source: sasview/src/sas/models/c_extension/cephes/j0.c @ 1e81bc8

ESS_GUIESS_GUI_DocsESS_GUI_batch_fittingESS_GUI_bumps_abstractionESS_GUI_iss1116ESS_GUI_iss879ESS_GUI_iss959ESS_GUI_openclESS_GUI_orderingESS_GUI_sync_sascalccostrafo411magnetic_scattrelease-4.1.1release-4.1.2release-4.2.2release_4.0.1ticket-1009ticket-1094-headlessticket-1242-2d-resolutionticket-1243ticket-1249ticket885unittest-saveload
Last change on this file since 1e81bc8 was 79492222, checked in by krzywon, 10 years ago

Changed the file and folder names to remove all SANS references.

  • Property mode set to 100644
File size: 12.6 KB
Line 
1/*                                                      j0.c
2 *
3 *      Bessel function of order zero
4 *
5 *
6 *
7 * SYNOPSIS:
8 *
9 * double x, y, j0();
10 *
11 * y = j0( x );
12 *
13 *
14 *
15 * DESCRIPTION:
16 *
17 * Returns Bessel function of order zero of the argument.
18 *
19 * The domain is divided into the intervals [0, 5] and
20 * (5, infinity). In the first interval the following rational
21 * approximation is used:
22 *
23 *
24 *        2         2
25 * (w - r  ) (w - r  ) P (w) / Q (w)
26 *       1         2    3       8
27 *
28 *            2
29 * where w = x  and the two r's are zeros of the function.
30 *
31 * In the second interval, the Hankel asymptotic expansion
32 * is employed with two rational functions of degree 6/6
33 * and 7/7.
34 *
35 *
36 *
37 * ACCURACY:
38 *
39 *                      Absolute error:
40 * arithmetic   domain     # trials      peak         rms
41 *    DEC       0, 30       10000       4.4e-17     6.3e-18
42 *    IEEE      0, 30       60000       4.2e-16     1.1e-16
43 *
44 */
45/*                                                     y0.c
46 *
47 *      Bessel function of the second kind, order zero
48 *
49 *
50 *
51 * SYNOPSIS:
52 *
53 * double x, y, y0();
54 *
55 * y = y0( x );
56 *
57 *
58 *
59 * DESCRIPTION:
60 *
61 * Returns Bessel function of the second kind, of order
62 * zero, of the argument.
63 *
64 * The domain is divided into the intervals [0, 5] and
65 * (5, infinity). In the first interval a rational approximation
66 * R(x) is employed to compute
67 *   y0(x)  = R(x)  +   2 * log(x) * j0(x) / PI.
68 * Thus a call to j0() is required.
69 *
70 * In the second interval, the Hankel asymptotic expansion
71 * is employed with two rational functions of degree 6/6
72 * and 7/7.
73 *
74 *
75 *
76 * ACCURACY:
77 *
78 *  Absolute error, when y0(x) < 1; else relative error:
79 *
80 * arithmetic   domain     # trials      peak         rms
81 *    DEC       0, 30        9400       7.0e-17     7.9e-18
82 *    IEEE      0, 30       30000       1.3e-15     1.6e-16
83 *
84 */
85
86/*
87Cephes Math Library Release 2.8:  June, 2000
88Copyright 1984, 1987, 1989, 2000 by Stephen L. Moshier
89*/
90
91/* Note: all coefficients satisfy the relative error criterion
92 * except YP, YQ which are designed for absolute error. */
93
94#include "mconf.h"
95
96#ifdef UNK
97static double PP[7] = {
98  7.96936729297347051624E-4,
99  8.28352392107440799803E-2,
100  1.23953371646414299388E0,
