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source: trunk/sources/ALGLIB/ftbase.cs @ 2575

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Last change on this file since 2575 was 2563, checked in by gkronber, 15 years ago
Updated ALGLIB to latest version. #751 (Plugin for for data-modeling with ANN (integrated into CEDMA))
File size: 60.2 KB

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1	/*************************************************************************
2	Copyright (c) 2009, Sergey Bochkanov (ALGLIB project).
3
4	>>> SOURCE LICENSE >>>
5	This program is free software; you can redistribute it and/or modify
6	it under the terms of the GNU General Public License as published by
7	the Free Software Foundation (www.fsf.org); either version 2 of the
8	License, or (at your option) any later version.
9
10	This program is distributed in the hope that it will be useful,
11	but WITHOUT ANY WARRANTY; without even the implied warranty of
12	MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
13	GNU General Public License for more details.
14
15	A copy of the GNU General Public License is available at
16	http://www.fsf.org/licensing/licenses
17
18	>>> END OF LICENSE >>>
19	*************************************************************************/
20
21	using System;
22
23	namespace alglib
24	{
25	public class ftbase
26	{
27	public struct ftplan
28	{
29	public int[] plan;
30	public double[] precomputed;
31	public double[] tmpbuf;
32	public double[] stackbuf;
33	};
34
35
36
37
38	public const int ftbaseplanentrysize = 8;
39	public const int ftbasecffttask = 0;
40	public const int ftbaserfhttask = 1;
41	public const int ftbaserffttask = 2;
42	public const int fftcooleytukeyplan = 0;
43	public const int fftbluesteinplan = 1;
44	public const int fftcodeletplan = 2;
45	public const int fhtcooleytukeyplan = 3;
46	public const int fhtcodeletplan = 4;
47	public const int fftrealcooleytukeyplan = 5;
48	public const int fftemptyplan = 6;
49	public const int fhtn2plan = 999;
50	public const int ftbaseupdatetw = 4;
51	public const int ftbasecodeletmax = 5;
52	public const int ftbasecodeletrecommended = 5;
53	public const double ftbaseinefficiencyfactor = 1.3;
54	public const int ftbasemaxsmoothfactor = 5;
55
56
57	/*************************************************************************
58	This subroutine generates FFT plan - a decomposition of a N-length FFT to
59	the more simpler operations. Plan consists of the root entry and the child
60	entries.
61
62	Subroutine parameters:
63	N task size
64
65	Output parameters:
66	Plan plan
67
68	-- ALGLIB --
69	Copyright 01.05.2009 by Bochkanov Sergey
70	*************************************************************************/
71	public static void ftbasegeneratecomplexfftplan(int n,
72	ref ftplan plan)
73	{
74	int planarraysize = 0;
75	int plansize = 0;
76	int precomputedsize = 0;
77	int tmpmemsize = 0;
78	int stackmemsize = 0;
79	int stackptr = 0;
80
81	planarraysize = 1;
82	plansize = 0;
83	precomputedsize = 0;
84	stackmemsize = 0;
85	stackptr = 0;
86	tmpmemsize = 2*n;
87	plan.plan = new int[planarraysize];
88	ftbasegenerateplanrec(n, ftbasecffttask, ref plan, ref plansize, ref precomputedsize, ref planarraysize, ref tmpmemsize, ref stackmemsize, stackptr);
89	System.Diagnostics.Debug.Assert(stackptr==0, "Internal error in FTBaseGenerateComplexFFTPlan: stack ptr!");
90	plan.stackbuf = new double[Math.Max(stackmemsize, 1)];
91	plan.tmpbuf = new double[Math.Max(tmpmemsize, 1)];
92	plan.precomputed = new double[Math.Max(precomputedsize, 1)];
93	stackptr = 0;
94	ftbaseprecomputeplanrec(ref plan, 0, stackptr);
95	System.Diagnostics.Debug.Assert(stackptr==0, "Internal error in FTBaseGenerateComplexFFTPlan: stack ptr!");
96	}
97
98
99	/*************************************************************************
100	Generates real FFT plan
101	*************************************************************************/
102	public static void ftbasegeneraterealfftplan(int n,
103	ref ftplan plan)
104	{
105	int planarraysize = 0;
106	int plansize = 0;
107	int precomputedsize = 0;
108	int tmpmemsize = 0;
109	int stackmemsize = 0;
110	int stackptr = 0;
111
112	planarraysize = 1;
113	plansize = 0;
114	precomputedsize = 0;
115	stackmemsize = 0;
116	stackptr = 0;
117	tmpmemsize = 2*n;
118	plan.plan = new int[planarraysize];
119	ftbasegenerateplanrec(n, ftbaserffttask, ref plan, ref plansize, ref precomputedsize, ref planarraysize, ref tmpmemsize, ref stackmemsize, stackptr);
120	System.Diagnostics.Debug.Assert(stackptr==0, "Internal error in FTBaseGenerateRealFFTPlan: stack ptr!");
121	plan.stackbuf = new double[Math.Max(stackmemsize, 1)];
122	plan.tmpbuf = new double[Math.Max(tmpmemsize, 1)];
123	plan.precomputed = new double[Math.Max(precomputedsize, 1)];
124	stackptr = 0;
125	ftbaseprecomputeplanrec(ref plan, 0, stackptr);
126	System.Diagnostics.Debug.Assert(stackptr==0, "Internal error in FTBaseGenerateRealFFTPlan: stack ptr!");
127	}
128
129
130	/*************************************************************************
131	Generates real FHT plan
132	*************************************************************************/
133	public static void ftbasegeneraterealfhtplan(int n,
134	ref ftplan plan)
135	{
136	int planarraysize = 0;
137	int plansize = 0;
138	int precomputedsize = 0;
139	int tmpmemsize = 0;
140	int stackmemsize = 0;
141	int stackptr = 0;
142
143	planarraysize = 1;
144	plansize = 0;
145	precomputedsize = 0;
146	stackmemsize = 0;
147	stackptr = 0;
148	tmpmemsize = n;
149	plan.plan = new int[planarraysize];
150	ftbasegenerateplanrec(n, ftbaserfhttask, ref plan, ref plansize, ref precomputedsize, ref planarraysize, ref tmpmemsize, ref stackmemsize, stackptr);
151	System.Diagnostics.Debug.Assert(stackptr==0, "Internal error in FTBaseGenerateRealFHTPlan: stack ptr!");
152	plan.stackbuf = new double[Math.Max(stackmemsize, 1)];
153	plan.tmpbuf = new double[Math.Max(tmpmemsize, 1)];
154	plan.precomputed = new double[Math.Max(precomputedsize, 1)];
155	stackptr = 0;
156	ftbaseprecomputeplanrec(ref plan, 0, stackptr);
