + 1/x^2 R(1/x^2)),
386	Peak relative error 8.0e-36
387	0 <= 1/x <= .0625 /*
388	#define NQ16_IN 10
389	static const _Float128 Q16_IN[NQ16_IN + `1`] = {
390	L(-`3.917420835712508001321875734030357393421E-18`),
391	L(-`4.440311387483014485304387406538069930457E-15`),
392	L(-`1.951635424076926487780929645954007139616E-12`),
393	L(-`4.318256438421012555040546775651612810513E-10`),
394	L(-`5.231244131926180765270446557146989238020E-8`),
395	L(-`3.540072702902043752460711989234732357653E-6`),
396	L(-`1.311017536555269966928228052917534882984E-4`),
397	L(-`2.495184669674631806622008769674827575088E-3`),
398	L(-`2.141868222987209028118086708697998506716E-2`),
399	L(-`6.184031415202148901863605871197272650090E-2`),
400	L(-`1.922298704033332356899546792898156493887E-2`),
401	};
402	#define NQ16_ID 9
403	static const _Float128 Q16_ID[NQ16_ID + `1`] = {
404	L(`3.820418034066293517479619763498400162314E-17`),
405	L(`4.340702810799239909648911373329149354911E-14`),
406	L(`1.914985356383416140706179933075303538524E-11`),
407	L(`4.262333682610888819476498617261895474330E-9`),
408	L(`5.213481314722233980346462747902942182792E-7`),
409	L(`3.585741697694069399299005316809954590558E-5`),
410	L(`1.366513429642842006385029778105539457546E-3`),
411	L(`2.745282599850704662726337474371355160594E-2`),
412	L(`2.637644521611867647651200098449903330074E-1`),
413	L(`1.006953426110765984590782655598680488746E0`),
414	/ 1.000000000000000000000000000000000000000E0 /
415	};
416
417	/ Y1(x)cosX - J1(x)sinX = sqrt( 2/(pi x)) Q1(x),*
418	Q1(x) = 1/x (.375 + 1/x^2 R(1/x^2)),
419	Peak relative error 1.9e-36
420	0.0625 <= 1/x <= 0.125 /*
421	#define NQ8_16N 11
422	static const _Float128 Q8_16N[NQ8_16N + `1`] = {
423	L(-`2.028630366670228670781362543615221542291E-17`),
424	L(-`1.519634620380959966438130374006858864624E-14`),
425	L(-`4.540596528116104986388796594639405114524E-12`),
426	L(-`7.085151756671466559280490913558388648274E-10`),
427	L(-`6.351062671323970823761883833531546885452E-8`),
428	L(-`3.390817171111032905297982523519503522491E-6`),
429	L(-`1.082340897018886970282138836861233213972E-4`),
430	L(-`2.020120801187226444822977006648252379508E-3`),
431	L(-`2.093169910981725694937457070649605557555E-2`),
432	L(-`1.092176538874275712359269481414448063393E-1`),
433	L(-`2.374790947854765809203590474789108718733E-1`),
434	L(-`1.365364204556573800719985118029601401323E-1`),
435	};
436	#define NQ8_16D 11
437	static const _Float128 Q8_16D[NQ8_16D + `1`] = {
438	L(`1.978397614733632533581207058069628242280E-16`),
439	L(`1.487361156806202736877009608336766720560E-13`),
440	L(`4.468041406888412086042576067133365913456E-11`),
441	L(`7.027822074821007443672290507210594648877E-9`),
442	L(`6.375740580686101224127290062867976007374E-7`),
443	L(`3.466887658320002225888644977076410421940E-5`),
444	L(`1.138625640905289601186353909213719596986E-3`),