101  5.44725003058768775090E0,
102  8.74716500199817011941E0,
103  5.30324038235394892183E0,
104  9.99999999999999997821E-1,
105};
106static double PQ[7] = {
107  9.24408810558863637013E-4,
108  8.56288474354474431428E-2,
109  1.25352743901058953537E0,
110  5.47097740330417105182E0,
111  8.76190883237069594232E0,
112  5.30605288235394617618E0,
113  1.00000000000000000218E0,
114};
115#endif
116#ifdef DEC
117static unsigned short PP[28] = {
1180035520,0164604,0140733,0054470,
1190037251,0122605,0115356,0107170,
1200040236,0124412,0071500,0056303,
1210040656,0047737,0045720,0045263,
1220041013,0172143,0045004,0142103,
1230040651,0132045,0026241,0026406,
1240040200,0000000,0000000,0000000,
125};
126static unsigned short PQ[28] = {
1270035562,0052006,0070034,0134666,
1280037257,0057055,0055242,0123424,
1290040240,0071626,0046630,0032371,
1300040657,0011077,0032013,0012731,
1310041014,0030307,0050331,0006414,
1320040651,0145457,0065021,0150304,
1330040200,0000000,0000000,0000000,
134};
135#endif
136#ifdef IBMPC
137static unsigned short PP[28] = {
1380x6b27,0x983b,0x1d30,0x3f4a,
1390xd1cf,0xb35d,0x34b0,0x3fb5,
1400x0b98,0x4e68,0xd521,0x3ff3,
1410x0956,0xe97a,0xc9fb,0x4015,
1420x9888,0x6940,0x7e8c,0x4021,
1430x25a1,0xa594,0x3684,0x4015,
1440x0000,0x0000,0x0000,0x3ff0,
145};
146static unsigned short PQ[28] = {
1470x9737,0xce03,0x4a80,0x3f4e,
1480x54e3,0xab54,0xebc5,0x3fb5,
1490x069f,0xc9b3,0x0e72,0x3ff4,
1500x62bb,0xe681,0xe247,0x4015,
1510x21a1,0xea1b,0x8618,0x4021,
1520x3a19,0xed42,0x3965,0x4015,
1530x0000,0x0000,0x0000,0x3ff0,
154};
155#endif
156#ifdef MIEEE
157static unsigned short PP[28] = {
1580x3f4a,0x1d30,0x983b,0x6b27,
1590x3fb5,0x34b0,0xb35d,0xd1cf,
1600x3ff3,0xd521,0x4e68,0x0b98,
1610x4015,0xc9fb,0xe97a,0x0956,
1620x4021,0x7e8c,0x6940,0x9888,
1630x4015,0x3684,0xa594,0x25a1,
1640x3ff0,0x0000,0x0000,0x0000,
165};
166static unsigned short PQ[28] = {
1670x3f4e,0x4a80,0xce03,0x9737,
1680x3fb5,0xebc5,0xab54,0x54e3,
1690x3ff4,0x0e72,0xc9b3,0x069f,
1700x4015,0xe247,0xe681,0x62bb,
1710x4021,0x8618,0xea1b,0x21a1,
1720x4015,0x3965,0xed42,0x3a19,
1730x3ff0,0x0000,0x0000,0x0000,
174};
175#endif
176
177#ifdef UNK
178static double QP[8] = {
179-1.13663838898469149931E-2,
180-1.28252718670509318512E0,
181-1.95539544257735972385E1,
182-9.32060152123768231369E1,
183-1.77681167980488050595E2,
184-1.47077505154951170175E2,
185-5.14105326766599330220E1,
186-6.05014350600728481186E0,
187};
188static double QQ[7] = {
189/*  1.00000000000000000000E0,*/
190  6.43178256118178023184E1,
191  8.56430025976980587198E2,
192  3.88240183605401609683E3,
193  7.24046774195652478189E3,
194  5.93072701187316984827E3,
195  2.06209331660327847417E3,
196  2.42005740240291393179E2,
197};
198#endif
199#ifdef DEC
200static unsigned short QP[32] = {
2010136472,0035021,0142451,0141115,
2020140244,0024731,0150620,0105642,
2030141234,0067177,0124161,0060141,
2040141672,0064572,0151557,0043036,
2050142061,0127141,0003127,0043517,
2060142023,0011727,0060271,0144544,
2070141515,0122142,0126620,0143150,
2080140701,0115306,0106715,0007344,
209};
210static unsigned short QQ[28] = {