157	System.Diagnostics.Debug.Assert(stackptr==0, "Internal error in FTBaseGenerateRealFHTPlan: stack ptr!");
158	}
159
160
161	/*************************************************************************
162	This subroutine executes FFT/FHT plan.
163
164	If Plan is a:
165	* complex FFT plan - sizeof(A)=2*N,
166	A contains interleaved real/imaginary values
167	* real FFT plan - sizeof(A)=2*N,
168	A contains real values interleaved with zeros
169	* real FHT plan - sizeof(A)=2*N,
170	A contains real values interleaved with zeros
171
172	-- ALGLIB --
173	Copyright 01.05.2009 by Bochkanov Sergey
174	*************************************************************************/
175	public static void ftbaseexecuteplan(ref double[] a,
176	int aoffset,
177	int n,
178	ref ftplan plan)
179	{
180	int stackptr = 0;
181
182	stackptr = 0;
183	ftbaseexecuteplanrec(ref a, aoffset, ref plan, 0, stackptr);
184	}
185
186
187	/*************************************************************************
188	Recurrent subroutine for the FTBaseExecutePlan
189
190	Parameters:
191	A FFT'ed array
192	AOffset offset of the FFT'ed part (distance is measured in doubles)
193
194	-- ALGLIB --
195	Copyright 01.05.2009 by Bochkanov Sergey
196	*************************************************************************/
197	public static void ftbaseexecuteplanrec(ref double[] a,
198	int aoffset,
199	ref ftplan plan,
200	int entryoffset,
201	int stackptr)
202	{
203	int i = 0;
204	int j = 0;
205	int k = 0;
206	int idx = 0;
207	int n1 = 0;
208	int n2 = 0;
209	int n = 0;
210	int m = 0;
211	int offs = 0;
212	int offs1 = 0;
213	int offs2 = 0;
214	int offsa = 0;
215	int offsb = 0;
216	int offsp = 0;
217	double hk = 0;
218	double hnk = 0;
219	double x = 0;
220	double y = 0;
221	double bx = 0;
222	double by = 0;
223	double v = 0;
224	double[] emptyarray = new double[0];
225	double a0x = 0;
226	double a0y = 0;
227	double a1x = 0;
228	double a1y = 0;
229	double a2x = 0;
230	double a2y = 0;
231	double a3x = 0;
232	double a3y = 0;
233	double a4x = 0;
234	double a4y = 0;
235	double v0 = 0;
236	double v1 = 0;
237	double v2 = 0;
238	double v3 = 0;
239	double t1x = 0;
240	double t1y = 0;
241	double t2x = 0;
242	double t2y = 0;
243	double t3x = 0;
244	double t3y = 0;
245	double t4x = 0;
246	double t4y = 0;
247	double t5x = 0;
248	double t5y = 0;
249	double m1x = 0;
250	double m1y = 0;
251	double m2x = 0;
252	double m2y = 0;
253	double m3x = 0;
254	double m3y = 0;
255	double m4x = 0;
256	double m4y = 0;
257	double m5x = 0;
258	double m5y = 0;
259	double s1x = 0;
260	double s1y = 0;
261	double s2x = 0;
262	double s2y = 0;
263	double s3x = 0;
264	double s3y = 0;
265	double s4x = 0;
266	double s4y = 0;
267	double s5x = 0;
268	double s5y = 0;
269	double c1 = 0;
270	double c2 = 0;
271	double c3 = 0;
272	double c4 = 0;
273	double c5 = 0;
274	double[] tmp = new double[0];
275	int i_ = 0;
276	int i1_ = 0;
277
278	if( plan.plan[entryoffset+3]==fftemptyplan )
279	{
280	return;
281	}
282	if( plan.plan[entryoffset+3]==fftcooleytukeyplan )
283	{
284
285	//
286	// Cooley-Tukey plan
287	// * transposition
288	// * row-wise FFT
289	// * twiddle factors:
290	// - TwBase is a basis twiddle factor for I=1, J=1
291	// - TwRow is a twiddle factor for a second element in a row (J=1)
292	// - Tw is a twiddle factor for a current element
293	// * transposition again
294	// * row-wise FFT again
295	//
296	n1 = plan.plan[entryoffset+1];
297	n2 = plan.plan[entryoffset+2];
298	internalcomplexlintranspose(ref a, n1, n2, aoffset, ref plan.tmpbuf);
299	for(i=0; i<=n2-1; i++)
300	{
301	ftbaseexecuteplanrec(ref a, aoffset+in12, ref plan, plan.plan[entryoffset+5], stackptr);
302	}
303	ffttwcalc(ref a, aoffset, n1, n2);
304	internalcomplexlintranspose(ref a, n2, n1, aoffset, ref plan.tmpbuf);
305	for(i=0; i<=n1-1; i++)
306	{
307	ftbaseexecuteplanrec(ref a, aoffset+in22, ref plan, plan.plan[entryoffset+6], stackptr);
308	}
309	internalcomplexlintranspose(ref a, n1, n2, aoffset, ref plan.tmpbuf);
310	return;
311	}
312	if( plan.plan[entryoffset+3]==fftrealcooleytukeyplan )
313	{
314
315	//
316	// Cooley-Tukey plan
317	// * transposition
318	// * row-wise FFT
319	// * twiddle factors:
320	// - TwBase is a basis twiddle factor for I=1, J=1
321	// - TwRow is a twiddle factor for a second element in a row (J=1)
322	// - Tw is a twiddle factor for a current element
323	// * transposition again
324	// * row-wise FFT again
325	//
326	n1 = plan.plan[entryoffset+1];
327	n2 = plan.plan[entryoffset+2];
328	internalcomplexlintranspose(ref a, n2, n1, aoffset, ref plan.tmpbuf);
329	for(i=0; i<=n1/2-1; i++)
330	{
331
332	//
333	// pack two adjacent smaller real FFT's together,
334	// make one complex FFT,
335	// unpack result
336	//
337	offs = aoffset+2in2*2;
338	for(k=0; k<=n2-1; k++)
339	{
340	a[offs+2k+1] = a[offs+2n2+2*k+0];
341	}
342	ftbaseexecuteplanrec(ref a, offs, ref plan, plan.plan[entryoffset+6], stackptr);
343	plan.tmpbuf[0] = a[offs+0];
344	plan.tmpbuf[1] = 0;
345	plan.tmpbuf[2*n2+0] = a[offs+1];
346	plan.tmpbuf[2*n2+1] = 0;
347	for(k=1; k<=n2-1; k++)
348	{
349	offs1 = 2*k;
350	offs2 = 2n2+2k;
351	hk = a[offs+2*k+0];
352	hnk = a[offs+2*(n2-k)+0];
353	plan.tmpbuf[offs1+0] = +(0.5*(hk+hnk));
354	plan.tmpbuf[offs2+1] = -(0.5*(hk-hnk));
355	hk = a[offs+2*k+1];
356	hnk = a[offs+2*(n2-k)+1];
357	plan.tmpbuf[offs2+0] = +(0.5*(hk+hnk));
358	plan.tmpbuf[offs1+1] = +(0.5*(hk-hnk));
359	}
360	i1_ = (0) - (offs);
361	for(i_=offs; i_<=offs+2n22-1;i_++)
362	{
363	a[i_] = plan.tmpbuf[i_+i1_];
364	}
365	}
366	if( n1%2!=0 )
367	{
368	ftbaseexecuteplanrec(ref a, aoffset+(n1-1)n22, ref plan, plan.plan[entryoffset+6], stackptr);
369	}
370	ffttwcalc(ref a, aoffset, n2, n1);
371	internalcomplexlintranspose(ref a, n1, n2, aoffset, ref plan.tmpbuf);
372	for(i=0; i<=n2-1; i++)
373	{
374	ftbaseexecuteplanrec(ref a, aoffset+in12, ref plan, plan.plan[entryoffset+5], stackptr);
375	}
376	internalcomplexlintranspose(ref a, n2, n1, aoffset, ref plan.tmpbuf);
377	return;
378	}
379	if( plan.plan[entryoffset+3]==fhtcooleytukeyplan )
380	{
381
382	//
383	// Cooley-Tukey FHT plan:
384	// * transpose \
385	// * smaller FHT's \|
386	// * pre-process \|
387	// * multiply by twiddle factors \| corresponds to multiplication by H1
388	// * post-process \|
389	// * transpose again /
390	// * multiply by H2 (smaller FHT's)
391	// * final transposition
392	//
393	// For more details see Vitezslav Vesely, "Fast algorithms
394	// of Fourier and Hartley transform and their implementation in MATLAB",
395	// page 31.
