Commit 821513c85d6105d8e678cf4867a43d3530c651db
1 parent
8d4f0940
ERROR plane wave refraction still doesn't work.
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1 | +#ifndef RTS_BESSEL_H | ||
2 | +#define RTS_BESSEL_H | ||
3 | + | ||
4 | +#define _USE_MATH_DEFINES | ||
5 | +#include <math.h> | ||
6 | +#include "../math/complex.h" | ||
7 | +#define eps 1e-15 | ||
8 | +#define el 0.5772156649015329 | ||
9 | + | ||
10 | + | ||
11 | +namespace rts{ | ||
12 | + | ||
13 | +static complex<double> cii(0.0,1.0); | ||
14 | +static complex<double> cone(1.0,0.0); | ||
15 | +static complex<double> czero(0.0,0.0); | ||
16 | + | ||
17 | +template< typename P > | ||
18 | +P gamma(P x) | ||
19 | +{ | ||
20 | + int i,k,m; | ||
21 | + P ga,gr,r,z; | ||
22 | + | ||
23 | + static P g[] = { | ||
24 | + 1.0, | ||
25 | + 0.5772156649015329, | ||
26 | + -0.6558780715202538, | ||
27 | + -0.420026350340952e-1, | ||
28 | + 0.1665386113822915, | ||
29 | + -0.421977345555443e-1, | ||
30 | + -0.9621971527877e-2, | ||
31 | + 0.7218943246663e-2, | ||
32 | + -0.11651675918591e-2, | ||
33 | + -0.2152416741149e-3, | ||
34 | + 0.1280502823882e-3, | ||
35 | + -0.201348547807e-4, | ||
36 | + -0.12504934821e-5, | ||
37 | + 0.1133027232e-5, | ||
38 | + -0.2056338417e-6, | ||
39 | + 0.6116095e-8, | ||
40 | + 0.50020075e-8, | ||
41 | + -0.11812746e-8, | ||
42 | + 0.1043427e-9, | ||
43 | + 0.77823e-11, | ||
44 | + -0.36968e-11, | ||
45 | + 0.51e-12, | ||
46 | + -0.206e-13, | ||
47 | + -0.54e-14, | ||
48 | + 0.14e-14}; | ||
49 | + | ||
50 | + if (x > 171.0) return 1e308; // This value is an overflow flag. | ||
51 | + if (x == (int)x) { | ||
52 | + if (x > 0.0) { | ||
53 | + ga = 1.0; // use factorial | ||
54 | + for (i=2;i<x;i++) { | ||
55 | + ga *= i; | ||
56 | + } | ||
57 | + } | ||
58 | + else | ||
59 | + ga = 1e308; | ||
60 | + } | ||
61 | + else { | ||
62 | + if (fabs(x) > 1.0) { | ||
63 | + z = fabs(x); | ||
64 | + m = (int)z; | ||
65 | + r = 1.0; | ||
66 | + for (k=1;k<=m;k++) { | ||
67 | + r *= (z-k); | ||
68 | + } | ||
69 | + z -= m; | ||
70 | + } | ||
71 | + else | ||
72 | + z = x; | ||
73 | + gr = g[24]; | ||
74 | + for (k=23;k>=0;k--) { | ||
75 | + gr = gr*z+g[k]; | ||
76 | + } | ||
77 | + ga = 1.0/(gr*z); | ||
78 | + if (fabs(x) > 1.0) { | ||
79 | + ga *= r; | ||
80 | + if (x < 0.0) { | ||
81 | + ga = -M_PI/(x*ga*sin(M_PI*x)); | ||
82 | + } | ||
83 | + } | ||
84 | + } | ||
85 | + return ga; | ||
86 | +} | ||
87 | + | ||
88 | +template<typename P> | ||
89 | +int bessjy01a(P x,P &j0,P &j1,P &y0,P &y1, | ||
90 | + P &j0p,P &j1p,P &y0p,P &y1p) | ||
91 | +{ | ||
92 | + P x2,r,ec,w0,w1,r0,r1,cs0,cs1; | ||
93 | + P cu,p0,q0,p1,q1,t1,t2; | ||
94 | + int k,kz; | ||
95 | + static P a[] = { | ||
96 | + -7.03125e-2, | ||
97 | + 0.112152099609375, | ||
98 | + -0.5725014209747314, | ||
99 | + 6.074042001273483, | ||
100 | + -1.100171402692467e2, | ||
101 | + 3.038090510922384e3, | ||
102 | + -1.188384262567832e5, | ||
103 | + 6.252951493434797e6, | ||
104 | + -4.259392165047669e8, | ||
105 | + 3.646840080706556e10, | ||
106 | + -3.833534661393944e12, | ||
107 | + 4.854014686852901e14, | ||
108 | + -7.286857349377656e16, | ||
109 | + 1.279721941975975e19}; | ||
110 | + static P b[] = { | ||
111 | + 7.32421875e-2, | ||
112 | + -0.2271080017089844, | ||
113 | + 1.727727502584457, | ||
114 | + -2.438052969955606e1, | ||
115 | + 5.513358961220206e2, | ||
116 | + -1.825775547429318e4, | ||
117 | + 8.328593040162893e5, | ||
118 | + -5.006958953198893e7, | ||
119 | + 3.836255180230433e9, | ||
120 | + -3.649010818849833e11, | ||
121 | + 4.218971570284096e13, | ||
122 | + -5.827244631566907e15, | ||
123 | + 9.476288099260110e17, | ||
124 | + -1.792162323051699e20}; | ||
125 | + static P a1[] = { | ||
126 | + 0.1171875, | ||
127 | + -0.1441955566406250, | ||
128 | + 0.6765925884246826, | ||
129 | + -6.883914268109947, | ||
130 | + 1.215978918765359e2, | ||
131 | + -3.302272294480852e3, | ||
132 | + 1.276412726461746e5, | ||
133 | + -6.656367718817688e6, | ||
134 | + 4.502786003050393e8, | ||
135 | + -3.833857520742790e10, | ||
136 | + 4.011838599133198e12, | ||
137 | + -5.060568503314727e14, | ||
138 | + 7.572616461117958e16, | ||
139 | + -1.326257285320556e19}; | ||
140 | + static P b1[] = { | ||
141 | + -0.1025390625, | ||
142 | + 0.2775764465332031, | ||
143 | + -1.993531733751297, | ||
144 | + 2.724882731126854e1, | ||
145 | + -6.038440767050702e2, | ||
146 | + 1.971837591223663e4, | ||
147 | + -8.902978767070678e5, | ||
148 | + 5.310411010968522e7, | ||
149 | + -4.043620325107754e9, | ||
150 | + 3.827011346598605e11, | ||
151 | + -4.406481417852278e13, | ||
152 | + 6.065091351222699e15, | ||
153 | + -9.833883876590679e17, | ||
154 | + 1.855045211579828e20}; | ||
155 | + | ||
156 | + if (x < 0.0) return 1; | ||
157 | + if (x == 0.0) { | ||
158 | + j0 = 1.0; | ||
159 | + j1 = 0.0; | ||
160 | + y0 = -1e308; | ||
161 | + y1 = -1e308; | ||
162 | + j0p = 0.0; | ||
163 | + j1p = 0.5; | ||
164 | + y0p = 1e308; | ||
165 | + y1p = 1e308; | ||
166 | + return 0; | ||
167 | + } | ||
168 | + x2 = x*x; | ||
169 | + if (x <= 12.0) { | ||
170 | + j0 = 1.0; | ||
171 | + r = 1.0; | ||
172 | + for (k=1;k<=30;k++) { | ||
173 | + r *= -0.25*x2/(k*k); | ||
174 | + j0 += r; | ||
175 | + if (fabs(r) < fabs(j0)*1e-15) break; | ||
176 | + } | ||
177 | + j1 = 1.0; | ||
178 | + r = 1.0; | ||
179 | + for (k=1;k<=30;k++) { | ||
180 | + r *= -0.25*x2/(k*(k+1)); | ||
181 | + j1 += r; | ||
182 | + if (fabs(r) < fabs(j1)*1e-15) break; | ||
183 | + } | ||
184 | + j1 *= 0.5*x; | ||
185 | + ec = log(0.5*x)+el; | ||
186 | + cs0 = 0.0; | ||
187 | + w0 = 0.0; | ||
188 | + r0 = 1.0; | ||
189 | + for (k=1;k<=30;k++) { | ||
190 | + w0 += 1.0/k; | ||
191 | + r0 *= -0.25*x2/(k*k); | ||
192 | + r = r0 * w0; | ||
193 | + cs0 += r; | ||
194 | + if (fabs(r) < fabs(cs0)*1e-15) break; | ||
195 | + } | ||
196 | + y0 = M_2_PI*(ec*j0-cs0); | ||
197 | + cs1 = 1.0; | ||
198 | + w1 = 0.0; | ||
199 | + r1 = 1.0; | ||
200 | + for (k=1;k<=30;k++) { | ||
201 | + w1 += 1.0/k; | ||
202 | + r1 *= -0.25*x2/(k*(k+1)); | ||
203 | + r = r1*(2.0*w1+1.0/(k+1)); | ||
204 | + cs1 += r; | ||
205 | + if (fabs(r) < fabs(cs1)*1e-15) break; | ||
206 | + } | ||
207 | + y1 = M_2_PI * (ec*j1-1.0/x-0.25*x*cs1); | ||
208 | + } | ||
209 | + else { | ||
210 | + if (x >= 50.0) kz = 8; // Can be changed to 10 | ||
211 | + else if (x >= 35.0) kz = 10; // " " 12 | ||
212 | + else kz = 12; // " " 14 | ||
213 | + t1 = x-M_PI_4; | ||
214 | + p0 = 1.0; | ||
215 | + q0 = -0.125/x; | ||
216 | + for (k=0;k<kz;k++) { | ||
217 | + p0 += a[k]*pow(x,-2*k-2); | ||
218 | + q0 += b[k]*pow(x,-2*k-3); | ||
219 | + } | ||
220 | + cu = sqrt(M_2_PI/x); | ||
221 | + j0 = cu*(p0*cos(t1)-q0*sin(t1)); | ||
222 | + y0 = cu*(p0*sin(t1)+q0*cos(t1)); | ||
223 | + t2 = x-0.75*M_PI; | ||
224 | + p1 = 1.0; | ||
225 | + q1 = 0.375/x; | ||
226 | + for (k=0;k<kz;k++) { | ||
227 | + p1 += a1[k]*pow(x,-2*k-2); | ||
228 | + q1 += b1[k]*pow(x,-2*k-3); | ||
229 | + } | ||
230 | + j1 = cu*(p1*cos(t2)-q1*sin(t2)); | ||
231 | + y1 = cu*(p1*sin(t2)+q1*cos(t2)); | ||
232 | + } | ||
233 | + j0p = -j1; | ||
234 | + j1p = j0-j1/x; | ||
235 | + y0p = -y1; | ||
236 | + y1p = y0-y1/x; | ||
237 | + return 0; | ||
238 | +} | ||
239 | +// | ||
240 | +// INPUT: | ||
241 | +// double x -- argument of Bessel function | ||
242 | +// | ||
243 | +// OUTPUT: | ||
244 | +// double j0 -- Bessel function of 1st kind, 0th order | ||
245 | +// double j1 -- Bessel function of 1st kind, 1st order | ||
246 | +// double y0 -- Bessel function of 2nd kind, 0th order | ||
247 | +// double y1 -- Bessel function of 2nd kind, 1st order | ||
248 | +// double j0p -- derivative of Bessel function of 1st kind, 0th order | ||
249 | +// double j1p -- derivative of Bessel function of 1st kind, 1st order | ||
250 | +// double y0p -- derivative of Bessel function of 2nd kind, 0th order | ||
251 | +// double y1p -- derivative of Bessel function of 2nd kind, 1st order | ||
252 | +// | ||
253 | +// RETURN: | ||
254 | +// int error code: 0 = OK, 1 = error | ||
255 | +// | ||
256 | +// This algorithm computes the functions using polynomial approximations. | ||
257 | +// | ||
258 | +template<typename P> | ||
259 | +int bessjy01b(P x,P &j0,P &j1,P &y0,P &y1, | ||
260 | + P &j0p,P &j1p,P &y0p,P &y1p) | ||
261 | +{ | ||