211/*0040200,0000000,0000000,0000000,*/
2120041600,0121272,0004741,0026544,
2130042526,0015605,0105654,0161771,
2140043162,0123155,0165644,0062645,
2150043342,0041675,0167576,0130756,
2160043271,0052720,0165631,0154214,
2170043000,0160576,0034614,0172024,
2180042162,0000570,0030500,0051235,
219};
220#endif
221#ifdef IBMPC
222static unsigned short QP[32] = {
2230x384a,0x38a5,0x4742,0xbf87,
2240x1174,0x3a32,0x853b,0xbff4,
2250x2c0c,0xf50e,0x8dcf,0xc033,
2260xe8c4,0x5a6d,0x4d2f,0xc057,
2270xe8ea,0x20ca,0x35cc,0xc066,
2280x392d,0xec17,0x627a,0xc062,
2290x18cd,0x55b2,0xb48c,0xc049,
2300xa1dd,0xd1b9,0x3358,0xc018,
231};
232static unsigned short QQ[28] = {
233/*0x0000,0x0000,0x0000,0x3ff0,*/
2340x25ac,0x413c,0x1457,0x4050,
2350x9c7f,0xb175,0xc370,0x408a,
2360x8cb5,0xbd74,0x54cd,0x40ae,
2370xd63e,0xbdef,0x4877,0x40bc,
2380x3b11,0x1d73,0x2aba,0x40b7,
2390x9e82,0xc731,0x1c2f,0x40a0,
2400x0a54,0x0628,0x402f,0x406e,
241};
242#endif
243#ifdef MIEEE
244static unsigned short QP[32] = {
2450xbf87,0x4742,0x38a5,0x384a,
2460xbff4,0x853b,0x3a32,0x1174,
2470xc033,0x8dcf,0xf50e,0x2c0c,
2480xc057,0x4d2f,0x5a6d,0xe8c4,
2490xc066,0x35cc,0x20ca,0xe8ea,
2500xc062,0x627a,0xec17,0x392d,
2510xc049,0xb48c,0x55b2,0x18cd,
2520xc018,0x3358,0xd1b9,0xa1dd,
253};
254static unsigned short QQ[28] = {
255/*0x3ff0,0x0000,0x0000,0x0000,*/
2560x4050,0x1457,0x413c,0x25ac,
2570x408a,0xc370,0xb175,0x9c7f,
2580x40ae,0x54cd,0xbd74,0x8cb5,
2590x40bc,0x4877,0xbdef,0xd63e,
2600x40b7,0x2aba,0x1d73,0x3b11,
2610x40a0,0x1c2f,0xc731,0x9e82,
2620x406e,0x402f,0x0628,0x0a54,
263};
264#endif
265
266
267#ifdef UNK
268static double YP[8] = {
269 1.55924367855235737965E4,
270-1.46639295903971606143E7,
271 5.43526477051876500413E9,
272-9.82136065717911466409E11,
273 8.75906394395366999549E13,
274-3.46628303384729719441E15,
275 4.42733268572569800351E16,
276-1.84950800436986690637E16,
277};
278static double YQ[7] = {
279/* 1.00000000000000000000E0,*/
280 1.04128353664259848412E3,
281 6.26107330137134956842E5,
282 2.68919633393814121987E8,
283 8.64002487103935000337E10,
284 2.02979612750105546709E13,
285 3.17157752842975028269E15,
286 2.50596256172653059228E17,
287};
288#endif
289#ifdef DEC
290static unsigned short YP[32] = {
2910043563,0120677,0042264,0046166,
2920146137,0140371,0113444,0042260,
2930050241,0175707,0100502,0063344,
2940152144,0125737,0007265,0164526,
2950053637,0051621,0163035,0060546,
2960155105,0004416,0107306,0060023,
2970056035,0045133,0030132,0000024,
2980155603,0065132,0144061,0131732,
299};
300static unsigned short YQ[28] = {
301/*0040200,0000000,0000000,0000000,*/
3020042602,0024422,0135557,0162663,
3030045030,0155665,0044075,0160135,
3040047200,0035432,0105446,0104005,
3050051240,0167331,0056063,0022743,
3060053223,0127746,0025764,0012160,
3070055064,0044206,0177532,0145545,
3080056536,0111375,0163715,0127201,
309};
310#endif
311#ifdef IBMPC
312static unsigned short YP[32] = {
3130x898f,0xe896,0x7437,0x40ce,
3140x8896,0x32e4,0xf81f,0xc16b,
3150x4cdd,0xf028,0x3f78,0x41f4,
3160xbd2b,0xe1d6,0x957b,0xc26c,
3170xac2d,0x3cc3,0xea72,0x42d3,
3180xcc02,0xd1d8,0xa121,0xc328,