445	L(`2.224470799470414663443449818235008486439E-2`),
446	L(`2.487052928527244907490589787691478482358E-1`),
447	L(`1.483927406564349124649083853892380899217E0`),
448	L(`4.182773513276056975777258788903489507705E0`),
449	L(`4.419665392573449746043880892524360870944E0`),
450	/ 1.000000000000000000000000000000000000000E0 /
451	};
452
453	/ Y1(x)cosX - J1(x)sinX = sqrt( 2/(pi x)) Q1(x),*
454	Q1(x) = 1/x (.375 + 1/x^2 R(1/x^2)),
455	Peak relative error 1.5e-35
456	0.125 <= 1/x <= 0.1875 /*
457	#define NQ5_8N 10
458	static const _Float128 Q5_8N[NQ5_8N + `1`] = {
459	L(-`3.656082407740970534915918390488336879763E-13`),
460	L(-`1.344660308497244804752334556734121771023E-10`),
461	L(-`1.909765035234071738548629788698150760791E-8`),
462	L(-`1.366668038160120210269389551283666716453E-6`),
463	L(-`5.392327355984269366895210704976314135683E-5`),
464	L(-`1.206268245713024564674432357634540343884E-3`),
465	L(-`1.515456784370354374066417703736088291287E-2`),
466	L(-`1.022454301137286306933217746545237098518E-1`),
467	L(-`3.373438906472495080504907858424251082240E-1`),
468	L(-`4.510782522110845697262323973549178453405E-1`),
469	L(-`1.549000892545288676809660828213589804884E-1`),
470	};
471	#define NQ5_8D 10
472	static const _Float128 Q5_8D[NQ5_8D + `1`] = {
473	L(`3.565550843359501079050699598913828460036E-12`),
474	L(`1.321016015556560621591847454285330528045E-9`),
475	L(`1.897542728662346479999969679234270605975E-7`),
476	L(`1.381720283068706710298734234287456219474E-5`),
477	L(`5.599248147286524662305325795203422873725E-4`),
478	L(`1.305442352653121436697064782499122164843E-2`),
479	L(`1.750234079626943298160445750078631894985E-1`),
480	L(`1.311420542073436520965439883806946678491E0`),
481	L(`5.162757689856842406744504211089724926650E0`),
482	L(`9.527760296384704425618556332087850581308E0`),
483	L(`6.604648207463236667912921642545100248584E0`),
484	/ 1.000000000000000000000000000000000000000E0 /
485	};
486
487	/ Y1(x)cosX - J1(x)sinX = sqrt( 2/(pi x)) Q1(x),*
488	Q1(x) = 1/x (.375 + 1/x^2 R(1/x^2)),
489	Peak relative error 1.3e-35
490	0.1875 <= 1/x <= 0.25 /*
491	#define NQ4_5N 10
492	static const _Float128 Q4_5N[NQ4_5N + `1`] = {
493	L(-`4.079513568708891749424783046520200903755E-11`),
494	L(-`9.326548104106791766891812583019664893311E-9`),
495	L(-`8.016795121318423066292906123815687003356E-7`),
496	L(-`3.372350544043594415609295225664186750995E-5`),
497	L(-`7.566238665947967882207277686375417983917E-4`),
498	L(-`9.248861580055565402130441618521591282617E-3`),
499	L(-`6.033106131055851432267702948850231270338E-2`),
500	L(-`1.966908754799996793730369265431584303447E-1`),
501	L(-`2.791062741179964150755788226623462207560E-1`),
502	L(-`1.255478605849190549914610121863534191666E-1`),
503	L(-`4.320429862021265463213168186061696944062E-3`),
504	};
505	#define NQ4_5D 9
506	static const _Float128 Q4_5D[NQ4_5D + `1`] = {
507	L(`3.978497042580921479003851216297330701056E-10`),