262 | + P t,t2,dtmp,a0,p0,q0,p1,q1,ta0,ta1; | ||
263 | + if (x < 0.0) return 1; | ||
264 | + if (x == 0.0) { | ||
265 | + j0 = 1.0; | ||
266 | + j1 = 0.0; | ||
267 | + y0 = -1e308; | ||
268 | + y1 = -1e308; | ||
269 | + j0p = 0.0; | ||
270 | + j1p = 0.5; | ||
271 | + y0p = 1e308; | ||
272 | + y1p = 1e308; | ||
273 | + return 0; | ||
274 | + } | ||
275 | + if(x <= 4.0) { | ||
276 | + t = x/4.0; | ||
277 | + t2 = t*t; | ||
278 | + j0 = ((((((-0.5014415e-3*t2+0.76771853e-2)*t2-0.0709253492)*t2+ | ||
279 | + 0.4443584263)*t2-1.7777560599)*t2+3.9999973021)*t2 | ||
280 | + -3.9999998721)*t2+1.0; | ||
281 | + j1 = t*(((((((-0.1289769e-3*t2+0.22069155e-2)*t2-0.0236616773)*t2+ | ||
282 | + 0.1777582922)*t2-0.8888839649)*t2+2.6666660544)*t2- | ||
283 | + 3.999999971)*t2+1.9999999998); | ||
284 | + dtmp = (((((((-0.567433e-4*t2+0.859977e-3)*t2-0.94855882e-2)*t2+ | ||
285 | + 0.0772975809)*t2-0.4261737419)*t2+1.4216421221)*t2- | ||
286 | + 2.3498519931)*t2+1.0766115157)*t2+0.3674669052; | ||
287 | + y0 = M_2_PI*log(0.5*x)*j0+dtmp; | ||
288 | + dtmp = (((((((0.6535773e-3*t2-0.0108175626)*t2+0.107657607)*t2- | ||
289 | + 0.7268945577)*t2+3.1261399273)*t2-7.3980241381)*t2+ | ||
290 | + 6.8529236342)*t2+0.3932562018)*t2-0.6366197726; | ||
291 | + y1 = M_2_PI*log(0.5*x)*j1+dtmp/x; | ||
292 | + } | ||
293 | + else { | ||
294 | + t = 4.0/x; | ||
295 | + t2 = t*t; | ||
296 | + a0 = sqrt(M_2_PI/x); | ||
297 | + p0 = ((((-0.9285e-5*t2+0.43506e-4)*t2-0.122226e-3)*t2+ | ||
298 | + 0.434725e-3)*t2-0.4394275e-2)*t2+0.999999997; | ||
299 | + q0 = t*(((((0.8099e-5*t2-0.35614e-4)*t2+0.85844e-4)*t2- | ||
300 | + 0.218024e-3)*t2+0.1144106e-2)*t2-0.031249995); | ||
301 | + ta0 = x-M_PI_4; | ||
302 | + j0 = a0*(p0*cos(ta0)-q0*sin(ta0)); | ||
303 | + y0 = a0*(p0*sin(ta0)+q0*cos(ta0)); | ||
304 | + p1 = ((((0.10632e-4*t2-0.50363e-4)*t2+0.145575e-3)*t2 | ||
305 | + -0.559487e-3)*t2+0.7323931e-2)*t2+1.000000004; | ||
306 | + q1 = t*(((((-0.9173e-5*t2+0.40658e-4)*t2-0.99941e-4)*t2 | ||
307 | + +0.266891e-3)*t2-0.1601836e-2)*t2+0.093749994); | ||
308 | + ta1 = x-0.75*M_PI; | ||
309 | + j1 = a0*(p1*cos(ta1)-q1*sin(ta1)); | ||
310 | + y1 = a0*(p1*sin(ta1)+q1*cos(ta1)); | ||
311 | + } | ||
312 | + j0p = -j1; | ||
313 | + j1p = j0-j1/x; | ||
314 | + y0p = -y1; | ||
315 | + y1p = y0-y1/x; | ||
316 | + return 0; | ||
317 | +} | ||
318 | +template<typename P> | ||
319 | +int msta1(P x,int mp) | ||
320 | +{ | ||
321 | + P a0,f0,f1,f; | ||
322 | + int i,n0,n1,nn; | ||
323 | + | ||
324 | + a0 = fabs(x); | ||
325 | + n0 = (int)(1.1*a0)+1; | ||
326 | + f0 = 0.5*log10(6.28*n0)-n0*log10(1.36*a0/n0)-mp; | ||
327 | + n1 = n0+5; | ||
328 | + f1 = 0.5*log10(6.28*n1)-n1*log10(1.36*a0/n1)-mp; | ||
329 | + for (i=0;i<20;i++) { | ||
330 | + nn = (int)(n1-(n1-n0)/(1.0-f0/f1)); | ||
331 | + f = 0.5*log10(6.28*nn)-nn*log10(1.36*a0/nn)-mp; | ||
332 | + if (abs(nn-n1) < 1) break; | ||
333 | + n0 = n1; | ||
334 | + f0 = f1; | ||
335 | + n1 = nn; | ||
336 | + f1 = f; | ||
337 | + } | ||
338 | + return nn; | ||
339 | +} | ||
340 | +template<typename P> | ||
341 | +int msta2(P x,int n,int mp) | ||
342 | +{ | ||
343 | + P a0,ejn,hmp,f0,f1,f,obj; | ||
344 | + int i,n0,n1,nn; | ||
345 | + | ||
346 | + a0 = fabs(x); | ||
347 | + hmp = 0.5*mp; | ||
348 | + ejn = 0.5*log10(6.28*n)-n*log10(1.36*a0/n); | ||
349 | + if (ejn <= hmp) { | ||
350 | + obj = mp; | ||
351 | + n0 = (int)(1.1*a0); | ||
352 | + if (n0 < 1) n0 = 1; | ||
353 | + } | ||
354 | + else { | ||
355 | + obj = hmp+ejn; | ||
356 | + n0 = n; | ||
357 | + } | ||
358 | + f0 = 0.5*log10(6.28*n0)-n0*log10(1.36*a0/n0)-obj; | ||
359 | + n1 = n0+5; | ||
360 | + f1 = 0.5*log10(6.28*n1)-n1*log10(1.36*a0/n1)-obj; | ||
361 | + for (i=0;i<20;i++) { | ||
362 | + nn = (int)(n1-(n1-n0)/(1.0-f0/f1)); | ||
363 | + f = 0.5*log10(6.28*nn)-nn*log10(1.36*a0/nn)-obj; | ||
364 | + if (abs(nn-n1) < 1) break; | ||
365 | + n0 = n1; | ||
366 | + f0 = f1; | ||
367 | + n1 = nn; | ||
368 | + f1 = f; | ||
369 | + } | ||
370 | + return nn+10; | ||
371 | +} | ||
372 | +// | ||
373 | +// INPUT: | ||
374 | +// double x -- argument of Bessel function of 1st and 2nd kind. | ||
375 | +// int n -- order | ||
376 | +// | ||
377 | +// OUPUT: | ||
378 | +// | ||
379 | +// int nm -- highest order actually computed (nm <= n) | ||
380 | +// double jn[] -- Bessel function of 1st kind, orders from 0 to nm | ||
381 | +// double yn[] -- Bessel function of 2nd kind, orders from 0 to nm | ||
382 | +// double j'n[]-- derivative of Bessel function of 1st kind, | ||
383 | +// orders from 0 to nm | ||
384 | +// double y'n[]-- derivative of Bessel function of 2nd kind, | ||
385 | +// orders from 0 to nm | ||
386 | +// | ||
387 | +// Computes Bessel functions of all order up to 'n' using recurrence | ||
388 | +// relations. If 'nm' < 'n' only 'nm' orders are returned. | ||
389 | +// | ||
390 | +template<typename P> | ||
391 | +int bessjyna(int n,P x,int &nm,P *jn,P *yn, | ||
392 | + P *jnp,P *ynp) | ||
393 | +{ | ||
394 | + P bj0,bj1,f,f0,f1,f2,cs; | ||
395 | + int i,k,m,ecode; | ||
396 | + | ||
397 | + nm = n; | ||
398 | + if ((x < 0.0) || (n < 0)) return 1; | ||
399 | + if (x < 1e-15) { | ||
400 | + for (i=0;i<=n;i++) { | ||
401 | + jn[i] = 0.0; | ||
402 | + yn[i] = -1e308; | ||
403 | + jnp[i] = 0.0; | ||
404 | + ynp[i] = 1e308; | ||
405 | + } | ||
406 | + jn[0] = 1.0; | ||
407 | + jnp[1] = 0.5; | ||
408 | + return 0; | ||
409 | + } | ||
410 | + ecode = bessjy01a(x,jn[0],jn[1],yn[0],yn[1],jnp[0],jnp[1],ynp[0],ynp[1]); | ||
411 | + if (n < 2) return 0; | ||
412 | + bj0 = jn[0]; | ||
413 | + bj1 = jn[1]; | ||
414 | + if (n < (int)0.9*x) { | ||
415 | + for (k=2;k<=n;k++) { | ||
416 | + jn[k] = 2.0*(k-1.0)*bj1/x-bj0; | ||
417 | + bj0 = bj1; | ||
418 | + bj1 = jn[k]; | ||
419 | + } | ||
420 | + } | ||
421 | + else { | ||
422 | + m = msta1(x,200); | ||
423 | + if (m < n) nm = m; | ||
424 | + else m = msta2(x,n,15); | ||
425 | + f2 = 0.0; | ||
426 | + f1 = 1.0e-100; | ||
427 | + for (k=m;k>=0;k--) { | ||
428 | + f = 2.0*(k+1.0)/x*f1-f2; | ||
429 | + if (k <= nm) jn[k] = f; | ||
430 | + f2 = f1; | ||
431 | + f1 = f; | ||
432 | + } | ||
433 | + if (fabs(bj0) > fabs(bj1)) cs = bj0/f; | ||
434 | + else cs = bj1/f2; | ||
435 | + for (k=0;k<=nm;k++) { | ||
436 | + jn[k] *= cs; | ||
437 | + } | ||
438 | + } | ||
439 | + for (k=2;k<=nm;k++) { | ||
440 | + jnp[k] = jn[k-1]-k*jn[k]/x; | ||
441 | + } | ||
442 | + f0 = yn[0]; | ||
443 | + f1 = yn[1]; | ||
444 | + for (k=2;k<=nm;k++) { | ||
445 | + f = 2.0*(k-1.0)*f1/x-f0; | ||
446 | + yn[k] = f; | ||
447 | + f0 = f1; | ||
448 | + f1 = f; | ||
449 | + } | ||
450 | + for (k=2;k<=nm;k++) { | ||
451 | + ynp[k] = yn[k-1]-k*yn[k]/x; | ||
452 | + } | ||
453 | + return 0; | ||
454 | +} | ||
455 | +// | ||
456 | +// Same input and output conventions as above. Different recurrence | ||
457 | +// relations used for 'x' < 300. | ||
458 | +// | ||
459 | +template<typename P> | ||
460 | +int bessjynb(int n,P x,int &nm,P *jn,P *yn, | ||
461 | + P *jnp,P *ynp) | ||
462 | +{ | ||
463 | + P t1,t2,f,f1,f2,bj0,bj1,bjk,by0,by1,cu,s0,su,sv; | ||
464 | + P ec,bs,byk,p0,p1,q0,q1; | ||
465 | + static P a[] = { | ||
466 | + -0.7031250000000000e-1, | ||
467 | + 0.1121520996093750, | ||
468 | + -0.5725014209747314, | ||
469 | + 6.074042001273483}; | ||
470 | + static P b[] = { | ||
471 | + 0.7324218750000000e-1, | ||
472 | + -0.2271080017089844, | ||
473 | + 1.727727502584457, | ||
474 | + -2.438052969955606e1}; | ||
475 | + static P a1[] = { | ||
476 | + 0.1171875, | ||
477 | + -0.1441955566406250, | ||
478 | + 0.6765925884246826, | ||
479 | + -6.883914268109947}; | ||
480 | + static P b1[] = { | ||
481 | + -0.1025390625, | ||
482 | + 0.2775764465332031, | ||
483 | + -1.993531733751297, | ||
484 | + 2.724882731126854e1}; | ||
485 | + | ||
486 | + int i,k,m; | ||
487 | + nm = n; | ||
488 | + if ((x < 0.0) || (n < 0)) return 1; | ||
489 | + if (x < 1e-15) { | ||
490 | + for (i=0;i<=n;i++) { | ||
491 | + jn[i] = 0.0; | ||
492 | + yn[i] = -1e308; | ||
493 | + jnp[i] = 0.0; | ||
494 | + ynp[i] = 1e308; | ||
495 | + } | ||
496 | + jn[0] = 1.0; | ||
497 | + jnp[1] = 0.5; | ||
498 | + return 0; | ||
499 | + } | ||
500 | + if (x <= 300.0 || n > (int)(0.9*x)) { | ||
501 | + if (n == 0) nm = 1; | ||
502 | + m = msta1(x,200); | ||
503 | + if (m < nm) nm = m; | ||