396	//
397	n1 = plan.plan[entryoffset+1];
398	n2 = plan.plan[entryoffset+2];
399	n = n1*n2;
400	internalreallintranspose(ref a, n1, n2, aoffset, ref plan.tmpbuf);
401	for(i=0; i<=n2-1; i++)
402	{
403	ftbaseexecuteplanrec(ref a, aoffset+i*n1, ref plan, plan.plan[entryoffset+5], stackptr);
404	}
405	for(i=0; i<=n2-1; i++)
406	{
407	for(j=0; j<=n1-1; j++)
408	{
409	offsa = aoffset+i*n1;
410	hk = a[offsa+j];
411	hnk = a[offsa+(n1-j)%n1];
412	offs = 2(in1+j);
413	plan.tmpbuf[offs+0] = -(0.5*(hnk-hk));
414	plan.tmpbuf[offs+1] = +(0.5*(hk+hnk));
415	}
416	}
417	ffttwcalc(ref plan.tmpbuf, 0, n1, n2);
418	for(j=0; j<=n1-1; j++)
419	{
420	a[aoffset+j] = plan.tmpbuf[2j+0]+plan.tmpbuf[2j+1];
421	}
422	if( n2%2==0 )
423	{
424	offs = 2(n2/2)n1;
425	offsa = aoffset+n2/2*n1;
426	for(j=0; j<=n1-1; j++)
427	{
428	a[offsa+j] = plan.tmpbuf[offs+2j+0]+plan.tmpbuf[offs+2j+1];
429	}
430	}
431	for(i=1; i<=(n2+1)/2-1; i++)
432	{
433	offs = 2in1;
434	offs2 = 2(n2-i)n1;
435	offsa = aoffset+i*n1;
436	for(j=0; j<=n1-1; j++)
437	{
438	a[offsa+j] = plan.tmpbuf[offs+2j+1]+plan.tmpbuf[offs2+2j+0];
439	}
440	offsa = aoffset+(n2-i)*n1;
441	for(j=0; j<=n1-1; j++)
442	{
443	a[offsa+j] = plan.tmpbuf[offs+2j+0]+plan.tmpbuf[offs2+2j+1];
444	}
445	}
446	internalreallintranspose(ref a, n2, n1, aoffset, ref plan.tmpbuf);
447	for(i=0; i<=n1-1; i++)
448	{
449	ftbaseexecuteplanrec(ref a, aoffset+i*n2, ref plan, plan.plan[entryoffset+6], stackptr);
450	}
451	internalreallintranspose(ref a, n1, n2, aoffset, ref plan.tmpbuf);
452	return;
453	}
454	if( plan.plan[entryoffset+3]==fhtn2plan )
455	{
456
457	//
458	// Cooley-Tukey FHT plan
459	//
460	n1 = plan.plan[entryoffset+1];
461	n2 = plan.plan[entryoffset+2];
462	n = n1*n2;
463	reffht(ref a, n, aoffset);
464	return;
465	}
466	if( plan.plan[entryoffset+3]==fftcodeletplan )
467	{
468	n1 = plan.plan[entryoffset+1];
469	n2 = plan.plan[entryoffset+2];
470	n = n1*n2;
471	if( n==2 )
472	{
473	a0x = a[aoffset+0];
474	a0y = a[aoffset+1];
475	a1x = a[aoffset+2];
476	a1y = a[aoffset+3];
477	v0 = a0x+a1x;
478	v1 = a0y+a1y;
479	v2 = a0x-a1x;
480	v3 = a0y-a1y;
481	a[aoffset+0] = v0;
482	a[aoffset+1] = v1;
483	a[aoffset+2] = v2;
484	a[aoffset+3] = v3;
485	return;
486	}
487	if( n==3 )
488	{
489	offs = plan.plan[entryoffset+7];
490	c1 = plan.precomputed[offs+0];
491	c2 = plan.precomputed[offs+1];
492	a0x = a[aoffset+0];
493	a0y = a[aoffset+1];
494	a1x = a[aoffset+2];
495	a1y = a[aoffset+3];
496	a2x = a[aoffset+4];
497	a2y = a[aoffset+5];
498	t1x = a1x+a2x;
499	t1y = a1y+a2y;
500	a0x = a0x+t1x;
501	a0y = a0y+t1y;
502	m1x = c1*t1x;
503	m1y = c1*t1y;
504	m2x = c2*(a1y-a2y);
505	m2y = c2*(a2x-a1x);
506	s1x = a0x+m1x;
507	s1y = a0y+m1y;
508	a1x = s1x+m2x;
509	a1y = s1y+m2y;
510	a2x = s1x-m2x;
511	a2y = s1y-m2y;
512	a[aoffset+0] = a0x;
513	a[aoffset+1] = a0y;
514	a[aoffset+2] = a1x;
515	a[aoffset+3] = a1y;
516	a[aoffset+4] = a2x;
517	a[aoffset+5] = a2y;
518	return;
519	}
520	if( n==4 )
521	{
522	a0x = a[aoffset+0];
523	a0y = a[aoffset+1];
524	a1x = a[aoffset+2];
525	a1y = a[aoffset+3];
526	a2x = a[aoffset+4];
527	a2y = a[aoffset+5];
528	a3x = a[aoffset+6];
529	a3y = a[aoffset+7];
530	t1x = a0x+a2x;
531	t1y = a0y+a2y;
532	t2x = a1x+a3x;
533	t2y = a1y+a3y;
534	m2x = a0x-a2x;
535	m2y = a0y-a2y;
536	m3x = a1y-a3y;
537	m3y = a3x-a1x;
538	a[aoffset+0] = t1x+t2x;
539	a[aoffset+1] = t1y+t2y;
540	a[aoffset+4] = t1x-t2x;
541	a[aoffset+5] = t1y-t2y;
542	a[aoffset+2] = m2x+m3x;
543	a[aoffset+3] = m2y+m3y;
544	a[aoffset+6] = m2x-m3x;
545	a[aoffset+7] = m2y-m3y;
546	return;
547	}
548	if( n==5 )