508	L(`9.203304163828145809278568906420772246666E-8`),
509	L(`8.059685467088175644915010485174545743798E-6`),
510	L(`3.490187375993956409171098277561669167446E-4`),
511	L(`8.189109654456872150100501732073810028829E-3`),
512	L(`1.072572867311023640958725265762483033769E-1`),
513	L(`7.790606862409960053675717185714576937994E-1`),
514	L(`3.016049768232011196434185423512777656328E0`),
515	L(`5.722963851442769787733717162314477949360E0`),
516	L(`4.510527838428473279647251350931380867663E0`),
517	/ 1.000000000000000000000000000000000000000E0 /
518	};
519
520	/ Y1(x)cosX - J1(x)sinX = sqrt( 2/(pi x)) Q1(x),*
521	Q1(x) = 1/x (.375 + 1/x^2 R(1/x^2)),
522	Peak relative error 2.1e-35
523	0.25 <= 1/x <= 0.3125 /*
524	#define NQ3r2_4N 9
525	static const _Float128 Q3r2_4N[NQ3r2_4N + `1`] = {
526	L(-`1.087480809271383885936921889040388133627E-8`),
527	L(-`1.690067828697463740906962973479310170932E-6`),
528	L(-`9.608064416995105532790745641974762550982E-5`),
529	L(-`2.594198839156517191858208513873961837410E-3`),
530	L(-`3.610954144421543968160459863048062977822E-2`),
531	L(-`2.629866798251843212210482269563961685666E-1`),
532	L(-`9.709186825881775885917984975685752956660E-1`),
533	L(-`1.667521829918185121727268867619982417317E0`),
534	L(-`1.109255082925540057138766105229900943501E0`),
535	L(-`1.812932453006641348145049323713469043328E-1`),
536	};
537	#define NQ3r2_4D 9
538	static const _Float128 Q3r2_4D[NQ3r2_4D + `1`] = {
539	L(`1.060552717496912381388763753841473407026E-7`),
540	L(`1.676928002024920520786883649102388708024E-5`),
541	L(`9.803481712245420839301400601140812255737E-4`),
542	L(`2.765559874262309494758505158089249012930E-2`),
543	L(`4.117921827792571791298862613287549140706E-1`),
544	L(`3.323769515244751267093378361930279161413E0`),
545	L(`1.436602494405814164724810151689705353670E1`),
546	L(`3.163087869617098638064881410646782408297E1`),
547	L(`3.198181264977021649489103980298349589419E1`),
548	L(`1.203649258862068431199471076202897823272E1`),
549	/ 1.000000000000000000000000000000000000000E0 /
550	};
551
552	/ Y1(x)cosX - J1(x)sinX = sqrt( 2/(pi x)) Q1(x),*
553	Q1(x) = 1/x (.375 + 1/x^2 R(1/x^2)),
554	Peak relative error 1.6e-36
555	0.3125 <= 1/x <= 0.375 /*
556	#define NQ2r7_3r2N 9
557	static const _Float128 Q2r7_3r2N[NQ2r7_3r2N + `1`] = {
558	L(-`1.723405393982209853244278760171643219530E-7`),
559	L(-`2.090508758514655456365709712333460087442E-5`),
560	L(-`9.140104013370974823232873472192719263019E-4`),
561	L(-`1.871349499990714843332742160292474780128E-2`),
562	L(-`1.948930738119938669637865956162512983416E-1`),
563	L(-`1.048764684978978127908439526343174139788E0`),
564	L(-`2.827714929925679500237476105843643064698E0`),
565	L(-`3.508761569156476114276988181329773987314E0`),
566	L(-`1.669332202790211090973255098624488308989E0`),
567	L(-`1.930796319299022954013840684651016077770E-1`),
568	};