3190x4003,0x660b,0xa94b,0x4363,
3200x367b,0x5906,0x6d4b,0xc350,
321};
322static unsigned short YQ[28] = {
323/*0x0000,0x0000,0x0000,0x3ff0,*/
3240xfcb6,0x576d,0x4522,0x4090,
3250xbc0c,0xa907,0x1b76,0x4123,
3260xd101,0x5164,0x0763,0x41b0,
3270x64bc,0x2b86,0x1ddb,0x4234,
3280x828e,0xc57e,0x75fc,0x42b2,
3290x596d,0xdfeb,0x8910,0x4326,
3300xb5d0,0xbcf9,0xd25f,0x438b,
331};
332#endif
333#ifdef MIEEE
334static unsigned short YP[32] = {
3350x40ce,0x7437,0xe896,0x898f,
3360xc16b,0xf81f,0x32e4,0x8896,
3370x41f4,0x3f78,0xf028,0x4cdd,
3380xc26c,0x957b,0xe1d6,0xbd2b,
3390x42d3,0xea72,0x3cc3,0xac2d,
3400xc328,0xa121,0xd1d8,0xcc02,
3410x4363,0xa94b,0x660b,0x4003,
3420xc350,0x6d4b,0x5906,0x367b,
343};
344static unsigned short YQ[28] = {
345/*0x3ff0,0x0000,0x0000,0x0000,*/
3460x4090,0x4522,0x576d,0xfcb6,
3470x4123,0x1b76,0xa907,0xbc0c,
3480x41b0,0x0763,0x5164,0xd101,
3490x4234,0x1ddb,0x2b86,0x64bc,
3500x42b2,0x75fc,0xc57e,0x828e,
3510x4326,0x8910,0xdfeb,0x596d,
3520x438b,0xd25f,0xbcf9,0xb5d0,
353};
354#endif
355
356#ifdef UNK
357/*  5.783185962946784521175995758455807035071 */
358static double DR1 = 5.78318596294678452118E0;
359/* 30.47126234366208639907816317502275584842 */
360static double DR2 = 3.04712623436620863991E1;
361#endif
362
363#ifdef DEC
364static unsigned short R1[] = {0040671,0007734,0001061,0056734};
365#define DR1 *(double *)R1
366static unsigned short R2[] = {0041363,0142445,0030416,0165567};
367#define DR2 *(double *)R2
368#endif
369
370#ifdef IBMPC
371static unsigned short R1[] = {0x2bbb,0x8046,0x21fb,0x4017};
372#define DR1 *(double *)R1
373static unsigned short R2[] = {0xdd6f,0xa621,0x78a4,0x403e};
374#define DR2 *(double *)R2
375#endif
376
377#ifdef MIEEE
378static unsigned short R1[] = {0x4017,0x21fb,0x8046,0x2bbb};
379#define DR1 *(double *)R1
380static unsigned short R2[] = {0x403e,0x78a4,0xa621,0xdd6f};
381#define DR2 *(double *)R2
382#endif
383
384#ifdef UNK
385static double RP[4] = {
386-4.79443220978201773821E9,
387 1.95617491946556577543E12,
388-2.49248344360967716204E14,
389 9.70862251047306323952E15,
390};
391static double RQ[8] = {
392/* 1.00000000000000000000E0,*/
393 4.99563147152651017219E2,
394 1.73785401676374683123E5,
395 4.84409658339962045305E7,
396 1.11855537045356834862E10,
397 2.11277520115489217587E12,
398 3.10518229857422583814E14,
399 3.18121955943204943306E16,
400 1.71086294081043136091E18,
401};
402#endif
403#ifdef DEC
404static unsigned short RP[16] = {
4050150216,0161235,0064344,0014450,
4060052343,0135216,0035624,0144153,
4070154142,0130247,0003310,0003667,
4080055411,0173703,0047772,0176635,
409};
410static unsigned short RQ[32] = {
411/*0040200,0000000,0000000,0000000,*/
4120042371,0144025,0032265,0136137,
4130044451,0133131,0132420,0151466,
4140046470,0144641,0072540,0030636,
4150050446,0126600,0045042,0044243,
4160052365,0172633,0110301,0071063,
4170054215,0032424,0062272,0043513,
4180055742,0005013,0171731,0072335,
4190057275,0170646,0036663,0013134,
420};
421#endif
422#ifdef IBMPC
423static unsigned short RP[16] = {
4240x8325,0xad1c,0xdc53,0xc1f1,
4250x990d,0xc772,0x7751,0x427c,
4260x00f7,0xe0d9,0x5614,0xc2ec,