549	{
550	offs = plan.plan[entryoffset+7];
551	c1 = plan.precomputed[offs+0];
552	c2 = plan.precomputed[offs+1];
553	c3 = plan.precomputed[offs+2];
554	c4 = plan.precomputed[offs+3];
555	c5 = plan.precomputed[offs+4];
556	t1x = a[aoffset+2]+a[aoffset+8];
557	t1y = a[aoffset+3]+a[aoffset+9];
558	t2x = a[aoffset+4]+a[aoffset+6];
559	t2y = a[aoffset+5]+a[aoffset+7];
560	t3x = a[aoffset+2]-a[aoffset+8];
561	t3y = a[aoffset+3]-a[aoffset+9];
562	t4x = a[aoffset+6]-a[aoffset+4];
563	t4y = a[aoffset+7]-a[aoffset+5];
564	t5x = t1x+t2x;
565	t5y = t1y+t2y;
566	a[aoffset+0] = a[aoffset+0]+t5x;
567	a[aoffset+1] = a[aoffset+1]+t5y;
568	m1x = c1*t5x;
569	m1y = c1*t5y;
570	m2x = c2*(t1x-t2x);
571	m2y = c2*(t1y-t2y);
572	m3x = -(c3*(t3y+t4y));
573	m3y = c3*(t3x+t4x);
574	m4x = -(c4*t4y);
575	m4y = c4*t4x;
576	m5x = -(c5*t3y);
577	m5y = c5*t3x;
578	s3x = m3x-m4x;
579	s3y = m3y-m4y;
580	s5x = m3x+m5x;
581	s5y = m3y+m5y;
582	s1x = a[aoffset+0]+m1x;
583	s1y = a[aoffset+1]+m1y;
584	s2x = s1x+m2x;
585	s2y = s1y+m2y;
586	s4x = s1x-m2x;
587	s4y = s1y-m2y;
588	a[aoffset+2] = s2x+s3x;
589	a[aoffset+3] = s2y+s3y;
590	a[aoffset+4] = s4x+s5x;
591	a[aoffset+5] = s4y+s5y;
592	a[aoffset+6] = s4x-s5x;
593	a[aoffset+7] = s4y-s5y;
594	a[aoffset+8] = s2x-s3x;
595	a[aoffset+9] = s2y-s3y;
596	return;
597	}
598	}
599	if( plan.plan[entryoffset+3]==fhtcodeletplan )
600	{
601	n1 = plan.plan[entryoffset+1];
602	n2 = plan.plan[entryoffset+2];
603	n = n1*n2;
604	if( n==2 )
605	{
606	a0x = a[aoffset+0];
607	a1x = a[aoffset+1];
608	a[aoffset+0] = a0x+a1x;
609	a[aoffset+1] = a0x-a1x;
610	return;
611	}
612	if( n==3 )
613	{
614	offs = plan.plan[entryoffset+7];
615	c1 = plan.precomputed[offs+0];
616	c2 = plan.precomputed[offs+1];
617	a0x = a[aoffset+0];
618	a1x = a[aoffset+1];
619	a2x = a[aoffset+2];
620	t1x = a1x+a2x;
621	a0x = a0x+t1x;
622	m1x = c1*t1x;
623	m2y = c2*(a2x-a1x);
624	s1x = a0x+m1x;
625	a[aoffset+0] = a0x;
626	a[aoffset+1] = s1x-m2y;
627	a[aoffset+2] = s1x+m2y;
628	return;
629	}
630	if( n==4 )
631	{
632	a0x = a[aoffset+0];
633	a1x = a[aoffset+1];
634	a2x = a[aoffset+2];
635	a3x = a[aoffset+3];
636	t1x = a0x+a2x;
637	t2x = a1x+a3x;
638	m2x = a0x-a2x;
639	m3y = a3x-a1x;
640	a[aoffset+0] = t1x+t2x;
641	a[aoffset+1] = m2x-m3y;
642	a[aoffset+2] = t1x-t2x;
643	a[aoffset+3] = m2x+m3y;
644	return;
645	}
646	if( n==5 )
647	{
648	offs = plan.plan[entryoffset+7];
649	c1 = plan.precomputed[offs+0];
650	c2 = plan.precomputed[offs+1];
651	c3 = plan.precomputed[offs+2];
652	c4 = plan.precomputed[offs+3];
653	c5 = plan.precomputed[offs+4];
654	t1x = a[aoffset+1]+a[aoffset+4];
655	t2x = a[aoffset+2]+a[aoffset+3];
656	t3x = a[aoffset+1]-a[aoffset+4];
657	t4x = a[aoffset+3]-a[aoffset+2];
658	t5x = t1x+t2x;
659	v0 = a[aoffset+0]+t5x;
660	a[aoffset+0] = v0;
661	m2x = c2*(t1x-t2x);
662	m3y = c3*(t3x+t4x);
663	s3y = m3y-c4*t4x;
664	s5y = m3y+c5*t3x;
665	s1x = v0+c1*t5x;
666	s2x = s1x+m2x;
667	s4x = s1x-m2x;
668	a[aoffset+1] = s2x-s3y;
669	a[aoffset+2] = s4x-s5y;
670	a[aoffset+3] = s4x+s5y;
671	a[aoffset+4] = s2x+s3y;
672	return;
673	}
674	}
675	if( plan.plan[entryoffset+3]==fftbluesteinplan )
676	{
677
678	//
679	// Bluestein plan:
680	// 1. multiply by precomputed coefficients
681	// 2. make convolution: forward FFT, multiplication by precomputed FFT
682	// and backward FFT. backward FFT is represented as
683	//
684	// invfft(x) = fft(x')'/M
685	//
686	// for performance reasons reduction of inverse FFT to
687	// forward FFT is merged with multiplication of FFT components
688	// and last stage of Bluestein's transformation.