504 | + else m = msta2(x,nm,15); | ||
505 | + bs = 0.0; | ||
506 | + su = 0.0; | ||
507 | + sv = 0.0; | ||
508 | + f2 = 0.0; | ||
509 | + f1 = 1.0e-100; | ||
510 | + for (k = m;k>=0;k--) { | ||
511 | + f = 2.0*(k+1.0)/x*f1 - f2; | ||
512 | + if (k <= nm) jn[k] = f; | ||
513 | + if ((k == 2*(int)(k/2)) && (k != 0)) { | ||
514 | + bs += 2.0*f; | ||
515 | +// su += pow(-1,k>>1)*f/(double)k; | ||
516 | + su += (-1)*((k & 2)-1)*f/(P)k; | ||
517 | + } | ||
518 | + else if (k > 1) { | ||
519 | +// sv += pow(-1,k>>1)*k*f/(k*k-1.0); | ||
520 | + sv += (-1)*((k & 2)-1)*(P)k*f/(k*k-1.0); | ||
521 | + } | ||
522 | + f2 = f1; | ||
523 | + f1 = f; | ||
524 | + } | ||
525 | + s0 = bs+f; | ||
526 | + for (k=0;k<=nm;k++) { | ||
527 | + jn[k] /= s0; | ||
528 | + } | ||
529 | + ec = log(0.5*x) +0.5772156649015329; | ||
530 | + by0 = M_2_PI*(ec*jn[0]-4.0*su/s0); | ||
531 | + yn[0] = by0; | ||
532 | + by1 = M_2_PI*((ec-1.0)*jn[1]-jn[0]/x-4.0*sv/s0); | ||
533 | + yn[1] = by1; | ||
534 | + } | ||
535 | + else { | ||
536 | + t1 = x-M_PI_4; | ||
537 | + p0 = 1.0; | ||
538 | + q0 = -0.125/x; | ||
539 | + for (k=0;k<4;k++) { | ||
540 | + p0 += a[k]*pow(x,-2*k-2); | ||
541 | + q0 += b[k]*pow(x,-2*k-3); | ||
542 | + } | ||
543 | + cu = sqrt(M_2_PI/x); | ||
544 | + bj0 = cu*(p0*cos(t1)-q0*sin(t1)); | ||
545 | + by0 = cu*(p0*sin(t1)+q0*cos(t1)); | ||
546 | + jn[0] = bj0; | ||
547 | + yn[0] = by0; | ||
548 | + t2 = x-0.75*M_PI; | ||
549 | + p1 = 1.0; | ||
550 | + q1 = 0.375/x; | ||
551 | + for (k=0;k<4;k++) { | ||
552 | + p1 += a1[k]*pow(x,-2*k-2); | ||
553 | + q1 += b1[k]*pow(x,-2*k-3); | ||
554 | + } | ||
555 | + bj1 = cu*(p1*cos(t2)-q1*sin(t2)); | ||
556 | + by1 = cu*(p1*sin(t2)+q1*cos(t2)); | ||
557 | + jn[1] = bj1; | ||
558 | + yn[1] = by1; | ||
559 | + for (k=2;k<=nm;k++) { | ||
560 | + bjk = 2.0*(k-1.0)*bj1/x-bj0; | ||
561 | + jn[k] = bjk; | ||
562 | + bj0 = bj1; | ||
563 | + bj1 = bjk; | ||
564 | + } | ||
565 | + } | ||
566 | + jnp[0] = -jn[1]; | ||
567 | + for (k=1;k<=nm;k++) { | ||
568 | + jnp[k] = jn[k-1]-k*jn[k]/x; | ||
569 | + } | ||
570 | + for (k=2;k<=nm;k++) { | ||
571 | + byk = 2.0*(k-1.0)*by1/x-by0; | ||
572 | + yn[k] = byk; | ||
573 | + by0 = by1; | ||
574 | + by1 = byk; | ||
575 | + } | ||
576 | + ynp[0] = -yn[1]; | ||
577 | + for (k=1;k<=nm;k++) { | ||
578 | + ynp[k] = yn[k-1]-k*yn[k]/x; | ||
579 | + } | ||
580 | + return 0; | ||
581 | + | ||
582 | +} | ||
583 | + | ||
584 | +// The following routine computes Bessel Jv(x) and Yv(x) for | ||
585 | +// arbitrary positive order (v). For negative order, use: | ||
586 | +// | ||
587 | +// J-v(x) = Jv(x)cos(v pi) - Yv(x)sin(v pi) | ||
588 | +// Y-v(x) = Jv(x)sin(v pi) + Yv(x)cos(v pi) | ||
589 | +// | ||
590 | +template<typename P> | ||
591 | +int bessjyv(P v,P x,P &vm,P *jv,P *yv, | ||
592 | + P *djv,P *dyv) | ||
593 | +{ | ||
594 | + P v0,vl,vg,vv,a,a0,r,x2,bjv0,bjv1,bjvl,f,f0,f1,f2; | ||
595 | + P r0,r1,ck,cs,cs0,cs1,sk,qx,px,byv0,byv1,rp,xk,rq; | ||
596 | + P b,ec,w0,w1,bju0,bju1,pv0,pv1,byvk; | ||
597 | + int j,k,l,m,n,kz; | ||
598 | + | ||
599 | + x2 = x*x; | ||
600 | + n = (int)v; | ||
601 | + v0 = v-n; | ||
602 | + if ((x < 0.0) || (v < 0.0)) return 1; | ||
603 | + if (x < 1e-15) { | ||
604 | + for (k=0;k<=n;k++) { | ||
605 | + jv[k] = 0.0; | ||
606 | + yv[k] = -1e308; | ||
607 | + djv[k] = 0.0; | ||
608 | + dyv[k] = 1e308; | ||
609 | + if (v0 == 0.0) { | ||
610 | + jv[0] = 1.0; | ||
611 | + djv[1] = 0.5; | ||
612 | + } | ||
613 | + else djv[0] = 1e308; | ||
614 | + } | ||
615 | + vm = v; | ||
616 | + return 0; | ||
617 | + } | ||
618 | + if (x <= 12.0) { | ||
619 | + for (l=0;l<2;l++) { | ||
620 | + vl = v0 + l; | ||
621 | + bjvl = 1.0; | ||
622 | + r = 1.0; | ||
623 | + for (k=1;k<=40;k++) { | ||
624 | + r *= -0.25*x2/(k*(k+vl)); | ||
625 | + bjvl += r; | ||
626 | + if (fabs(r) < fabs(bjvl)*1e-15) break; | ||
627 | + } | ||
628 | + vg = 1.0 + vl; | ||
629 | + a = pow(0.5*x,vl)/gamma(vg); | ||
630 | + if (l == 0) bjv0 = bjvl*a; | ||
631 | + else bjv1 = bjvl*a; | ||
632 | + } | ||
633 | + } | ||
634 | + else { | ||
635 | + if (x >= 50.0) kz = 8; | ||
636 | + else if (x >= 35.0) kz = 10; | ||
637 | + else kz = 11; | ||
638 | + for (j=0;j<2;j++) { | ||
639 | + vv = 4.0*(j+v0)*(j+v0); | ||
640 | + px = 1.0; | ||
641 | + rp = 1.0; | ||
642 | + for (k=1;k<=kz;k++) { | ||
643 | + rp *= (-0.78125e-2)*(vv-pow(4.0*k-3.0,2.0))* | ||
644 | + (vv-pow(4.0*k-1.0,2.0))/(k*(2.0*k-1.0)*x2); | ||
645 | + px += rp; | ||
646 | + } | ||
647 | + qx = 1.0; | ||
648 | + rq = 1.0; | ||
649 | + for (k=1;k<=kz;k++) { | ||
650 | + rq *= (-0.78125e-2)*(vv-pow(4.0*k-1.0,2.0))* | ||
651 | + (vv-pow(4.0*k+1.0,2.0))/(k*(2.0*k+1.0)*x2); | ||
652 | + qx += rq; | ||
653 | + } | ||
654 | + qx *= 0.125*(vv-1.0)/x; | ||
655 | + xk = x-(0.5*(j+v0)+0.25)*M_PI; | ||
656 | + a0 = sqrt(M_2_PI/x); | ||
657 | + ck = cos(xk); | ||
658 | + sk = sin(xk); | ||
659 | + | ||
660 | + if (j == 0) { | ||
661 | + bjv0 = a0*(px*ck-qx*sk); | ||
662 | + byv0 = a0*(px*sk+qx*ck); | ||
663 | + } | ||
664 | + else if (j == 1) { | ||
665 | + bjv1 = a0*(px*ck-qx*sk); | ||
666 | + byv1 = a0*(px*sk+qx*ck); | ||
667 | + } | ||
668 | + } | ||
669 | + } | ||
670 | + jv[0] = bjv0; | ||
671 | + jv[1] = bjv1; | ||
672 | + djv[0] = v0*jv[0]/x-jv[1]; | ||
673 | + djv[1] = -(1.0+v0)*jv[1]/x+jv[0]; | ||
674 | + if ((n >= 2) && (n <= (int)(0.9*x))) { | ||
675 | + f0 = bjv0; | ||
676 | + f1 = bjv1; | ||
677 | + for (k=2;k<=n;k++) { | ||
678 | + f = 2.0*(k+v0-1.0)*f1/x-f0; | ||
679 | + jv[k] = f; | ||
680 | + f0 = f1; | ||
681 | + f1 = f; | ||
682 | + } | ||
683 | + } | ||
684 | + else if (n >= 2) { | ||
685 | + m = msta1(x,200); | ||
686 | + if (m < n) n = m; | ||
687 | + else m = msta2(x,n,15); | ||
688 | + f2 = 0.0; | ||
689 | + f1 = 1.0e-100; | ||
690 | + for (k=m;k>=0;k--) { | ||
691 | + f = 2.0*(v0+k+1.0)*f1/x-f2; | ||
692 | + if (k <= n) jv[k] = f; | ||
693 | + f2 = f1; | ||
694 | + f1 = f; | ||
695 | + } | ||
696 | + if (fabs(bjv0) > fabs(bjv1)) cs = bjv0/f; | ||
697 | + else cs = bjv1/f2; | ||
698 | + for (k=0;k<=n;k++) { | ||
699 | + jv[k] *= cs; | ||
700 | + } | ||
701 | + } | ||
702 | + for (k=2;k<=n;k++) { | ||
703 | + djv[k] = -(k+v0)*jv[k]/x+jv[k-1]; | ||
704 | + } | ||
705 | + if (x <= 12.0) { | ||
706 | + if (v0 != 0.0) { | ||
707 | + for (l=0;l<2;l++) { | ||
708 | + vl = v0 +l; | ||
709 | + bjvl = 1.0; | ||
710 | + r = 1.0; | ||
711 | + for (k=1;k<=40;k++) { | ||
712 | + r *= -0.25*x2/(k*(k-vl)); | ||
713 | + bjvl += r; | ||
714 | + if (fabs(r) < fabs(bjvl)*1e-15) break; | ||
715 | + } | ||
716 | + vg = 1.0-vl; | ||
717 | + b = pow(2.0/x,vl)/gamma(vg); | ||
718 | + if (l == 0) bju0 = bjvl*b; | ||
719 | + else bju1 = bjvl*b; | ||
720 | + } | ||
721 | + pv0 = M_PI*v0; | ||
722 | + pv1 = M_PI*(1.0+v0); | ||
723 | + byv0 = (bjv0*cos(pv0)-bju0)/sin(pv0); | ||
724 | + byv1 = (bjv1*cos(pv1)-bju1)/sin(pv1); | ||
725 | + } | ||
726 | + else { | ||
727 | + ec = log(0.5*x)+el; | ||
728 | + cs0 = 0.0; | ||
729 | + w0 = 0.0; | ||
730 | + r0 = 1.0; | ||
731 | + for (k=1;k<=30;k++) { | ||
732 | + w0 += 1.0/k; | ||
733 | + r0 *= -0.25*x2/(k*k); | ||
734 | + cs0 += r0*w0; | ||
735 | + } | ||
736 | + byv0 = M_2_PI*(ec*bjv0-cs0); | ||
737 | + cs1 = 1.0; | ||
738 | + w1 = 0.0; | ||
739 | + r1 = 1.0; | ||
740 | + for (k=1;k<=30;k++) { | ||
741 | + w1 += 1.0/k; | ||
742 | + r1 *= -0.25*x2/(k*(k+1)); | ||
743 | + cs1 += r1*(2.0*w1+1.0/(k+1.0)); | ||
744 | + } | ||
745 | + byv1 = M_2_PI*(ec*bjv1-1.0/x-0.25*x*cs1); | ||
746 | + } | ||
747 | + } | ||
748 | + yv[0] = byv0; | ||
749 | + yv[1] = byv1; | ||
750 | + for (k=2;k<=n;k++) { | ||
751 | + byvk = 2.0*(v0+k-1.0)*byv1/x-byv0; | ||
752 | + yv[k] = byvk; | ||
753 | + byv0 = byv1; | ||
754 | + byv1 = byvk; | ||
755 | + } | ||
756 | + dyv[0] = v0*yv[0]/x-yv[1]; | ||
757 | + for (k=1;k<=n;k++) { | ||
758 | + dyv[k] = -(k+v0)*yv[k]/x+yv[k-1]; | ||
759 | + } | ||
760 | + vm = n + v0; | ||
761 | + return 0; | ||
762 | +} | ||
763 | + | ||
764 | +template<typename P> | ||
765 | +int bessjyv_sph(int v, P z, P &vm, P* cjv, | ||
766 | + P* cyv, P* cjvp, P* cyvp) | ||
767 | +{ | ||
768 | + //first, compute the bessel functions of fractional order | ||
769 | + bessjyv(v + 0.5, z, vm, cjv, cyv, cjvp, cyvp); | ||
770 | + | ||
771 | + //iterate through each and scale | ||
772 | + for(int n = 0; n<=v; n++) | ||