569	#define NQ2r7_3r2D 9
570	static const _Float128 Q2r7_3r2D[NQ2r7_3r2D + `1`] = {
571	L(`1.680730662300831976234547482334347983474E-6`),
572	L(`2.084241442440551016475972218719621841120E-4`),
573	L(`9.445316642108367479043541702688736295579E-3`),
574	L(`2.044637889456631896650179477133252184672E-1`),
575	L(`2.316091982244297350829522534435350078205E0`),
576	L(`1.412031891783015085196708811890448488865E1`),
577	L(`4.583830154673223384837091077279595496149E1`),
578	L(`7.549520609270909439885998474045974122261E1`),
579	L(`5.697605832808113367197494052388203310638E1`),
580	L(`1.601496240876192444526383314589371686234E1`),
581	/ 1.000000000000000000000000000000000000000E0 /
582	};
583
584	/ Y1(x)cosX - J1(x)sinX = sqrt( 2/(pi x)) Q1(x),*
585	Q1(x) = 1/x (.375 + 1/x^2 R(1/x^2)),
586	Peak relative error 9.5e-36
587	0.375 <= 1/x <= 0.4375 /*
588	#define NQ2r3_2r7N 9
589	static const _Float128 Q2r3_2r7N[NQ2r3_2r7N + `1`] = {
590	L(-`8.603042076329122085722385914954878953775E-7`),
591	L(-`7.701746260451647874214968882605186675720E-5`),
592	L(-`2.407932004380727587382493696877569654271E-3`),
593	L(-`3.403434217607634279028110636919987224188E-2`),
594	L(-`2.348707332185238159192422084985713102877E-1`),
595	L(-`7.957498841538254916147095255700637463207E-1`),
596	L(-`1.258469078442635106431098063707934348577E0`),
597	L(-`8.162415474676345812459353639449971369890E-1`),
598	L(-`1.581783890269379690141513949609572806898E-1`),
599	L(-`1.890595651683552228232308756569450822905E-3`),
600	};
601	#define NQ2r3_2r7D 8
602	static const _Float128 Q2r3_2r7D[NQ2r3_2r7D + `1`] = {
603	L(`8.390017524798316921170710533381568175665E-6`),
604	L(`7.738148683730826286477254659973968763659E-4`),
605	L(`2.541480810958665794368759558791634341779E-2`),
606	L(`3.878879789711276799058486068562386244873E-1`),
607	L(`3.003783779325811292142957336802456109333E0`),
608	L(`1.206480374773322029883039064575464497400E1`),
609	L(`2.458414064785315978408974662900438351782E1`),
610	L(`2.367237826273668567199042088835448715228E1`),
611	L(`9.231451197519171090875569102116321676763E0`),
612	/ 1.000000000000000000000000000000000000000E0 /
613	};
614
615	/ Y1(x)cosX - J1(x)sinX = sqrt( 2/(pi x)) Q1(x),*
616	Q1(x) = 1/x (.375 + 1/x^2 R(1/x^2)),
617	Peak relative error 1.4e-36
618	0.4375 <= 1/x <= 0.5 /*
619	#define NQ2_2r3N 9
620	static const _Float128 Q2_2r3N[NQ2_2r3N + `1`] = {
621	L(-`5.552507516089087822166822364590806076174E-6`),
622	L(-`4.135067659799500521040944087433752970297E-4`),
623	L(-`1.059928728869218962607068840646564457980E-2`),
624	L(-`1.212070036005832342565792241385459023801E-1`),
625	L(-`6.688350110633603958684302153362735625156E-1`),
626	L(-`1.793587878197360221340277951304429821582E0`),
627	L(-`2.225407682237197485644647380483725045326E0`),
628	L(-`1.123402135458940189438898496348239744403E0`),
629	L(-`1.679187241566347077204805190763597299805E-1`),