689	// 3. post-multiplication by Bluestein factors
690	//
691	n = plan.plan[entryoffset+1];
692	m = plan.plan[entryoffset+4];
693	offs = plan.plan[entryoffset+7];
694	for(i=stackptr+2n; i<=stackptr+2m-1; i++)
695	{
696	plan.stackbuf[i] = 0;
697	}
698	offsp = offs+2*m;
699	offsa = aoffset;
700	offsb = stackptr;
701	for(i=0; i<=n-1; i++)
702	{
703	bx = plan.precomputed[offsp+0];
704	by = plan.precomputed[offsp+1];
705	x = a[offsa+0];
706	y = a[offsa+1];
707	plan.stackbuf[offsb+0] = xbx-y-by;
708	plan.stackbuf[offsb+1] = x-by+ybx;
709	offsp = offsp+2;
710	offsa = offsa+2;
711	offsb = offsb+2;
712	}
713	ftbaseexecuteplanrec(ref plan.stackbuf, stackptr, ref plan, plan.plan[entryoffset+5], stackptr+22m);
714	offsb = stackptr;
715	offsp = offs;
716	for(i=0; i<=m-1; i++)
717	{
718	x = plan.stackbuf[offsb+0];
719	y = plan.stackbuf[offsb+1];
720	bx = plan.precomputed[offsp+0];
721	by = plan.precomputed[offsp+1];
722	plan.stackbuf[offsb+0] = xbx-yby;
723	plan.stackbuf[offsb+1] = -(xby+ybx);
724	offsb = offsb+2;
725	offsp = offsp+2;
726	}
727	ftbaseexecuteplanrec(ref plan.stackbuf, stackptr, ref plan, plan.plan[entryoffset+5], stackptr+22m);
728	offsb = stackptr;
729	offsp = offs+2*m;
730	offsa = aoffset;
731	for(i=0; i<=n-1; i++)
732	{
733	x = +(plan.stackbuf[offsb+0]/m);
734	y = -(plan.stackbuf[offsb+1]/m);
735	bx = plan.precomputed[offsp+0];
736	by = plan.precomputed[offsp+1];
737	a[offsa+0] = xbx-y-by;
738	a[offsa+1] = x-by+ybx;
739	offsp = offsp+2;
740	offsa = offsa+2;
741	offsb = offsb+2;
742	}
743	return;
744	}
745	}
746
747
748	/*************************************************************************
749	Returns good factorization N=N1*N2.
750
751	Usually N1<=N2 (but not always - small N's may be exception).
752	if N1<>1 then N2<>1.
753
754	Factorization is chosen depending on task type and codelets we have.
755
756	-- ALGLIB --
757	Copyright 01.05.2009 by Bochkanov Sergey
758	*************************************************************************/
759	public static void ftbasefactorize(int n,
760	int tasktype,
761	ref int n1,
762	ref int n2)
763	{
764	int j = 0;
765
766	n1 = 0;
767	n2 = 0;
768
769	//
770	// try to find good codelet
771	//
772	if( n1*n2!=n )
773	{
774	for(j=ftbasecodeletrecommended; j>=2; j--)
775	{
776	if( n%j==0 )
777	{
778	n1 = j;
779	n2 = n/j;
780	break;
781	}
782	}
783	}
784
785	//
786	// try to factorize N
787	//
788	if( n1*n2!=n )
789	{
790	for(j=ftbasecodeletrecommended+1; j<=n-1; j++)
791	{
792	if( n%j==0 )
793	{
794	n1 = j;
795	n2 = n/j;
796	break;
797	}
798	}
799	}
800
801	//
802	// looks like N is prime :(
803	//
804	if( n1*n2!=n )
805	{
806	n1 = 1;
807	n2 = n;
808	}
809
810	//
811	// normalize
812	//
813	if( n2==1 & n1!=1 )
814	{
815	n2 = n1;
816	n1 = 1;
817	}
818	}
819
820
821	/*************************************************************************
822	Is number smooth?
823
824	-- ALGLIB --
825	Copyright 01.05.2009 by Bochkanov Sergey
826	*************************************************************************/
827	public static bool ftbaseissmooth(int n)
828	{
829	bool result = new bool();
830	int i = 0;
831
832	for(i=2; i<=ftbasemaxsmoothfactor; i++)
833	{
834	while( n%i==0 )
835	{
836	n = n/i;
837	}
838	}
839	result = n==1;
840	return result;
841	}
842
843
844	/*************************************************************************
845	Returns smallest smooth (divisible only by 2, 3, 5) number that is greater
846	than or equal to max(N,2)
847
848	-- ALGLIB --
849	Copyright 01.05.2009 by Bochkanov Sergey
850	*************************************************************************/
851	public static int ftbasefindsmooth(int n)
852	{
853	int result = 0;
854	int best = 0;
855
856	best = 2;
857	while( best<n )
858	{
859	best = 2*best;
860	}
861	ftbasefindsmoothrec(n, 1, 2, ref best);
862	result = best;
863	return result;
864	}
865
866
867	/*************************************************************************
868	Returns smallest smooth (divisible only by 2, 3, 5) even number that is
869	greater than or equal to max(N,2)
870
871	-- ALGLIB --
872	Copyright 01.05.2009 by Bochkanov Sergey
873	*************************************************************************/
874	public static int ftbasefindsmootheven(int n)
875	{
876	int result = 0;
877	int best = 0;
878
879	best = 2;
880	while( best<n )
881	{
882	best = 2*best;
883	}
884	ftbasefindsmoothrec(n, 2, 2, ref best);
885	result = best;
886	return result;
887	}
888
889
890	/*************************************************************************
891	Returns estimate of FLOP count for the FFT.
892
893	It is only an estimate based on operations count for the PERFECT FFT
894	and relative inefficiency of the algorithm actually used.