773 | + { | ||
774 | + | ||
775 | + cjv[n] = cjv[n] * sqrt(PI/(z * 2.0)); | ||
776 | + cyv[n] = cyv[n] * sqrt(PI/(z * 2.0)); | ||
777 | + | ||
778 | + cjvp[n] = -1.0 / (z * 2.0) * cjv[n] + cjvp[n] * sqrt(PI / (z * 2.0)); | ||
779 | + cyvp[n] = -1.0 / (z * 2.0) * cyv[n] + cyvp[n] * sqrt(PI / (z * 2.0)); | ||
780 | + } | ||
781 | + | ||
782 | + return 0; | ||
783 | + | ||
784 | +} | ||
785 | + | ||
786 | +template<typename P> | ||
787 | +int cbessjy01(complex<P> z,complex<P> &cj0,complex<P> &cj1, | ||
788 | + complex<P> &cy0,complex<P> &cy1,complex<P> &cj0p, | ||
789 | + complex<P> &cj1p,complex<P> &cy0p,complex<P> &cy1p) | ||
790 | +{ | ||
791 | + complex<P> z1,z2,cr,cp,cs,cp0,cq0,cp1,cq1,ct1,ct2,cu; | ||
792 | + P a0,w0,w1; | ||
793 | + int k,kz; | ||
794 | + | ||
795 | + static P a[] = { | ||
796 | + -7.03125e-2, | ||
797 | + 0.112152099609375, | ||
798 | + -0.5725014209747314, | ||
799 | + 6.074042001273483, | ||
800 | + -1.100171402692467e2, | ||
801 | + 3.038090510922384e3, | ||
802 | + -1.188384262567832e5, | ||
803 | + 6.252951493434797e6, | ||
804 | + -4.259392165047669e8, | ||
805 | + 3.646840080706556e10, | ||
806 | + -3.833534661393944e12, | ||
807 | + 4.854014686852901e14, | ||
808 | + -7.286857349377656e16, | ||
809 | + 1.279721941975975e19}; | ||
810 | + static P b[] = { | ||
811 | + 7.32421875e-2, | ||
812 | + -0.2271080017089844, | ||
813 | + 1.727727502584457, | ||
814 | + -2.438052969955606e1, | ||
815 | + 5.513358961220206e2, | ||
816 | + -1.825775547429318e4, | ||
817 | + 8.328593040162893e5, | ||
818 | + -5.006958953198893e7, | ||
819 | + 3.836255180230433e9, | ||
820 | + -3.649010818849833e11, | ||
821 | + 4.218971570284096e13, | ||
822 | + -5.827244631566907e15, | ||
823 | + 9.476288099260110e17, | ||
824 | + -1.792162323051699e20}; | ||
825 | + static P a1[] = { | ||
826 | + 0.1171875, | ||
827 | + -0.1441955566406250, | ||
828 | + 0.6765925884246826, | ||
829 | + -6.883914268109947, | ||
830 | + 1.215978918765359e2, | ||
831 | + -3.302272294480852e3, | ||
832 | + 1.276412726461746e5, | ||
833 | + -6.656367718817688e6, | ||
834 | + 4.502786003050393e8, | ||
835 | + -3.833857520742790e10, | ||
836 | + 4.011838599133198e12, | ||
837 | + -5.060568503314727e14, | ||
838 | + 7.572616461117958e16, | ||
839 | + -1.326257285320556e19}; | ||
840 | + static P b1[] = { | ||
841 | + -0.1025390625, | ||
842 | + 0.2775764465332031, | ||
843 | + -1.993531733751297, | ||
844 | + 2.724882731126854e1, | ||
845 | + -6.038440767050702e2, | ||
846 | + 1.971837591223663e4, | ||
847 | + -8.902978767070678e5, | ||
848 | + 5.310411010968522e7, | ||
849 | + -4.043620325107754e9, | ||
850 | + 3.827011346598605e11, | ||
851 | + -4.406481417852278e13, | ||
852 | + 6.065091351222699e15, | ||
853 | + -9.833883876590679e17, | ||
854 | + 1.855045211579828e20}; | ||
855 | + | ||
856 | + a0 = abs(z); | ||
857 | + z2 = z*z; | ||
858 | + z1 = z; | ||
859 | + if (a0 == 0.0) { | ||
860 | + cj0 = cone; | ||
861 | + cj1 = czero; | ||
862 | + cy0 = complex<P>(-1e308,0); | ||
863 | + cy1 = complex<P>(-1e308,0); | ||
864 | + cj0p = czero; | ||
865 | + cj1p = complex<P>(0.5,0.0); | ||
866 | + cy0p = complex<P>(1e308,0); | ||
867 | + cy1p = complex<P>(1e308,0); | ||
868 | + return 0; | ||
869 | + } | ||
870 | + if (real(z) < 0.0) z1 = -z; | ||
871 | + if (a0 <= 12.0) { | ||
872 | + cj0 = cone; | ||
873 | + cr = cone; | ||
874 | + for (k=1;k<=40;k++) { | ||
875 | + cr *= -0.25*z2/(P)(k*k); | ||
876 | + cj0 += cr; | ||
877 | + if (abs(cr) < abs(cj0)*eps) break; | ||
878 | + } | ||
879 | + cj1 = cone; | ||
880 | + cr = cone; | ||
881 | + for (k=1;k<=40;k++) { | ||
882 | + cr *= -0.25*z2/(k*(k+1.0)); | ||
883 | + cj1 += cr; | ||
884 | + if (abs(cr) < abs(cj1)*eps) break; | ||
885 | + } | ||
886 | + cj1 *= 0.5*z1; | ||
887 | + w0 = 0.0; | ||
888 | + cr = cone; | ||
889 | + cs = czero; | ||
890 | + for (k=1;k<=40;k++) { | ||
891 | + w0 += 1.0/k; | ||
892 | + cr *= -0.25*z2/(P)(k*k); | ||
893 | + cp = cr*w0; | ||
894 | + cs += cp; | ||
895 | + if (abs(cp) < abs(cs)*eps) break; | ||
896 | + } | ||
897 | + cy0 = M_2_PI*((log(0.5*z1)+el)*cj0-cs); | ||
898 | + w1 = 0.0; | ||
899 | + cr = cone; | ||
900 | + cs = cone; | ||
901 | + for (k=1;k<=40;k++) { | ||
902 | + w1 += 1.0/k; | ||
903 | + cr *= -0.25*z2/(k*(k+1.0)); | ||
904 | + cp = cr*(2.0*w1+1.0/(k+1.0)); | ||
905 | + cs += cp; | ||
906 | + if (abs(cp) < abs(cs)*eps) break; | ||
907 | + } | ||
908 | + cy1 = M_2_PI*((log(0.5*z1)+el)*cj1-1.0/z1-0.25*z1*cs); | ||
909 | + } | ||
910 | + else { | ||
911 | + if (a0 >= 50.0) kz = 8; // can be changed to 10 | ||
912 | + else if (a0 >= 35.0) kz = 10; // " " " 12 | ||
913 | + else kz = 12; // " " " 14 | ||
914 | + ct1 = z1 - M_PI_4; | ||
915 | + cp0 = cone; | ||
916 | + for (k=0;k<kz;k++) { | ||
917 | + cp0 += a[k]*pow(z1,-2.0*k-2.0); | ||
918 | + } | ||
919 | + cq0 = -0.125/z1; | ||
920 | + for (k=0;k<kz;k++) { | ||
921 | + cq0 += b[k]*pow(z1,-2.0*k-3.0); | ||
922 | + } | ||
923 | + cu = sqrt(M_2_PI/z1); | ||
924 | + cj0 = cu*(cp0*cos(ct1)-cq0*sin(ct1)); | ||
925 | + cy0 = cu*(cp0*sin(ct1)+cq0*cos(ct1)); | ||
926 | + ct2 = z1 - 0.75*M_PI; | ||
927 | + cp1 = cone; | ||
928 | + for (k=0;k<kz;k++) { | ||
929 | + cp1 += a1[k]*pow(z1,-2.0*k-2.0); | ||
930 | + } | ||
931 | + cq1 = 0.375/z1; | ||
932 | + for (k=0;k<kz;k++) { | ||
933 | + cq1 += b1[k]*pow(z1,-2.0*k-3.0); | ||
934 | + } | ||
935 | + cj1 = cu*(cp1*cos(ct2)-cq1*sin(ct2)); | ||
936 | + cy1 = cu*(cp1*sin(ct2)+cq1*cos(ct2)); | ||
937 | + } | ||
938 | + if (real(z) < 0.0) { | ||
939 | + if (imag(z) < 0.0) { | ||
940 | + cy0 -= 2.0*cii*cj0; | ||
941 | + cy1 = -(cy1-2.0*cii*cj1); | ||
942 | + } | ||
943 | + else if (imag(z) > 0.0) { | ||
944 | + cy0 += 2.0*cii*cj0; | ||
945 | + cy1 = -(cy1+2.0*cii*cj1); | ||
946 | + } | ||
947 | + cj1 = -cj1; | ||
948 | + } | ||
949 | + cj0p = -cj1; | ||
950 | + cj1p = cj0-cj1/z; | ||
951 | + cy0p = -cy1; | ||
952 | + cy1p = cy0-cy1/z; | ||
953 | + return 0; | ||
954 | +} | ||
955 | + | ||
956 | +template<typename P> | ||
957 | +int cbessjyna(int n,complex<P> z,int &nm,complex<P> *cj, | ||
958 | + complex<P> *cy,complex<P> *cjp,complex<P> *cyp) | ||
959 | +{ | ||
960 | + complex<P> cbj0,cbj1,cby0,cby1,cj0,cjk,cj1,cf,cf1,cf2; | ||
961 | + complex<P> cs,cg0,cg1,cyk,cyl1,cyl2,cylk,cp11,cp12,cp21,cp22; | ||
962 | + complex<P> ch0,ch1,ch2; | ||
963 | + P a0,yak,ya1,ya0,wa; | ||
964 | + int m,k,lb,lb0; | ||
965 | + | ||
966 | + if (n < 0) return 1; | ||
967 | + a0 = abs(z); | ||
968 | + nm = n; | ||
969 | + if (a0 < 1.0e-100) { | ||
970 | + for (k=0;k<=n;k++) { | ||
971 | + cj[k] = czero; | ||
972 | + cy[k] = complex<P> (-1e308,0); | ||
973 | + cjp[k] = czero; | ||
974 | + cyp[k] = complex<P>(1e308,0); | ||
975 | + } | ||
976 | + cj[0] = cone; | ||
977 | + cjp[1] = complex<P>(0.5,0.0); | ||
978 | + return 0; | ||
979 | + } | ||
980 | + cbessjy01(z,cj[0],cj[1],cy[0],cy[1],cjp[0],cjp[1],cyp[0],cyp[1]); | ||
981 | + cbj0 = cj[0]; | ||
982 | + cbj1 = cj[1]; | ||
983 | + cby0 = cy[0]; | ||
984 | + cby1 = cy[1]; | ||
985 | + if (n <= 1) return 0; | ||
986 | + if (n < (int)0.25*a0) { | ||
987 | + cj0 = cbj0; | ||
988 | + cj1 = cbj1; | ||
989 | + for (k=2;k<=n;k++) { | ||
990 | + cjk = 2.0*(k-1.0)*cj1/z-cj0; | ||
991 | + cj[k] = cjk; | ||
992 | + cj0 = cj1; | ||
993 | + cj1 = cjk; | ||
994 | + } | ||
995 | + } | ||
996 | + else { | ||
997 | + m = msta1(a0,200); | ||
998 | + if (m < n) nm = m; | ||
999 | + else m = msta2(a0,n,15); | ||
1000 | + cf2 = czero; | ||
1001 | + cf1 = complex<P> (1.0e-100,0.0); | ||
1002 | + for (k=m;k>=0;k--) { | ||
1003 | + cf = 2.0*(k+1.0)*cf1/z-cf2; | ||
1004 | + if (k <=nm) cj[k] = cf; | ||
1005 | + cf2 = cf1; | ||
1006 | + cf1 = cf; | ||
1007 | + } | ||
1008 | + if (abs(cbj0) > abs(cbj1)) cs = cbj0/cf; | ||
1009 | + else cs = cbj1/cf2; | ||
1010 | + for (k=0;k<=nm;k++) { | ||
1011 | + cj[k] *= cs; | ||
1012 | + } | ||
1013 | + } | ||
1014 | + for (k=2;k<=nm;k++) { | ||
1015 | + cjp[k] = cj[k-1]-(P)k*cj[k]/z; | ||
1016 | + } | ||
1017 | + ya0 = abs(cby0); | ||
1018 | + lb = 0; | ||
1019 | + cg0 = cby0; | ||
1020 | + cg1 = cby1; | ||
1021 | + for (k=2;k<=nm;k++) { | ||
1022 | + cyk = 2.0*(k-1.0)*cg1/z-cg0; | ||
1023 | + yak = abs(cyk); | ||
1024 | + ya1 = abs(cg0); | ||
1025 | + if ((yak < ya0) && (yak < ya1)) lb = k; | ||