4270x5fb4,0x69ff,0x3ef8,0x4341,
428};
429static unsigned short RQ[32] = {
430/*0x0000,0x0000,0x0000,0x3ff0,*/
4310xb78c,0xa696,0x3902,0x407f,
4320x1a67,0x36a2,0x36cb,0x4105,
4330x0634,0x2eac,0x1934,0x4187,
4340x4914,0x0944,0xd5b0,0x4204,
4350x2e46,0x7218,0xbeb3,0x427e,
4360x48e9,0x8c97,0xa6a2,0x42f1,
4370x2e9c,0x7e7b,0x4141,0x435c,
4380x62cc,0xc7b6,0xbe34,0x43b7,
439};
440#endif
441#ifdef MIEEE
442static unsigned short RP[16] = {
4430xc1f1,0xdc53,0xad1c,0x8325,
4440x427c,0x7751,0xc772,0x990d,
4450xc2ec,0x5614,0xe0d9,0x00f7,
4460x4341,0x3ef8,0x69ff,0x5fb4,
447};
448static unsigned short RQ[32] = {
449/*0x3ff0,0x0000,0x0000,0x0000,*/
4500x407f,0x3902,0xa696,0xb78c,
4510x4105,0x36cb,0x36a2,0x1a67,
4520x4187,0x1934,0x2eac,0x0634,
4530x4204,0xd5b0,0x0944,0x4914,
4540x427e,0xbeb3,0x7218,0x2e46,
4550x42f1,0xa6a2,0x8c97,0x48e9,
4560x435c,0x4141,0x7e7b,0x2e9c,
4570x43b7,0xbe34,0xc7b6,0x62cc,
458};
459#endif
460
461#ifdef ANSIPROT
462extern double polevl ( double, void *, int );
463extern double p1evl ( double, void *, int );
464extern double log ( double );
465extern double sin ( double );
466extern double cos ( double );
467extern double sqrt ( double );
468double j0 ( double );
469#else
470double polevl(), p1evl(), log(), sin(), cos(), sqrt();
471double j0();
472#endif
473extern double TWOOPI, SQ2OPI, PIO4;
474
475double j0(x)
476double x;
477{
478double w, z, p, q, xn;
479
480if( x < 0 )
481        x = -x;
482
483if( x <= 5.0 )
484        {
485        z = x * x;
486        if( x < 1.0e-5 )
487                return( 1.0 - z/4.0 );
488
489        p = (z - DR1) * (z - DR2);
490        p = p * polevl( z, RP, 3)/p1evl( z, RQ, 8 );
491        return( p );
492        }
493
494w = 5.0/x;
495q = 25.0/(x*x);
496p = polevl( q, PP, 6)/polevl( q, PQ, 6 );
497q = polevl( q, QP, 7)/p1evl( q, QQ, 7 );
498xn = x - PIO4;
499p = p * cos(xn) - w * q * sin(xn);
500return( p * SQ2OPI / sqrt(x) );
501}
502
503/*                                                      y0() 2  */
504/* Bessel function of second kind, order zero   */
505
506/* Rational approximation coefficients YP[], YQ[] are used here.
507 * The function computed is  y0(x)  -  2 * log(x) * j0(x) / PI,
508 * whose value at x = 0 is  2 * ( log(0.5) + EUL ) / PI
509 * = 0.073804295108687225.
510 */
511
512/*
513#define PIO4 .78539816339744830962
514#define SQ2OPI .79788456080286535588
515*/
516extern double MAXNUM;
517
518double y0(x)
519double x;
520{
521double w, z, p, q, xn;
522
523if( x <= 5.0 )
524        {
525        if( x <= 0.0 )
526                {
527                mtherr( "y0", DOMAIN );
528                return( -MAXNUM );
529                }
530        z = x * x;
531        w = polevl( z, YP, 7) / p1evl( z, YQ, 7 );
532        w += TWOOPI * log(x) * j0(x);
533        return( w );
534        }
535
536w = 5.0/x;
537z = 25.0 / (x * x);
538p = polevl( z, PP, 6)/polevl( z, PQ, 6 );
539q = polevl( z, QP, 7)/p1evl( z, QQ, 7 );
540xn = x - PIO4;
541p = p * sin(xn) + w * q * cos(xn);
542return( p * SQ2OPI / sqrt(x) );
543}
Note: See TracBrowser for help on using the repository browser.