895
896	N should be power of 2, estimates are badly wrong for non-power-of-2 N's.
897
898	-- ALGLIB --
899	Copyright 01.05.2009 by Bochkanov Sergey
900	*************************************************************************/
901	public static double ftbasegetflopestimate(int n)
902	{
903	double result = 0;
904
905	result = ftbaseinefficiencyfactor(4nMath.Log(n)/Math.Log(2)-6n+8);
906	return result;
907	}
908
909
910	/*************************************************************************
911	Recurrent subroutine for the FFTGeneratePlan:
912
913	PARAMETERS:
914	N plan size
915	IsReal whether input is real or not.
916	subroutine MUST NOT ignore this flag because real
917	inputs comes with non-initialized imaginary parts,
918	so ignoring this flag will result in corrupted output
919	HalfOut whether full output or only half of it from 0 to
920	floor(N/2) is needed. This flag may be ignored if
921	doing so will simplify calculations
922	Plan plan array
923	PlanSize size of used part (in integers)
924	PrecomputedSize size of precomputed array allocated yet
925	PlanArraySize plan array size (actual)
926	TmpMemSize temporary memory required size
927	BluesteinMemSize temporary memory required size
928
929	-- ALGLIB --
930	Copyright 01.05.2009 by Bochkanov Sergey
931	*************************************************************************/
932	private static void ftbasegenerateplanrec(int n,
933	int tasktype,
934	ref ftplan plan,
935	ref int plansize,
936	ref int precomputedsize,
937	ref int planarraysize,
938	ref int tmpmemsize,
939	ref int stackmemsize,
940	int stackptr)
941	{
942	int j = 0;
943	int k = 0;
944	int m = 0;
945	int n1 = 0;
946	int n2 = 0;
947	int esize = 0;
948	int entryoffset = 0;
949
950
951	//
952	// prepare
953	//
954	if( plansize+ftbaseplanentrysize>planarraysize )
955	{
956	fftarrayresize(ref plan.plan, ref planarraysize, 8*planarraysize);
957	}
958	entryoffset = plansize;
959	esize = ftbaseplanentrysize;
960	plansize = plansize+esize;
961
962	//
963	// if N=1, generate empty plan and exit
964	//
965	if( n==1 )
966	{
967	plan.plan[entryoffset+0] = esize;
968	plan.plan[entryoffset+1] = -1;
969	plan.plan[entryoffset+2] = -1;
970	plan.plan[entryoffset+3] = fftemptyplan;
971	plan.plan[entryoffset+4] = -1;
972	plan.plan[entryoffset+5] = -1;
973	plan.plan[entryoffset+6] = -1;
974	plan.plan[entryoffset+7] = -1;
975	return;
976	}
977
978	//
979	// generate plans
980	//
981	ftbasefactorize(n, tasktype, ref n1, ref n2);
982	if( tasktype==ftbasecffttask \| tasktype==ftbaserffttask )
983	{
984
985	//
986	// complex FFT plans
987	//
988	if( n1!=1 )
989	{
990
991	//
992	// Cooley-Tukey plan (real or complex)
993	//
994	// Note that child plans are COMPLEX
995	// (whether plan itself is complex or not).
996	//
997	tmpmemsize = Math.Max(tmpmemsize, 2n1n2);
998	plan.plan[entryoffset+0] = esize;
999	plan.plan[entryoffset+1] = n1;
1000	plan.plan[entryoffset+2] = n2;
1001	if( tasktype==ftbasecffttask )
1002	{
1003	plan.plan[entryoffset+3] = fftcooleytukeyplan;
1004	}
1005	else
1006	{
1007	plan.plan[entryoffset+3] = fftrealcooleytukeyplan;
1008	}
1009	plan.plan[entryoffset+4] = 0;
1010	plan.plan[entryoffset+5] = plansize;
1011	ftbasegenerateplanrec(n1, ftbasecffttask, ref plan, ref plansize, ref precomputedsize, ref planarraysize, ref tmpmemsize, ref stackmemsize, stackptr);
1012	plan.plan[entryoffset+6] = plansize;
1013	ftbasegenerateplanrec(n2, ftbasecffttask, ref plan, ref plansize, ref precomputedsize, ref planarraysize, ref tmpmemsize, ref stackmemsize, stackptr);
1014	plan.plan[entryoffset+7] = -1;
1015	return;
1016	}
1017	else
1018	{
1019	if( n==2 \| n==3 \| n==4 \| n==5 )
1020	{
1021
1022	//
1023	// hard-coded plan
1024	//
1025	plan.plan[entryoffset+0] = esize;
1026	plan.plan[entryoffset+1] = n1;
1027	plan.plan[entryoffset+2] = n2;
1028	plan.plan[entryoffset+3] = fftcodeletplan;
1029	plan.plan[entryoffset+4] = 0;
1030	plan.plan[entryoffset+5] = -1;
1031	plan.plan[entryoffset+6] = -1;
1032	plan.plan[entryoffset+7] = precomputedsize;
1033	if( n==3 )
1034	{
1035	precomputedsize = precomputedsize+2;
1036	}
1037	if( n==5 )
1038	{
1039	precomputedsize = precomputedsize+5;
1040	}
1041	return;
1042	}
1043	else
1044	{
1045
1046	//
1047	// Bluestein's plan
1048	//
1049	// Select such M that M>=2*N-1, M is composite, and M's
1050	// factors are 2, 3, 5
1051	//
1052	k = 2*n2-1;
1053	m = ftbasefindsmooth(k);
1054	tmpmemsize = Math.Max(tmpmemsize, 2*m);
1055	plan.plan[entryoffset+0] = esize;
1056	plan.plan[entryoffset+1] = n2;
1057	plan.plan[entryoffset+2] = -1;
1058	plan.plan[entryoffset+3] = fftbluesteinplan;
1059	plan.plan[entryoffset+4] = m;
1060	plan.plan[entryoffset+5] = plansize;
1061	stackptr = stackptr+22m;
1062	stackmemsize = Math.Max(stackmemsize, stackptr);
1063	ftbasegenerateplanrec(m, ftbasecffttask, ref plan, ref plansize, ref precomputedsize, ref planarraysize, ref tmpmemsize, ref stackmemsize, stackptr);
1064	stackptr = stackptr-22m;
1065	plan.plan[entryoffset+6] = -1;
1066	plan.plan[entryoffset+7] = precomputedsize;
1067	precomputedsize = precomputedsize+2m+2n;