1026 | + cy[k] = cyk; | ||
1027 | + cg0 = cg1; | ||
1028 | + cg1 = cyk; | ||
1029 | + } | ||
1030 | + lb0 = 0; | ||
1031 | + if ((lb > 4) && (imag(z) != 0.0)) { | ||
1032 | + while (lb != lb0) { | ||
1033 | + ch2 = cone; | ||
1034 | + ch1 = czero; | ||
1035 | + lb0 = lb; | ||
1036 | + for (k=lb;k>=1;k--) { | ||
1037 | + ch0 = 2.0*k*ch1/z-ch2; | ||
1038 | + ch2 = ch1; | ||
1039 | + ch1 = ch0; | ||
1040 | + } | ||
1041 | + cp12 = ch0; | ||
1042 | + cp22 = ch2; | ||
1043 | + ch2 = czero; | ||
1044 | + ch1 = cone; | ||
1045 | + for (k=lb;k>=1;k--) { | ||
1046 | + ch0 = 2.0*k*ch1/z-ch2; | ||
1047 | + ch2 = ch1; | ||
1048 | + ch1 = ch0; | ||
1049 | + } | ||
1050 | + cp11 = ch0; | ||
1051 | + cp21 = ch2; | ||
1052 | + if (lb == nm) | ||
1053 | + cj[lb+1] = 2.0*lb*cj[lb]/z-cj[lb-1]; | ||
1054 | + if (abs(cj[0]) > abs(cj[1])) { | ||
1055 | + cy[lb+1] = (cj[lb+1]*cby0-2.0*cp11/(M_PI*z))/cj[0]; | ||
1056 | + cy[lb] = (cj[lb]*cby0+2.0*cp12/(M_PI*z))/cj[0]; | ||
1057 | + } | ||
1058 | + else { | ||
1059 | + cy[lb+1] = (cj[lb+1]*cby1-2.0*cp21/(M_PI*z))/cj[1]; | ||
1060 | + cy[lb] = (cj[lb]*cby1+2.0*cp22/(M_PI*z))/cj[1]; | ||
1061 | + } | ||
1062 | + cyl2 = cy[lb+1]; | ||
1063 | + cyl1 = cy[lb]; | ||
1064 | + for (k=lb-1;k>=0;k--) { | ||
1065 | + cylk = 2.0*(k+1.0)*cyl1/z-cyl2; | ||
1066 | + cy[k] = cylk; | ||
1067 | + cyl2 = cyl1; | ||
1068 | + cyl1 = cylk; | ||
1069 | + } | ||
1070 | + cyl1 = cy[lb]; | ||
1071 | + cyl2 = cy[lb+1]; | ||
1072 | + for (k=lb+1;k<n;k++) { | ||
1073 | + cylk = 2.0*k*cyl2/z-cyl1; | ||
1074 | + cy[k+1] = cylk; | ||
1075 | + cyl1 = cyl2; | ||
1076 | + cyl2 = cylk; | ||
1077 | + } | ||
1078 | + for (k=2;k<=nm;k++) { | ||
1079 | + wa = abs(cy[k]); | ||
1080 | + if (wa < abs(cy[k-1])) lb = k; | ||
1081 | + } | ||
1082 | + } | ||
1083 | + } | ||
1084 | + for (k=2;k<=nm;k++) { | ||
1085 | + cyp[k] = cy[k-1]-(P)k*cy[k]/z; | ||
1086 | + } | ||
1087 | + return 0; | ||
1088 | +} | ||
1089 | + | ||
1090 | +template<typename P> | ||
1091 | +int cbessjynb(int n,complex<P> z,int &nm,complex<P> *cj, | ||
1092 | + complex<P> *cy,complex<P> *cjp,complex<P> *cyp) | ||
1093 | +{ | ||
1094 | + complex<P> cf,cf0,cf1,cf2,cbs,csu,csv,cs0,ce; | ||
1095 | + complex<P> ct1,cp0,cq0,cp1,cq1,cu,cbj0,cby0,cbj1,cby1; | ||
1096 | + complex<P> cyy,cbjk,ct2; | ||
1097 | + P a0,y0; | ||
1098 | + int k,m; | ||
1099 | + static P a[] = { | ||
1100 | + -0.7031250000000000e-1, | ||
1101 | + 0.1121520996093750, | ||
1102 | + -0.5725014209747314, | ||
1103 | + 6.074042001273483}; | ||
1104 | + static P b[] = { | ||
1105 | + 0.7324218750000000e-1, | ||
1106 | + -0.2271080017089844, | ||
1107 | + 1.727727502584457, | ||
1108 | + -2.438052969955606e1}; | ||
1109 | + static P a1[] = { | ||
1110 | + 0.1171875, | ||
1111 | + -0.1441955566406250, | ||
1112 | + 0.6765925884246826, | ||
1113 | + -6.883914268109947}; | ||
1114 | + static P b1[] = { | ||
1115 | + -0.1025390625, | ||
1116 | + 0.2775764465332031, | ||
1117 | + -1.993531733751297, | ||
1118 | + 2.724882731126854e1}; | ||
1119 | + | ||
1120 | + y0 = abs(imag(z)); | ||
1121 | + a0 = abs(z); | ||
1122 | + nm = n; | ||
1123 | + if (a0 < 1.0e-100) { | ||
1124 | + for (k=0;k<=n;k++) { | ||
1125 | + cj[k] = czero; | ||
1126 | + cy[k] = complex<P> (-1e308,0); | ||
1127 | + cjp[k] = czero; | ||
1128 | + cyp[k] = complex<P>(1e308,0); | ||
1129 | + } | ||
1130 | + cj[0] = cone; | ||
1131 | + cjp[1] = complex<P>(0.5,0.0); | ||
1132 | + return 0; | ||
1133 | + } | ||
1134 | + if ((a0 <= 300.0) || (n > (int)(0.25*a0))) { | ||
1135 | + if (n == 0) nm = 1; | ||
1136 | + m = msta1(a0,200); | ||
1137 | + if (m < nm) nm = m; | ||
1138 | + else m = msta2(a0,nm,15); | ||
1139 | + cbs = czero; | ||
1140 | + csu = czero; | ||
1141 | + csv = czero; | ||
1142 | + cf2 = czero; | ||
1143 | + cf1 = complex<P> (1.0e-100,0.0); | ||
1144 | + for (k=m;k>=0;k--) { | ||
1145 | + cf = 2.0*(k+1.0)*cf1/z-cf2; | ||
1146 | + if (k <= nm) cj[k] = cf; | ||
1147 | + if (((k & 1) == 0) && (k != 0)) { | ||
1148 | + if (y0 <= 1.0) { | ||
1149 | + cbs += 2.0*cf; | ||
1150 | + } | ||
1151 | + else { | ||
1152 | + cbs += (-1)*((k & 2)-1)*2.0*cf; | ||
1153 | + } | ||
1154 | + csu += (P)((-1)*((k & 2)-1))*cf/(P)k; | ||
1155 | + } | ||
1156 | + else if (k > 1) { | ||
1157 | + csv += (P)((-1)*((k & 2)-1)*k)*cf/(P)(k*k-1.0); | ||
1158 | + } | ||
1159 | + cf2 = cf1; | ||
1160 | + cf1 = cf; | ||
1161 | + } | ||
1162 | + if (y0 <= 1.0) cs0 = cbs+cf; | ||
1163 | + else cs0 = (cbs+cf)/cos(z); | ||
1164 | + for (k=0;k<=nm;k++) { | ||
1165 | + cj[k] /= cs0; | ||
1166 | + } | ||
1167 | + ce = log(0.5*z)+el; | ||
1168 | + cy[0] = M_2_PI*(ce*cj[0]-4.0*csu/cs0); | ||
1169 | + cy[1] = M_2_PI*(-cj[0]/z+(ce-1.0)*cj[1]-4.0*csv/cs0); | ||
1170 | + } | ||
1171 | + else { | ||
1172 | + ct1 = z-M_PI_4; | ||
1173 | + cp0 = cone; | ||
1174 | + for (k=0;k<4;k++) { | ||
1175 | + cp0 += a[k]*pow(z,-2.0*k-2.0); | ||
1176 | + } | ||
1177 | + cq0 = -0.125/z; | ||
1178 | + for (k=0;k<4;k++) { | ||
1179 | + cq0 += b[k] *pow(z,-2.0*k-3.0); | ||
1180 | + } | ||
1181 | + cu = sqrt(M_2_PI/z); | ||
1182 | + cbj0 = cu*(cp0*cos(ct1)-cq0*sin(ct1)); | ||
1183 | + cby0 = cu*(cp0*sin(ct1)+cq0*cos(ct1)); | ||
1184 | + cj[0] = cbj0; | ||
1185 | + cy[0] = cby0; | ||
1186 | + ct2 = z-0.75*M_PI; | ||
1187 | + cp1 = cone; | ||
1188 | + for (k=0;k<4;k++) { | ||
1189 | + cp1 += a1[k]*pow(z,-2.0*k-2.0); | ||
1190 | + } | ||
1191 | + cq1 = 0.375/z; | ||
1192 | + for (k=0;k<4;k++) { | ||
1193 | + cq1 += b1[k]*pow(z,-2.0*k-3.0); | ||
1194 | + } | ||
1195 | + cbj1 = cu*(cp1*cos(ct2)-cq1*sin(ct2)); | ||
1196 | + cby1 = cu*(cp1*sin(ct2)+cq1*cos(ct2)); | ||
1197 | + cj[1] = cbj1; | ||
1198 | + cy[1] = cby1; | ||
1199 | + for (k=2;k<=n;k++) { | ||
1200 | + cbjk = 2.0*(k-1.0)*cbj1/z-cbj0; | ||
1201 | + cj[k] = cbjk; | ||
1202 | + cbj0 = cbj1; | ||
1203 | + cbj1 = cbjk; | ||
1204 | + } | ||
1205 | + } | ||
1206 | + cjp[0] = -cj[1]; | ||
1207 | + for (k=1;k<=nm;k++) { | ||
1208 | + cjp[k] = cj[k-1]-(P)k*cj[k]/z; | ||
1209 | + } | ||
1210 | + if (abs(cj[0]) > 1.0) | ||
1211 | + cy[1] = (cj[1]*cy[0]-2.0/(M_PI*z))/cj[0]; | ||
1212 | + for (k=2;k<=nm;k++) { | ||
1213 | + if (abs(cj[k-1]) >= abs(cj[k-2])) | ||
1214 | + cyy = (cj[k]*cy[k-1]-2.0/(M_PI*z))/cj[k-1]; | ||
1215 | + else | ||
1216 | + cyy = (cj[k]*cy[k-2]-4.0*(k-1.0)/(M_PI*z*z))/cj[k-2]; | ||
1217 | + cy[k] = cyy; | ||
1218 | + } | ||
1219 | + cyp[0] = -cy[1]; | ||
1220 | + for (k=1;k<=nm;k++) { | ||
1221 | + cyp[k] = cy[k-1]-(P)k*cy[k]/z; | ||
1222 | + } | ||
1223 | + | ||
1224 | + return 0; | ||
1225 | +} | ||
1226 | + | ||
1227 | +template<typename P> | ||
1228 | +int cbessjyva(P v,complex<P> z,P &vm,complex<P>*cjv, | ||
1229 | + complex<P>*cyv,complex<P>*cjvp,complex<P>*cyvp) | ||
1230 | +{ | ||
1231 | + complex<P> z1,z2,zk,cjvl,cr,ca,cjv0,cjv1,cpz,crp; | ||
1232 | + complex<P> cqz,crq,ca0,cck,csk,cyv0,cyv1,cju0,cju1,cb; | ||
1233 | + complex<P> cs,cs0,cr0,cs1,cr1,cec,cf,cf0,cf1,cf2; | ||
1234 | + complex<P> cfac0,cfac1,cg0,cg1,cyk,cp11,cp12,cp21,cp22; | ||
1235 | + complex<P> ch0,ch1,ch2,cyl1,cyl2,cylk; | ||
1236 | + | ||
1237 | + P a0,v0,pv0,pv1,vl,ga,gb,vg,vv,w0,w1,ya0,yak,ya1,wa; | ||
1238 | + int j,n,k,kz,l,lb,lb0,m; | ||
1239 | + | ||
1240 | + a0 = abs(z); | ||
1241 | + z1 = z; | ||
1242 | + z2 = z*z; | ||
1243 | + n = (int)v; | ||
1244 | + | ||
1245 | + | ||
1246 | + v0 = v-n; | ||
1247 | + | ||
1248 | + pv0 = M_PI*v0; | ||
1249 | + pv1 = M_PI*(1.0+v0); | ||
1250 | + if (a0 < 1.0e-100) { | ||
1251 | + for (k=0;k<=n;k++) { | ||
1252 | + cjv[k] = czero; | ||
1253 | + cyv[k] = complex<P> (-1e308,0); | ||
1254 | + cjvp[k] = czero; | ||
1255 | + cyvp[k] = complex<P> (1e308,0); | ||
1256 | + | ||
1257 | + } | ||
1258 | + if (v0 == 0.0) { | ||
1259 | + cjv[0] = cone; | ||
1260 | + cjvp[1] = complex<P> (0.5,0.0); | ||
1261 | + } | ||
1262 | + else { | ||
1263 | + cjvp[0] = complex<P> (1e308,0); | ||
1264 | + } | ||
1265 | + vm = v; | ||
1266 | + return 0; | ||
1267 | + } | ||
1268 | + if (real(z1) < 0.0) z1 = -z; | ||
1269 | + if (a0 <= 12.0) { | ||
1270 | + for (l=0;l<2;l++) { | ||
1271 | + vl = v0+l; | ||
1272 | + cjvl = cone; | ||
1273 | + cr = cone; | ||
1274 | + for (k=1;k<=40;k++) { | ||
1275 | + cr *= -0.25*z2/(k*(k+vl)); | ||
1276 | + cjvl += cr; | ||
1277 | + if (abs(cr) < abs(cjvl)*eps) break; | ||
1278 | + } | ||