630	L(-`1.458550613639093752909985189067233504148E-3`),
631	};
632	#define NQ2_2r3D 8
633	static const _Float128 Q2_2r3D[NQ2_2r3D + `1`] = {
634	L(`5.415024336507980465169023996403597916115E-5`),
635	L(`4.179246497380453022046357404266022870788E-3`),
636	L(`1.136306384261959483095442402929502368598E-1`),
637	L(`1.422640343719842213484515445393284072830E0`),
638	L(`8.968786703393158374728850922289204805764E0`),
639	L(`2.914542473339246127533384118781216495934E1`),
640	L(`4.781605421020380669870197378210457054685E1`),
641	L(`3.693865837171883152382820584714795072937E1`),
642	L(`1.153220502744204904763115556224395893076E1`),
643	/ 1.000000000000000000000000000000000000000E0 /
644	};
645
646
647	/ Evaluate P[n] x^n + P[n-1] x^(n-1) + ... + P[0] /
648
649	static _Float128
650	neval (_Float128 x, const _Float128 p, int* n)
651	{
652	_Float128 y;
653
654	p += n;
655	y = *p--;
656	do
657	{
658	y = y * x + *p--;
659	}
660	while (--n > `0`);
661	return y;
662	}
663
664
665	/ Evaluate x^n+1 + P[n] x^(n) + P[n-1] x^(n-1) + ... + P[0] /
666
667	static _Float128
668	deval (_Float128 x, const _Float128 p, int* n)
669	{
670	_Float128 y;
671
672	p += n;
673	y = x + *p--;
674	do
675	{
676	y = y * x + *p--;
677	}
678	while (--n > `0`);
679	return y;
680	}
681
682
683	/ Bessel function of the first kind, order one. /
684
685	_Float128
686	__ieee754_j1l (_Float128 x)
687	{
688	_Float128 xx, xinv, z, p, q, c, s, cc, ss;
689
690	if (! isfinite (x))
691	{
692	if (x != x)
693	return x + x;
694	else
695	return `0`;
696	}
697	if (x == `0`)
698	return x;
699	xx = fabsl (x);
700	if (xx <= L(`0x1p-58`))
701	{
702	_Float128 ret = x * L(`0.5`);
703	math_check_force_underflow (ret);
704	if (ret == `0`)
705	__set_errno (ERANGE);
706	return ret;
707	}
708	if (xx <= `2`)
709	{
710	/ 0 <= x <= 2 /
711	z = xx * xx;
712	p = xx * z * neval (z, J0_2N, NJ0_2N) / deval (z, J0_2D, NJ0_2D);
713	p += L(`0.5`) * xx;
714	if (x < `0`)
715	p = -p;
716	return p;
717	}
718
719	/ X = x - 3 pi/4*
720	cos(X) = cos(x) cos(3 pi/4) + sin(x) sin(3 pi/4)
721	= 1/sqrt(2) (-cos(x) + sin(x))*
722	sin(X) = sin(x) cos(3 pi/4) - cos(x) sin(3 pi/4)
723	= -1/sqrt(2) (sin(x) + cos(x))*
724	cf. Fdlibm. /*
725	__sincosl (xx, &s, &c);
726	ss = -s - c;
727	cc = s - c;
728	if (xx <= LDBL_MAX / `2`)
729	{
730	z = __cosl (xx + xx);
731	if ((s * c) > `0`)
732	cc = z / ss;
733	else
734	ss = z / cc;
735	}
736
737	if (xx > L(`0x1p256`))
738	{
739	z = ONEOSQPI * cc / __ieee754_sqrtl (xx);
740	if (x < `0`)
741	z = -z;
742	return z;
743	}
744
745	xinv = `1` / xx;
746	z = xinv * xinv;
747	if (xinv <= `0.25`)
748	{
749	if (xinv <= `0.125`)
750	{
751	if (xinv <= `0.0625`)
752	{
753	p = neval (z, P16_IN, NP16_IN) / deval (z, P16_ID, NP16_ID);
754	q = neval (z, Q16_IN, NQ16_IN) / deval (z, Q16_ID, NQ16_ID);
755	}
756	else
757	{
758	p = neval (z, P8_16N, NP8_16N) / deval (z, P8_16D, NP8_16D);