1068	return;
1069	}
1070	}
1071	}
1072	if( tasktype==ftbaserfhttask )
1073	{
1074
1075	//
1076	// real FHT plans
1077	//
1078	if( n1!=1 )
1079	{
1080
1081	//
1082	// Cooley-Tukey plan
1083	//
1084	//
1085	tmpmemsize = Math.Max(tmpmemsize, 2n1n2);
1086	plan.plan[entryoffset+0] = esize;
1087	plan.plan[entryoffset+1] = n1;
1088	plan.plan[entryoffset+2] = n2;
1089	plan.plan[entryoffset+3] = fhtcooleytukeyplan;
1090	plan.plan[entryoffset+4] = 0;
1091	plan.plan[entryoffset+5] = plansize;
1092	ftbasegenerateplanrec(n1, tasktype, ref plan, ref plansize, ref precomputedsize, ref planarraysize, ref tmpmemsize, ref stackmemsize, stackptr);
1093	plan.plan[entryoffset+6] = plansize;
1094	ftbasegenerateplanrec(n2, tasktype, ref plan, ref plansize, ref precomputedsize, ref planarraysize, ref tmpmemsize, ref stackmemsize, stackptr);
1095	plan.plan[entryoffset+7] = -1;
1096	return;
1097	}
1098	else
1099	{
1100
1101	//
1102	// N2 plan
1103	//
1104	plan.plan[entryoffset+0] = esize;
1105	plan.plan[entryoffset+1] = n1;
1106	plan.plan[entryoffset+2] = n2;
1107	plan.plan[entryoffset+3] = fhtn2plan;
1108	plan.plan[entryoffset+4] = 0;
1109	plan.plan[entryoffset+5] = -1;
1110	plan.plan[entryoffset+6] = -1;
1111	plan.plan[entryoffset+7] = -1;
1112	if( n==2 \| n==3 \| n==4 \| n==5 )
1113	{
1114
1115	//
1116	// hard-coded plan
1117	//
1118	plan.plan[entryoffset+0] = esize;
1119	plan.plan[entryoffset+1] = n1;
1120	plan.plan[entryoffset+2] = n2;
1121	plan.plan[entryoffset+3] = fhtcodeletplan;
1122	plan.plan[entryoffset+4] = 0;
1123	plan.plan[entryoffset+5] = -1;
1124	plan.plan[entryoffset+6] = -1;
1125	plan.plan[entryoffset+7] = precomputedsize;
1126	if( n==3 )
1127	{
1128	precomputedsize = precomputedsize+2;
1129	}
1130	if( n==5 )
1131	{
1132	precomputedsize = precomputedsize+5;
1133	}
1134	return;
1135	}
1136	return;
1137	}
1138	}
1139	}
1140
1141
1142	/*************************************************************************
1143	Recurrent subroutine for precomputing FFT plans
1144
1145	-- ALGLIB --
1146	Copyright 01.05.2009 by Bochkanov Sergey
1147	*************************************************************************/
1148	private static void ftbaseprecomputeplanrec(ref ftplan plan,
1149	int entryoffset,
1150	int stackptr)
1151	{
1152	int i = 0;
1153	int j = 0;
1154	int idx = 0;
1155	int n1 = 0;
1156	int n2 = 0;
1157	int n = 0;
1158	int m = 0;
1159	int offs = 0;
1160	double v = 0;
1161	double[] emptyarray = new double[0];
1162	double bx = 0;
1163	double by = 0;
1164
1165	if( plan.plan[entryoffset+3]==fftcooleytukeyplan \| plan.plan[entryoffset+3]==fftrealcooleytukeyplan \| plan.plan[entryoffset+3]==fhtcooleytukeyplan )
1166	{
1167	ftbaseprecomputeplanrec(ref plan, plan.plan[entryoffset+5], stackptr);
1168	ftbaseprecomputeplanrec(ref plan, plan.plan[entryoffset+6], stackptr);
1169	return;
1170	}
1171	if( plan.plan[entryoffset+3]==fftcodeletplan \| plan.plan[entryoffset+3]==fhtcodeletplan )
1172	{
1173	n1 = plan.plan[entryoffset+1];
1174	n2 = plan.plan[entryoffset+2];
1175	n = n1*n2;
1176	if( n==3 )
1177	{
1178	offs = plan.plan[entryoffset+7];
1179	plan.precomputed[offs+0] = Math.Cos(2*Math.PI/3)-1;
1180	plan.precomputed[offs+1] = Math.Sin(2*Math.PI/3);
1181	return;
1182	}
1183	if( n==5 )
1184	{
1185	offs = plan.plan[entryoffset+7];
1186	v = 2*Math.PI/5;
1187	plan.precomputed[offs+0] = (Math.Cos(v)+Math.Cos(2*v))/2-1;
1188	plan.precomputed[offs+1] = (Math.Cos(v)-Math.Cos(2*v))/2;
1189	plan.precomputed[offs+2] = -Math.Sin(v);
1190	plan.precomputed[offs+3] = -(Math.Sin(v)+Math.Sin(2*v));
1191	plan.precomputed[offs+4] = Math.Sin(v)-Math.Sin(2*v);
1192	return;
1193	}
1194	}
1195	if( plan.plan[entryoffset+3]==fftbluesteinplan )
1196	{
1197	ftbaseprecomputeplanrec(ref plan, plan.plan[entryoffset+5], stackptr);
1198	n = plan.plan[entryoffset+1];
1199	m = plan.plan[entryoffset+4];
1200	offs = plan.plan[entryoffset+7];
1201	for(i=0; i<=2*m-1; i++)
1202	{
1203	plan.precomputed[offs+i] = 0;
1204	}
1205	for(i=0; i<=n-1; i++)
1206	{
1207	bx = Math.Cos(Math.PI*AP.Math.Sqr(i)/n);
1208	by = Math.Sin(Math.PI*AP.Math.Sqr(i)/n);
1209	plan.precomputed[offs+2*i+0] = bx;
1210	plan.precomputed[offs+2*i+1] = by;
1211	plan.precomputed[offs+2m+2i+0] = bx;
1212	plan.precomputed[offs+2m+2i+1] = by;
1213	if( i>0 )
1214	{
1215	plan.precomputed[offs+2*(m-i)+0] = bx;
1216	plan.precomputed[offs+2*(m-i)+1] = by;
1217	}
1218	}
1219	ftbaseexecuteplanrec(ref plan.precomputed, offs, ref plan, plan.plan[entryoffset+5], stackptr);
1220	return;
1221	}
1222	}
1223
1224
1225	/*************************************************************************
1226	Twiddle factors calculation
1227
1228	-- ALGLIB --
1229	Copyright 01.05.2009 by Bochkanov Sergey
1230	*************************************************************************/
1231	private static void ffttwcalc(ref double[] a,
1232	int aoffset,
1233	int n1,
1234	int n2)
1235	{
1236	int i = 0;
1237	int j = 0;
1238	int n = 0;
1239	int idx = 0;
1240	int offs = 0;
1241	double x = 0;
1242	double y = 0;
1243	double twxm1 = 0;
1244	double twy = 0;
1245	double twbasexm1 = 0;
1246	double twbasey = 0;