1279 | + vg = 1.0 + vl; | ||
1280 | + ga = gamma(vg); | ||
1281 | + ca = pow(0.5*z1,vl)/ga; | ||
1282 | + if (l == 0) cjv0 = cjvl*ca; | ||
1283 | + else cjv1 = cjvl*ca; | ||
1284 | + } | ||
1285 | + } | ||
1286 | + else { | ||
1287 | + if (a0 >= 50.0) kz = 8; | ||
1288 | + else if (a0 >= 35.0) kz = 10; | ||
1289 | + else kz = 11; | ||
1290 | + for (j=0;j<2;j++) { | ||
1291 | + vv = 4.0*(j+v0)*(j+v0); | ||
1292 | + cpz = cone; | ||
1293 | + crp = cone; | ||
1294 | + for (k=1;k<=kz;k++) { | ||
1295 | + crp = -0.78125e-2*crp*(vv-pow(4.0*k-3.0,2.0))* | ||
1296 | + (vv-pow(4.0*k-1.0,2.0))/(k*(2.0*k-1.0)*z2); | ||
1297 | + cpz += crp; | ||
1298 | + } | ||
1299 | + cqz = cone; | ||
1300 | + crq = cone; | ||
1301 | + for (k=1;k<=kz;k++) { | ||
1302 | + crq = -0.78125e-2*crq*(vv-pow(4.0*k-1.0,2.0))* | ||
1303 | + (vv-pow(4.0*k+1.0,2.0))/(k*(2.0*k+1.0)*z2); | ||
1304 | + cqz += crq; | ||
1305 | + } | ||
1306 | + cqz *= 0.125*(vv-1.0)/z1; | ||
1307 | + zk = z1-(0.5*(j+v0)+0.25)*M_PI; | ||
1308 | + ca0 = sqrt(M_2_PI/z1); | ||
1309 | + cck = cos(zk); | ||
1310 | + csk = sin(zk); | ||
1311 | + if (j == 0) { | ||
1312 | + cjv0 = ca0*(cpz*cck-cqz*csk); | ||
1313 | + cyv0 = ca0*(cpz*csk+cqz+cck); | ||
1314 | + } | ||
1315 | + else { | ||
1316 | + cjv1 = ca0*(cpz*cck-cqz*csk); | ||
1317 | + cyv1 = ca0*(cpz*csk+cqz*cck); | ||
1318 | + } | ||
1319 | + } | ||
1320 | + } | ||
1321 | + if (a0 <= 12.0) { | ||
1322 | + if (v0 != 0.0) { | ||
1323 | + for (l=0;l<2;l++) { | ||
1324 | + vl = v0+l; | ||
1325 | + cjvl = cone; | ||
1326 | + cr = cone; | ||
1327 | + for (k=1;k<=40;k++) { | ||
1328 | + cr *= -0.25*z2/(k*(k-vl)); | ||
1329 | + cjvl += cr; | ||
1330 | + if (abs(cr) < abs(cjvl)*eps) break; | ||
1331 | + } | ||
1332 | + vg = 1.0-vl; | ||
1333 | + gb = gamma(vg); | ||
1334 | + cb = pow(2.0/z1,vl)/gb; | ||
1335 | + if (l == 0) cju0 = cjvl*cb; | ||
1336 | + else cju1 = cjvl*cb; | ||
1337 | + } | ||
1338 | + cyv0 = (cjv0*cos(pv0)-cju0)/sin(pv0); | ||
1339 | + cyv1 = (cjv1*cos(pv1)-cju1)/sin(pv1); | ||
1340 | + } | ||
1341 | + else { | ||
1342 | + cec = log(0.5*z1)+el; | ||
1343 | + cs0 = czero; | ||
1344 | + w0 = 0.0; | ||
1345 | + cr0 = cone; | ||
1346 | + for (k=1;k<=30;k++) { | ||
1347 | + w0 += 1.0/k; | ||
1348 | + cr0 *= -0.25*z2/(P)(k*k); | ||
1349 | + cs0 += cr0*w0; | ||
1350 | + } | ||
1351 | + cyv0 = M_2_PI*(cec*cjv0-cs0); | ||
1352 | + cs1 = cone; | ||
1353 | + w1 = 0.0; | ||
1354 | + cr1 = cone; | ||
1355 | + for (k=1;k<=30;k++) { | ||
1356 | + w1 += 1.0/k; | ||
1357 | + cr1 *= -0.25*z2/(k*(k+1.0)); | ||
1358 | + cs1 += cr1*(2.0*w1+1.0/(k+1.0)); | ||
1359 | + } | ||
1360 | + cyv1 = M_2_PI*(cec*cjv1-1.0/z1-0.25*z1*cs1); | ||
1361 | + } | ||
1362 | + } | ||
1363 | + if (real(z) < 0.0) { | ||
1364 | + cfac0 = exp(pv0*cii); | ||
1365 | + cfac1 = exp(pv1*cii); | ||
1366 | + if (imag(z) < 0.0) { | ||
1367 | + cyv0 = cfac0*cyv0-(P)2.0*(complex<P>)cii*cos(pv0)*cjv0; | ||
1368 | + cyv1 = cfac1*cyv1-(P)2.0*(complex<P>)cii*cos(pv1)*cjv1; | ||
1369 | + cjv0 /= cfac0; | ||
1370 | + cjv1 /= cfac1; | ||
1371 | + } | ||
1372 | + else if (imag(z) > 0.0) { | ||
1373 | + cyv0 = cyv0/cfac0+(P)2.0*(complex<P>)cii*cos(pv0)*cjv0; | ||
1374 | + cyv1 = cyv1/cfac1+(P)2.0*(complex<P>)cii*cos(pv1)*cjv1; | ||
1375 | + cjv0 *= cfac0; | ||
1376 | + cjv1 *= cfac1; | ||
1377 | + } | ||
1378 | + } | ||
1379 | + cjv[0] = cjv0; | ||
1380 | + cjv[1] = cjv1; | ||
1381 | + if ((n >= 2) && (n <= (int)(0.25*a0))) { | ||
1382 | + cf0 = cjv0; | ||
1383 | + cf1 = cjv1; | ||
1384 | + for (k=2;k<= n;k++) { | ||
1385 | + cf = 2.0*(k+v0-1.0)*cf1/z-cf0; | ||
1386 | + cjv[k] = cf; | ||
1387 | + cf0 = cf1; | ||
1388 | + cf1 = cf; | ||
1389 | + } | ||
1390 | + } | ||
1391 | + else if (n >= 2) { | ||
1392 | + m = msta1(a0,200); | ||
1393 | + if (m < n) n = m; | ||
1394 | + else m = msta2(a0,n,15); | ||
1395 | + cf2 = czero; | ||
1396 | + cf1 = complex<P>(1.0e-100,0.0); | ||
1397 | + for (k=m;k>=0;k--) { | ||
1398 | + cf = 2.0*(v0+k+1.0)*cf1/z-cf2; | ||
1399 | + if (k <= n) cjv[k] = cf; | ||
1400 | + cf2 = cf1; | ||
1401 | + cf1 = cf; | ||
1402 | + } | ||
1403 | + if (abs(cjv0) > abs(cjv1)) cs = cjv0/cf; | ||
1404 | + else cs = cjv1/cf2; | ||
1405 | + for (k=0;k<=n;k++) { | ||
1406 | + cjv[k] *= cs; | ||
1407 | + } | ||
1408 | + } | ||
1409 | + cjvp[0] = v0*cjv[0]/z-cjv[1]; | ||
1410 | + for (k=1;k<=n;k++) { | ||
1411 | + cjvp[k] = -(k+v0)*cjv[k]/z+cjv[k-1]; | ||
1412 | + } | ||
1413 | + cyv[0] = cyv0; | ||
1414 | + cyv[1] = cyv1; | ||
1415 | + ya0 = abs(cyv0); | ||
1416 | + lb = 0; | ||
1417 | + cg0 = cyv0; | ||
1418 | + cg1 = cyv1; | ||
1419 | + for (k=2;k<=n;k++) { | ||
1420 | + cyk = 2.0*(v0+k-1.0)*cg1/z-cg0; | ||
1421 | + yak = abs(cyk); | ||
1422 | + ya1 = abs(cg0); | ||
1423 | + if ((yak < ya0) && (yak< ya1)) lb = k; | ||
1424 | + cyv[k] = cyk; | ||
1425 | + cg0 = cg1; | ||
1426 | + cg1 = cyk; | ||
1427 | + } | ||
1428 | + lb0 = 0; | ||
1429 | + if ((lb > 4) && (imag(z) != 0.0)) { | ||
1430 | + while(lb != lb0) { | ||
1431 | + ch2 = cone; | ||
1432 | + ch1 = czero; | ||
1433 | + lb0 = lb; | ||
1434 | + for (k=lb;k>=1;k--) { | ||
1435 | + ch0 = 2.0*(k+v0)*ch1/z-ch2; | ||
1436 | + ch2 = ch1; | ||
1437 | + ch1 = ch0; | ||
1438 | + } | ||
1439 | + cp12 = ch0; | ||
1440 | + cp22 = ch2; | ||
1441 | + ch2 = czero; | ||
1442 | + ch1 = cone; | ||
1443 | + for (k=lb;k>=1;k--) { | ||
1444 | + ch0 = 2.0*(k+v0)*ch1/z-ch2; | ||
1445 | + ch2 = ch1; | ||
1446 | + ch1 = ch0; | ||
1447 | + } | ||
1448 | + cp11 = ch0; | ||
1449 | + cp21 = ch2; | ||
1450 | + if (lb == n) | ||
1451 | + cjv[lb+1] = 2.0*(lb+v0)*cjv[lb]/z-cjv[lb-1]; | ||
1452 | + if (abs(cjv[0]) > abs(cjv[1])) { | ||
1453 | + cyv[lb+1] = (cjv[lb+1]*cyv0-2.0*cp11/(M_PI*z))/cjv[0]; | ||
1454 | + cyv[lb] = (cjv[lb]*cyv0+2.0*cp12/(M_PI*z))/cjv[0]; | ||
1455 | + } | ||
1456 | + else { | ||
1457 | + cyv[lb+1] = (cjv[lb+1]*cyv1-2.0*cp21/(M_PI*z))/cjv[1]; | ||
1458 | + cyv[lb] = (cjv[lb]*cyv1+2.0*cp22/(M_PI*z))/cjv[1]; | ||
1459 | + } | ||
1460 | + cyl2 = cyv[lb+1]; | ||
1461 | + cyl1 = cyv[lb]; | ||
1462 | + for (k=lb-1;k>=0;k--) { | ||
1463 | + cylk = 2.0*(k+v0+1.0)*cyl1/z-cyl2; | ||
1464 | + cyv[k] = cylk; | ||
1465 | + cyl2 = cyl1; | ||
1466 | + cyl1 = cylk; | ||
1467 | + } | ||
1468 | + cyl1 = cyv[lb]; | ||
1469 | + cyl2 = cyv[lb+1]; | ||
1470 | + for (k=lb+1;k<n;k++) { | ||
1471 | + cylk = 2.0*(k+v0)*cyl2/z-cyl1; | ||
1472 | + cyv[k+1] = cylk; | ||
1473 | + cyl1 = cyl2; | ||
1474 | + cyl2 = cylk; | ||
1475 | + } | ||
1476 | + for (k=2;k<=n;k++) { | ||
1477 | + wa = abs(cyv[k]); | ||
1478 | + if (wa < abs(cyv[k-1])) lb = k; | ||
1479 | + } | ||
1480 | + } | ||
1481 | + } | ||
1482 | + cyvp[0] = v0*cyv[0]/z-cyv[1]; | ||
1483 | + for (k=1;k<=n;k++) { | ||
1484 | + cyvp[k] = cyv[k-1]-(k+v0)*cyv[k]/z; | ||
1485 | + } | ||
1486 | + vm = n+v0; | ||
1487 | + return 0; | ||
1488 | +} | ||
1489 | + | ||
1490 | +template<typename P> | ||
1491 | +int cbessjyva_sph(int v,complex<P> z,P &vm,complex<P>*cjv, | ||
1492 | + complex<P>*cyv,complex<P>*cjvp,complex<P>*cyvp) | ||
1493 | +{ | ||
1494 | + //first, compute the bessel functions of fractional order | ||
1495 | + cbessjyva<P>(v + 0.5, z, vm, cjv, cyv, cjvp, cyvp); | ||
1496 | + | ||
1497 | + //iterate through each and scale | ||
1498 | + for(int n = 0; n<=v; n++) | ||
1499 | + { | ||
1500 | + | ||
1501 | + cjv[n] = cjv[n] * sqrt(PI/(z * 2.0)); | ||
1502 | + cyv[n] = cyv[n] * sqrt(PI/(z * 2.0)); | ||
1503 | + | ||
1504 | + cjvp[n] = -1.0 / (z * 2.0) * cjv[n] + cjvp[n] * sqrt(PI / (z * 2.0)); | ||
1505 | + cyvp[n] = -1.0 / (z * 2.0) * cyv[n] + cyvp[n] * sqrt(PI / (z * 2.0)); | ||
1506 | + } | ||
1507 | + | ||
1508 | + return 0; | ||
1509 | + | ||
1510 | +} | ||
1511 | + | ||
1512 | +} //end namespace rts | ||
1513 | + | ||
1514 | + | ||
1515 | +#endif | ||
0 | \ No newline at end of file | 1516 | \ No newline at end of file |
1 | +#ifndef RTS_REALFIELD_H | ||
2 | +#define RTS_REALFIELD_H | ||
3 | + | ||
4 | +#include "../visualization/colormap.h" | ||
5 | +#include "../envi/envi.h" | ||
6 | +#include "../math/quad.h" | ||
7 | +#include "../cuda/devices.h" | ||
8 | +#include "cublas_v2.h" | ||
9 | +#include <cuda_runtime.h> | ||
10 | + | ||
11 | +///Compute a Gaussian function in 3D (mostly for testing) | ||
12 | +/*template<typename T> | ||