759	q = neval (z, Q8_16N, NQ8_16N) / deval (z, Q8_16D, NQ8_16D);
760	}
761	}
762	else if (xinv <= `0.1875`)
763	{
764	p = neval (z, P5_8N, NP5_8N) / deval (z, P5_8D, NP5_8D);
765	q = neval (z, Q5_8N, NQ5_8N) / deval (z, Q5_8D, NQ5_8D);
766	}
767	else
768	{
769	p = neval (z, P4_5N, NP4_5N) / deval (z, P4_5D, NP4_5D);
770	q = neval (z, Q4_5N, NQ4_5N) / deval (z, Q4_5D, NQ4_5D);
771	}
772	} / .25 /
773	else / if (xinv <= 0.5) /
774	{
775	if (xinv <= `0.375`)
776	{
777	if (xinv <= `0.3125`)
778	{
779	p = neval (z, P3r2_4N, NP3r2_4N) / deval (z, P3r2_4D, NP3r2_4D);
780	q = neval (z, Q3r2_4N, NQ3r2_4N) / deval (z, Q3r2_4D, NQ3r2_4D);
781	}
782	else
783	{
784	p = neval (z, P2r7_3r2N, NP2r7_3r2N)
785	/ deval (z, P2r7_3r2D, NP2r7_3r2D);
786	q = neval (z, Q2r7_3r2N, NQ2r7_3r2N)
787	/ deval (z, Q2r7_3r2D, NQ2r7_3r2D);
788	}
789	}
790	else if (xinv <= `0.4375`)
791	{
792	p = neval (z, P2r3_2r7N, NP2r3_2r7N)
793	/ deval (z, P2r3_2r7D, NP2r3_2r7D);
794	q = neval (z, Q2r3_2r7N, NQ2r3_2r7N)
795	/ deval (z, Q2r3_2r7D, NQ2r3_2r7D);
796	}
797	else
798	{
799	p = neval (z, P2_2r3N, NP2_2r3N) / deval (z, P2_2r3D, NP2_2r3D);
800	q = neval (z, Q2_2r3N, NQ2_2r3N) / deval (z, Q2_2r3D, NQ2_2r3D);
801	}
802	}
803	p = `1` + z * p;
804	q = z * q;
805	q = q * xinv + L(`0.375`) * xinv;
806	z = ONEOSQPI * (p * cc - q * ss) / __ieee754_sqrtl (xx);
807	if (x < `0`)
808	z = -z;
809	return z;
810	}
811	strong_alias (__ieee754_j1l, __j1l_finite)
812
813
814	/ Y1(x) = 2/pi * (log(x) * J1(x) - 1/x) + x R(x^2)*
815	Peak relative error 6.2e-38
816	0 <= x <= 2 /*
817	#define NY0_2N 7
818	static const _Float128 Y0_2N[NY0_2N + `1`] = {
819	L(-`6.804415404830253804408698161694720833249E19`),
820	L(`1.805450517967019908027153056150465849237E19`),
821	L(-`8.065747497063694098810419456383006737312E17`),
822	L(`1.401336667383028259295830955439028236299E16`),
823	L(-`1.171654432898137585000399489686629680230E14`),
824	L(`5.061267920943853732895341125243428129150E11`),
825	L(-`1.096677850566094204586208610960870217970E9`),
826	L(`9.541172044989995856117187515882879304461E5`),
827	};
828	#define NY0_2D 7
829	static const _Float128 Y0_2D[NY0_2D + `1`] = {
830	L(`3.470629591820267059538637461549677594549E20`),
831	L(`4.120796439009916326855848107545425217219E18`),
832	L(`2.477653371652018249749350657387030814542E16`),
833	L(`9.954678543353888958177169349272167762797E13`),
834	L(`2.957927997613630118216218290262851197754E11`),
835	L(`6.748421382188864486018861197614025972118E8`),
836	L(`1.173453425218010888004562071020305709319E6`),
837	L(`1.450335662961034949894009554536003377187E3`),
838	/ 1.000000000000000000000000000000000000000E0 /
839	};
840
841
842	/ Bessel function of the second kind, order one. /
843
844	_Float128
845	__ieee754_y1l (_Float128 x)
846	{
847	_Float128 xx, xinv, z, p, q, c, s, cc, ss;
848
849	if (! isfinite (x))
850	return `1` / (x + x * x);
851	if (x <= `0`)