13 | +__global__ void gpu_gaussian(T* dest, unsigned int r0, unsigned int r1, T mean, T std, rts::quad<T> shape) | ||
14 | +{ | ||
15 | + int iu = blockIdx.x * blockDim.x + threadIdx.x; | ||
16 | + int iv = blockIdx.y * blockDim.y + threadIdx.y; | ||
17 | + | ||
18 | + //make sure that the thread indices are in-bounds | ||
19 | + if(iu >= r0 || iv >= r1) return; | ||
20 | + | ||
21 | + //compute the index into the field | ||
22 | + int i = iv*r0 + iu; | ||
23 | + | ||
24 | + T u = (T)iu / (T)r0; | ||
25 | + T v = (T)iv / (T)r1; | ||
26 | + | ||
27 | + rts::vec<T> p = shape(u, v); | ||
28 | + | ||
29 | + T fx = (T)1.0 / (std * (T)sqrt(2 * 3.14159f) ) * exp( - pow(p[0] - mean, 2) / (2 * std*std) ); | ||
30 | + T fy = (T)1.0 / (std * (T)sqrt(2 * 3.14159f) ) * exp( - pow(p[1] - mean, 2) / (2 * std*std) ); | ||
31 | + T fz = (T)1.0 / (std * (T)sqrt(2 * 3.14159f) ) * exp( - pow(p[2] - mean, 2) / (2 * std*std) ); | ||
32 | + | ||
33 | + dest[i] = fx * fy * fz; | ||
34 | +}*/ | ||
35 | + | ||
36 | +namespace rts{ | ||
37 | + | ||
38 | +template<typename P, unsigned int N = 1, bool positive = false> | ||
39 | +class realfield{ | ||
40 | + | ||
41 | + P* X[N]; //an array of N gpu pointers for each field component | ||
42 | + int R[2]; //resolution of the slice | ||
43 | + quad<P> shape; | ||
44 | + | ||
45 | + void process_filename(std::string name, std::string &prefix, std::string &postfix, | ||
46 | + std::string &ext, unsigned int &digits) | ||
47 | + { | ||
48 | + std::stringstream ss(name); | ||
49 | + std::string item; | ||
50 | + std::vector<std::string> elems; | ||
51 | + while(std::getline(ss, item, '.')) //split the string at the '.' character (filename and extension) | ||
52 | + { | ||
53 | + elems.push_back(item); | ||
54 | + } | ||
55 | + | ||
56 | + prefix = elems[0]; //prefix contains the filename (with wildcard '?' characters) | ||
57 | + ext = elems[1]; //file extension (ex. .bmp, .png) | ||
58 | + ext = std::string(".") + ext; //add a period back into the extension | ||
59 | + | ||
60 | + size_t i0 = prefix.find_first_of("?"); //find the positions of the first and last wildcard ('?'') | ||
61 | + size_t i1 = prefix.find_last_of("?"); | ||
62 | + | ||
63 | + postfix = prefix.substr(i1+1); | ||
64 | + prefix = prefix.substr(0, i0); | ||
65 | + | ||
66 | + digits = i1 - i0 + 1; //compute the number of wildcards | ||
67 | + } | ||
68 | + | ||
69 | + void init() | ||
70 | + { | ||
71 | + for(unsigned int n=0; n<N; n++) | ||
72 | + X[n] = NULL; | ||
73 | + } | ||
74 | + void destroy() | ||
75 | + { | ||
76 | + for(unsigned int n=0; n<N; n++) | ||
77 | + if(X[n] != NULL) | ||
78 | + HANDLE_ERROR(cudaFree(X[n])); | ||
79 | + } | ||
80 | + | ||
81 | +public: | ||
82 | + //field constructor | ||
83 | + realfield() | ||
84 | + { | ||
85 | + R[0] = R[1] = 0; | ||
86 | + init(); | ||
87 | + std::cout<<"realfield CONSTRUCTOR"<<std::endl; | ||
88 | + } | ||
89 | + realfield(unsigned int x, unsigned int y) | ||
90 | + { | ||
91 | + //set the resolution | ||
92 | + R[0] = x; | ||
93 | + R[1] = y; | ||
94 | + //allocate memory on the GPU | ||
95 | + for(unsigned int n=0; n<N; n++) | ||
96 | + { | ||
97 | + HANDLE_ERROR(cudaMalloc( (void**)&X[n], sizeof(P) * R[0] * R[1] )); | ||
98 | + } | ||
99 | + shape = quad<P>(vec<P>(-1, -1, 0), vec<P>(-1, 1, 0), vec<P>(1, 1, 0)); //default geometry | ||
100 | + clear(); //zero the field | ||
101 | + std::cout<<"realfield CONSTRUCTOR"<<std::endl; | ||
102 | + } | ||
103 | + | ||
104 | + ~realfield() | ||
105 | + { | ||
106 | + destroy(); | ||
107 | + std::cout<<"realfield DESTRUCTOR"<<std::endl; | ||
108 | + } | ||
109 | + | ||
110 | + P* ptr(unsigned int n) | ||
111 | + { | ||
112 | + if(n < N) | ||
113 | + return X[n]; | ||
114 | + else return NULL; | ||
115 | + } | ||
116 | + | ||
117 | + //set all components of the field to zero | ||
118 | + void clear() | ||
119 | + { | ||
120 | + for(unsigned int n=0; n<N; n++) | ||
121 | + if(X[n] != NULL) | ||
122 | + HANDLE_ERROR(cudaMemset(X[n], 0, sizeof(P) * R[0] * R[1])); | ||
123 | + } | ||
124 | + | ||
125 | + void toImage(std::string filename, unsigned int n, P vmin, P vmax, rts::colormapType cmap = rts::cmBrewer) | ||
126 | + { | ||
127 | + rts::gpu2image<P>(X[n], filename, R[0], R[1], vmin, vmax, cmap); | ||
128 | + } | ||
129 | + | ||
130 | + void toImages(std::string filename, rts::colormapType cmap = rts::cmBrewer) | ||
131 | + { | ||
132 | + std::string prefix, postfix, extension; | ||
133 | + unsigned int digits; | ||
134 | + process_filename(filename, prefix, postfix, extension, digits); //process the filename for wild cards | ||
135 | + | ||
136 | + cublasStatus_t stat; | ||
137 | + cublasHandle_t handle; | ||
138 | + | ||
139 | + //create a CUBLAS handle | ||
140 | + stat = cublasCreate(&handle); | ||
141 | + if(stat != CUBLAS_STATUS_SUCCESS) | ||
142 | + { | ||
143 | + std::cout<<"CUBLAS Error: initialization failed"<<std::endl; | ||
144 | + exit(1); | ||
145 | + } | ||
146 | + | ||
147 | + int L = R[0] * R[1]; //compute the number of discrete points in a slice | ||
148 | + int result; //result of the max operation | ||
149 | + | ||
150 | + P maxVal[N]; //array stores minimum and maximum values | ||
151 | + P maxAll = 0; //largest value in the data set | ||
152 | + | ||
153 | + //compute the maximum value for each vector component | ||
154 | + for(int n=0; n<N; n++) | ||
155 | + { | ||
156 | + if(sizeof(P) == 4) | ||
157 | + stat = cublasIsamax(handle, L, (const float*)X[n], 1, &result); | ||
158 | + else | ||
159 | + stat = cublasIdamax(handle, L, (const double*)X[n], 1, &result); | ||
160 | + | ||
161 | + result -= 1; //adjust for 1-based indexing | ||
162 | + | ||
163 | + if(stat != CUBLAS_STATUS_SUCCESS) //if there was a GPU error, terminate | ||
164 | + { | ||
165 | + std::cout<<"CUBLAS Error: failure finding maximum value."<<std::endl; | ||
166 | + exit(1); | ||
167 | + } | ||
168 | + | ||
169 | + //retrieve the maximum value for this slice and store it in the maxVal array | ||
170 | + HANDLE_ERROR(cudaMemcpy(&maxVal[n], X[n] + result, sizeof(P), cudaMemcpyDeviceToHost)); | ||
171 | + if(abs(maxVal[n]) > maxAll) //if maxVal is larger, update the maxAll variable | ||
172 | + maxAll = maxVal[n]; | ||
173 | + | ||
174 | + } | ||
175 | + | ||
176 | + cublasDestroy(handle); //destroy the CUBLAS handle | ||
177 | + | ||
178 | + for(int n=0; n<N; n++) //for each image | ||
179 | + { | ||
180 | + stringstream ss; //assemble the file name | ||
181 | + ss<<prefix<<std::setfill('0')<<std::setw(digits)<<n<<postfix<<extension; | ||
182 | + std::cout<<ss.str()<<std::endl; | ||
183 | + if(positive) //if the image is positive | ||
184 | + toImage(ss.str(), n, 0, maxAll, cmap); //save the image using the global maximum | ||
185 | + else | ||
186 | + toImage(ss.str(), n, -abs(maxVal[n]), abs(maxVal[n]), cmap); //save the image using the global maximum | ||
187 | + } | ||
188 | + } | ||
189 | + | ||
190 | + //assignment operator | ||
191 | + realfield & operator= (const realfield & rhs) | ||
192 | + { | ||
193 | + //de-allocate any existing GPU memory | ||
194 | + destroy(); | ||
195 | + | ||
196 | + //copy the slice resolution | ||
197 | + R[0] = rhs.R[0]; | ||
198 | + R[1] = rhs.R[1]; | ||
199 | + | ||
200 | + for(unsigned int n=0; n<N; n++) | ||
201 | + { | ||
202 | + //allocate the necessary memory | ||
203 | + HANDLE_ERROR(cudaMalloc(&X[n], sizeof(P) * R[0] * R[1])); | ||
204 | + //copy the slice | ||
205 | + HANDLE_ERROR(cudaMemcpy(X[n], rhs.X[n], sizeof(P) * R[0] * R[1], cudaMemcpyDeviceToDevice)); | ||
206 | + } | ||
207 | + std::cout<<"Assignment operator."<<std::endl; | ||
208 | + | ||
209 | + return *this; | ||
210 | + } | ||
211 | + | ||
212 | + ///copy constructor | ||
213 | + realfield(const realfield &rhs) | ||
214 | + { | ||
215 | + //first make a shallow copy | ||
216 | + R[0] = rhs.R[0]; | ||
217 | + R[1] = rhs.R[1]; | ||
218 | + | ||
219 | + for(unsigned int n=0; n<N; n++) | ||
220 | + { | ||
221 | + //do we have to make a deep copy? | ||
222 | + if(rhs.X[n] == NULL) | ||
223 | + X[n] = NULL; //no | ||
224 | + else | ||
225 | + { | ||
226 | + //allocate the necessary memory | ||
227 | + HANDLE_ERROR(cudaMalloc(&X[n], sizeof(P) * R[0] * R[1])); | ||
228 | + | ||
229 | + //copy the slice | ||
230 | + HANDLE_ERROR(cudaMemcpy(X[n], rhs.X[n], sizeof(P) * R[0] * R[1], cudaMemcpyDeviceToDevice)); | ||
231 | + } | ||
232 | + } | ||
233 | + | ||
234 | + std::cout<<"realfield COPY CONSTRUCTOR"<<std::endl; | ||
235 | + } | ||
236 | + | ||
237 | + /*void gaussian(P mean, P std, unsigned int n=0) //creates a 3D gaussian using component n | ||
238 | + { | ||
239 | + int maxThreads = rts::maxThreadsPerBlock(); //compute the optimal block size | ||
240 | + int SQRT_BLOCK = (int)sqrt((float)maxThreads); | ||
241 | + //create one thread for each detector pixel | ||
242 | + dim3 dimBlock(SQRT_BLOCK, SQRT_BLOCK); | ||
243 | + dim3 dimGrid((R[0] + SQRT_BLOCK -1)/SQRT_BLOCK, (R[1] + SQRT_BLOCK - 1)/SQRT_BLOCK); | ||
244 | + | ||
245 | + gpu_gaussian<float> <<<dimGrid, dimBlock>>> (X[n], R[0], R[1], mean, std, shape); | ||
246 | + }*/ | ||
247 | + | ||
248 | + | ||
249 | + | ||
250 | +}; | ||
251 | + | ||
252 | + | ||
253 | +} //end namespace rts | ||
254 | + | ||
255 | + | ||
256 | +#endif | ||
0 | \ No newline at end of file | 257 | \ No newline at end of file |
1 | +#ifndef RTS_ESPHERE | ||
2 | +#define RTS_ESPHERE | ||
3 | + | ||
4 | +#include "../math/complex.h" | ||
5 | +#include "../math/bessel.h" | ||
6 | +#include "../visualization/colormap.h" | ||
7 | +#include "../optics/planewave.h" | ||
8 | +#include "../cuda/devices.h" | ||
9 | +#include "../optics/efield.cuh" | ||
10 | + | ||
11 | +namespace rts{ | ||
12 | + | ||
13 | +/* This class implements a discrete representation of an electromagnetic field | ||
14 | + in 2D scattered by a sphere. This class implements Mie scattering. | ||
15 | +*/ | ||
16 | +template<typename P> | ||
17 | +class esphere : public efield<P> | ||
18 | +{ | ||
19 | +private: | ||
20 | + rts::complex<P> n; //sphere refractive index | ||
21 | + P a; //sphere radius | ||
22 | + | ||
23 | + //parameters dependent on wavelength | ||
24 | + unsigned int Nl; //number of orders for the calculation | ||
25 | + rts::complex<P>* A; //internal scattering coefficients | ||
26 | + rts::complex<P>* B; //external scattering coefficients | ||
27 | + | ||
28 | + void calcNl(P kmag) | ||
29 | + { | ||
30 | + //return ceil( ((P)6.282 * a) / lambda + 4 * pow( ((P)6.282 * a) / lambda, ((P)1/(P)3)) + 2); | ||
31 | + Nl = ceil( kmag*a + 4 * pow(kmag * a, (P)1/(P)3) + 2); | ||
32 | + } | ||
33 | + | ||
34 | + void calcAB(P k, unsigned int Nl, rts::complex<P>* A, rts::complex<P>* B) | ||
35 | + { | ||
36 | + /* These calculations require double precision, so they are computed | ||
37 | + using doubles and converted to P at the end. | ||
38 | + | ||
39 | + Input: | ||
40 | + | ||
41 | + k = magnitude of the k vector (tau/lambda) | ||
42 | + Nl = highest order coefficient ([0 Nl] are computed) | ||
43 | + */ | ||
44 | + | ||
45 | + //clear the previous coefficients | ||
46 | + rts::complex<P>* cpuA = (rts::complex<P>*)malloc(sizeof(rts::complex<P>) * (Nl+1)); | ||
47 | + rts::complex<P>* cpuB = (rts::complex<P>*)malloc(sizeof(rts::complex<P>) * (Nl+1)); | ||
48 | + | ||
49 | + //convert to an std complex value | ||
50 | + complex<double> nc = (rts::complex<double>)n; | ||
51 | + | ||
52 | + //compute the magnitude of the k vector | ||
53 | + complex<double> kna = nc * k * (double)a; | ||
54 | + | ||
55 | + //compute the arguments k*a and k*n*a | ||
56 | + complex<double> ka(k * a, 0.0); | ||
57 | + | ||
58 | + //allocate space for the Bessel functions of the first and second kind (and derivatives) | ||
59 | + unsigned int bytes = sizeof(complex<double>) * (Nl + 1); | ||
60 | + complex<double>* cjv_ka = (complex<double>*)malloc(bytes); | ||
61 | + complex<double>* cyv_ka = (complex<double>*)malloc(bytes); | ||
62 | + complex<double>* cjvp_ka = (complex<double>*)malloc(bytes); | ||
63 | + complex<double>* cyvp_ka = (complex<double>*)malloc(bytes); | ||
64 | + complex<double>* cjv_kna = (complex<double>*)malloc(bytes); | ||
65 | + complex<double>* cyv_kna = (complex<double>*)malloc(bytes); | ||
66 | + complex<double>* cjvp_kna = (complex<double>*)malloc(bytes); | ||
67 | + complex<double>* cyvp_kna = (complex<double>*)malloc(bytes); | ||
68 | + | ||
69 | + //allocate space for the spherical Hankel functions and derivative | ||
70 | + complex<double>* chv_ka = (complex<double>*)malloc(bytes); | ||
71 | + complex<double>* chvp_ka = (complex<double>*)malloc(bytes); | ||
72 | + | ||
73 | + //compute the bessel functions using the CPU-based algorithm | ||
74 | + double vm; | ||
75 | + cbessjyva_sph(Nl, ka, vm, cjv_ka, cyv_ka, cjvp_ka, cyvp_ka); | ||
76 | + cbessjyva_sph(Nl, kna, vm, cjv_kna, cyv_kna, cjvp_kna, cyvp_kna); | ||
77 | + | ||
78 | + //compute A for each order | ||
79 | + complex<double> i(0, 1); | ||
80 | + complex<double> a, b, c, d; | ||
81 | + complex<double> An, Bn; | ||
82 | + for(int l=0; l<=Nl; l++) | ||
83 | + { | ||
84 | + //compute the Hankel functions from j and y | ||
85 | + chv_ka[l] = cjv_ka[l] + i * cyv_ka[l]; | ||
86 | + chvp_ka[l] = cjvp_ka[l] + i * cyvp_ka[l]; | ||
87 | + | ||
88 | + //Compute A (internal scattering coefficient) | ||
89 | + //compute the numerator and denominator for A | ||
90 | + a = cjv_ka[l] * chvp_ka[l] - cjvp_ka[l] * chv_ka[l]; | ||
91 | + b = cjv_kna[l] * chvp_ka[l] - chv_ka[l] * cjvp_kna[l] * nc; | ||
92 | + | ||
93 | + //calculate A and add it to the list | ||
94 | + rts::complex<double> An = (2.0 * l + 1.0) * pow(i, l) * (a / b); | ||
95 | + cpuA[l] = (rts::complex<P>)An; | ||
96 | + | ||
97 | + //Compute B (external scattering coefficient) | ||
98 | + c = cjv_ka[l] * cjvp_kna[l] * nc - cjv_kna[l] * cjvp_ka[l]; | ||
99 | + d = cjv_kna[l] * chvp_ka[l] - chv_ka[l] * cjvp_kna[l] * nc; | ||
100 | + | ||
101 | + //calculate B and add it to the list | ||
102 | + rts::complex<double> Bn = (2.0 * l + 1.0) * pow(i, l) * (c / d); | ||
103 | + cpuB[l] = (rts::complex<P>)Bn; | ||
104 | + | ||
105 | + std::cout<<"A: "<<cpuA[l]<<" B: "<<cpuB[l]<<std::endl; | ||
106 | + } | ||
107 | + | ||
108 | + | ||
109 | + if(A != NULL) cudaFree(A); //free any previous coefficients | ||
110 | + if(B != NULL) cudaFree(B); | ||
111 | + cudaMalloc(&A, sizeof(rts::complex<P>) * (Nl+1)); //allocate memory for new coefficients | ||
112 | + cudaMalloc(&B, sizeof(rts::complex<P>) * (Nl+1)); | ||
113 | + | ||
114 | + //copy the calculations from the CPU to the GPU | ||
115 | + cudaMemcpy(A, cpuA, sizeof(rts::complex<P>) * (Nl+1), cudaMemcpyDeviceToHost); | ||
116 | + cudaMemcpy(B, cpuB, sizeof(rts::complex<P>) * (Nl+1), cudaMemcpyDeviceToHost); | ||
117 | + } | ||
118 | + | ||
119 | +public: | ||
120 | + | ||
121 | + esphere(unsigned int res0, unsigned int res1, P _a, rts::complex<P> _n, bool _scalar = false) : | ||
122 | + efield<P>(res0, res1, _scalar) | ||
123 | + { | ||
124 | + std::cout<<"Sphere scattered field created."<<std::endl; | ||
125 | + n = _n; //save the refractive index | ||
126 | + a = _a; //save the radius | ||
127 | + } | ||
128 | + | ||
129 | + //assignment operator: build an electric field from a plane wave | ||
130 | + efield<P> & operator= (const planewave<P> & rhs) | ||
131 | + { | ||
132 | + calcNl(rhs.kmag()); //compute the number of scattering coefficients | ||
133 | + std::cout<<"Nl: "<<Nl<<std::endl; | ||
134 | + calcAB(rhs.kmag(), Nl, A, B); //compute the scattering coefficients | ||
135 | + | ||
136 | + //determine important parameters for the scattering domain | ||
137 | + unsigned int sR = ceil(sqrt( (P)(pow(esphere::R[0],2) + pow(esphere::R[1],2))) ); | ||
138 | + unsigned int thetaR = 256; | ||
139 | + | ||
140 | + /////////////////////continue scattering code here///////////////////////// | ||
141 | + | ||
142 | + esphere::clear(); //clear any previous field data | ||
143 | + from_planewave(rhs); //create a field from the planewave | ||
144 | + return *this; //return the current object | ||
145 | + } | ||
146 | + | ||
147 | + string str() | ||
148 | + { | ||
149 | + stringstream ss; | ||
150 | + ss<<"Mie Scattered Field"<<std::endl; | ||
151 | + ss<<(*this).efield<P>::str()<<std::endl; | ||
152 | + ss<<"a = "<<a<<std::endl; | ||
153 | + ss<<"n = "<<n; | ||
154 | + | ||
155 | + return ss.str(); | ||
156 | + } | ||
157 | + | ||
158 | +}; | ||
159 | + | ||
160 | +} //end namespace rts | ||
161 | + | ||
162 | +#endif | ||
0 | \ No newline at end of file | 163 | \ No newline at end of file |