852	{
853	if (x < `0`)
854	return (zero / (zero * x));
855	return -`1` / zero; / -inf and divide by zero exception. /
856	}
857	xx = fabsl (x);
858	if (xx <= `0x1p-114`)
859	{
860	z = -TWOOPI / x;
861	if (isinf (z))
862	__set_errno (ERANGE);
863	return z;
864	}
865	if (xx <= `2`)
866	{
867	/ 0 <= x <= 2 /
868	SET_RESTORE_ROUNDL (FE_TONEAREST);
869	z = xx * xx;
870	p = xx * neval (z, Y0_2N, NY0_2N) / deval (z, Y0_2D, NY0_2D);
871	p = -TWOOPI / xx + p;
872	p = TWOOPI * __ieee754_logl (x) * __ieee754_j1l (x) + p;
873	return p;
874	}
875
876	/ X = x - 3 pi/4*
877	cos(X) = cos(x) cos(3 pi/4) + sin(x) sin(3 pi/4)
878	= 1/sqrt(2) (-cos(x) + sin(x))*
879	sin(X) = sin(x) cos(3 pi/4) - cos(x) sin(3 pi/4)
880	= -1/sqrt(2) (sin(x) + cos(x))*
881	cf. Fdlibm. /*
882	__sincosl (xx, &s, &c);
883	ss = -s - c;
884	cc = s - c;
885	if (xx <= LDBL_MAX / `2`)
886	{
887	z = __cosl (xx + xx);
888	if ((s * c) > `0`)
889	cc = z / ss;
890	else
891	ss = z / cc;
892	}
893
894	if (xx > L(`0x1p256`))
895	return ONEOSQPI * ss / __ieee754_sqrtl (xx);
896
897	xinv = `1` / xx;
898	z = xinv * xinv;
899	if (xinv <= `0.25`)
900	{
901	if (xinv <= `0.125`)
902	{
903	if (xinv <= `0.0625`)
904	{
905	p = neval (z, P16_IN, NP16_IN) / deval (z, P16_ID, NP16_ID);
906	q = neval (z, Q16_IN, NQ16_IN) / deval (z, Q16_ID, NQ16_ID);
907	}
908	else
909	{
910	p = neval (z, P8_16N, NP8_16N) / deval (z, P8_16D, NP8_16D);
911	q = neval (z, Q8_16N, NQ8_16N) / deval (z, Q8_16D, NQ8_16D);
912	}
913	}
914	else if (xinv <= `0.1875`)
915	{
916	p = neval (z, P5_8N, NP5_8N) / deval (z, P5_8D, NP5_8D);
917	q = neval (z, Q5_8N, NQ5_8N) / deval (z, Q5_8D, NQ5_8D);
918	}
919	else
920	{
921	p = neval (z, P4_5N, NP4_5N) / deval (z, P4_5D, NP4_5D);
922	q = neval (z, Q4_5N, NQ4_5N) / deval (z, Q4_5D, NQ4_5D);
923	}
924	} / .25 /
925	else / if (xinv <= 0.5) /
926	{
927	if (xinv <= `0.375`)
928	{
929	if (xinv <= `0.3125`)
930	{
931	p = neval (z, P3r2_4N, NP3r2_4N) / deval (z, P3r2_4D, NP3r2_4D);
932	q = neval (z, Q3r2_4N, NQ3r2_4N) / deval (z, Q3r2_4D, NQ3r2_4D);
933	}
934	else
935	{
936	p = neval (z, P2r7_3r2N, NP2r7_3r2N)
937	/ deval (z, P2r7_3r2D, NP2r7_3r2D);
938	q = neval (z, Q2r7_3r2N, NQ2r7_3r2N)
939	/ deval (z, Q2r7_3r2D, NQ2r7_3r2D);
940	}
941	}
942	else if (xinv <= `0.4375`)
943	{
944	p = neval (z, P2r3_2r7N, NP2r3_2r7N)
945	/ deval (z, P2r3_2r7D, NP2r3_2r7D);
946	q = neval (z, Q2r3_2r7N, NQ2r3_2r7N)
947	/ deval (z, Q2r3_2r7D, NQ2r3_2r7D);
948	}
949	else
950	{
951	p = neval (z, P2_2r3N, NP2_2r3N) / deval (z, P2_2r3D, NP2_2r3D);
952	q = neval (z, Q2_2r3N, NQ2_2r3N) / deval (z, Q2_2r3D, NQ2_2r3D);
953	}
954	}
955	p = `1` + z * p;
956	q = z * q;
957	q = q * xinv + L(`0.375`) * xinv;
958	z = ONEOSQPI * (p * ss + q * cc) / __ieee754_sqrtl (xx);
959	return z;
960	}
961	strong_alias (__ieee754_y1l, __y1l_finite)
962

Browse the source code of glibc_src_2.27/sysdeps/ieee754/ldbl-128/e_j1l.c