1247	double twrowxm1 = 0;
1248	double twrowy = 0;
1249	double tmpx = 0;
1250	double tmpy = 0;
1251	double v = 0;
1252
1253	n = n1*n2;
1254	v = -(2*Math.PI/n);
1255	twbasexm1 = -(2AP.Math.Sqr(Math.Sin(0.5v)));
1256	twbasey = Math.Sin(v);
1257	twrowxm1 = 0;
1258	twrowy = 0;
1259	for(i=0; i<=n2-1; i++)
1260	{
1261	twxm1 = 0;
1262	twy = 0;
1263	for(j=0; j<=n1-1; j++)
1264	{
1265	idx = i*n1+j;
1266	offs = aoffset+2*idx;
1267	x = a[offs+0];
1268	y = a[offs+1];
1269	tmpx = xtwxm1-ytwy;
1270	tmpy = xtwy+ytwxm1;
1271	a[offs+0] = x+tmpx;
1272	a[offs+1] = y+tmpy;
1273
1274	//
1275	// update Tw: Tw(new) = Tw(old)*TwRow
1276	//
1277	if( j<n1-1 )
1278	{
1279	if( j%ftbaseupdatetw==0 )
1280	{
1281	v = -(2Math.PIi*(j+1)/n);
1282	twxm1 = -(2AP.Math.Sqr(Math.Sin(0.5v)));
1283	twy = Math.Sin(v);
1284	}
1285	else
1286	{
1287	tmpx = twrowxm1+twxm1twrowxm1-twytwrowy;
1288	tmpy = twrowy+twxm1twrowy+twytwrowxm1;
1289	twxm1 = twxm1+tmpx;
1290	twy = twy+tmpy;
1291	}
1292	}
1293	}
1294
1295	//
1296	// update TwRow: TwRow(new) = TwRow(old)*TwBase
1297	//
1298	if( i<n2-1 )
1299	{
1300	if( j%ftbaseupdatetw==0 )
1301	{
1302	v = -(2Math.PI(i+1)/n);
1303	twrowxm1 = -(2AP.Math.Sqr(Math.Sin(0.5v)));
1304	twrowy = Math.Sin(v);
1305	}
1306	else
1307	{
1308	tmpx = twbasexm1+twrowxm1twbasexm1-twrowytwbasey;
1309	tmpy = twbasey+twrowxm1twbasey+twrowytwbasexm1;
1310	twrowxm1 = twrowxm1+tmpx;
1311	twrowy = twrowy+tmpy;
1312	}
1313	}
1314	}
1315	}
1316
1317
1318	/*************************************************************************
1319	Linear transpose: transpose complex matrix stored in 1-dimensional array
1320
1321	-- ALGLIB --
1322	Copyright 01.05.2009 by Bochkanov Sergey
1323	*************************************************************************/
1324	private static void internalcomplexlintranspose(ref double[] a,
1325	int m,
1326	int n,
1327	int astart,
1328	ref double[] buf)
1329	{
1330	int i_ = 0;
1331	int i1_ = 0;
1332
1333	ffticltrec(ref a, astart, n, ref buf, 0, m, m, n);
1334	i1_ = (0) - (astart);
1335	for(i_=astart; i_<=astart+2mn-1;i_++)
1336	{
1337	a[i_] = buf[i_+i1_];
1338	}
1339	}
1340
1341
1342	/*************************************************************************
1343	Linear transpose: transpose real matrix stored in 1-dimensional array
1344
1345	-- ALGLIB --
1346	Copyright 01.05.2009 by Bochkanov Sergey
1347	*************************************************************************/
1348	private static void internalreallintranspose(ref double[] a,
1349	int m,
1350	int n,
1351	int astart,
1352	ref double[] buf)
1353	{
1354	int i_ = 0;
1355	int i1_ = 0;
1356
1357	fftirltrec(ref a, astart, n, ref buf, 0, m, m, n);
1358	i1_ = (0) - (astart);
1359	for(i_=astart; i_<=astart+m*n-1;i_++)
1360	{
1361	a[i_] = buf[i_+i1_];
1362	}
1363	}
1364
1365
1366	/*************************************************************************
1367	Recurrent subroutine for a InternalComplexLinTranspose
1368
1369	Write A^T to B, where:
1370	* A is m*n complex matrix stored in array A as pairs of real/image values,
1371	beginning from AStart position, with AStride stride
1372	* B is n*m complex matrix stored in array B as pairs of real/image values,
1373	beginning from BStart position, with BStride stride
1374	stride is measured in complex numbers, i.e. in real/image pairs.
1375
1376	-- ALGLIB --
1377	Copyright 01.05.2009 by Bochkanov Sergey
1378	*************************************************************************/
1379	private static void ffticltrec(ref double[] a,
1380	int astart,
1381	int astride,
1382	ref double[] b,
1383	int bstart,
1384	int bstride,
1385	int m,
1386	int n)
1387	{
1388	int i = 0;
1389	int j = 0;
1390	int idx1 = 0;
1391	int idx2 = 0;
1392	int m2 = 0;
1393	int m1 = 0;
1394	int n1 = 0;
1395
1396	if( m==0 \| n==0 )
1397	{
1398	return;
1399	}
1400	if( Math.Max(m, n)<=8 )
1401	{
1402	m2 = 2*bstride;
1403	for(i=0; i<=m-1; i++)
1404	{
1405	idx1 = bstart+2*i;
1406	idx2 = astart+2iastride;
1407	for(j=0; j<=n-1; j++)
1408	{
1409	b[idx1+0] = a[idx2+0];
1410	b[idx1+1] = a[idx2+1];
1411	idx1 = idx1+m2;
1412	idx2 = idx2+2;
1413	}
1414	}
1415	return;
1416	}
1417	if( n>m )
1418	{
1419
1420	//
1421	// New partition:
1422	//
1423	// "A^T -> B" becomes "(A1 A2)^T -> ( B1 )
1424	// ( B2 )
1425	//
1426	n1 = n/2;
1427	if( n-n1>=8 & n1%8!=0 )
1428	{
1429	n1 = n1+(8-n1%8);
1430	}
1431	System.Diagnostics.Debug.Assert(n-n1>0);
1432	ffticltrec(ref a, astart, astride, ref b, bstart, bstride, m, n1);
1433	ffticltrec(ref a, astart+2n1, astride, ref b, bstart+2n1*bstride, bstride, m, n-n1);
1434	}
1435	else
1436	{
1437
1438	//
1439	// New partition:
1440	//
1441	// "A^T -> B" becomes "( A1 )^T -> ( B1 B2 )
1442	// ( A2 )
1443	//
1444	m1 = m/2;
1445	if( m-m1>=8 & m1%8!=0 )
1446	{
1447	m1 = m1+(8-m1%8);
1448	}
1449	System.Diagnostics.Debug.Assert(m-m1>0);
1450	ffticltrec(ref a, astart, astride, ref b, bstart, bstride, m1, n);
1451	ffticltrec(ref a, astart+2m1astride, astride, ref b, bstart+2*m1, bstride, m-m1, n);
1452	}
1453	}
1454
1455
1456	/*************************************************************************
1457	Recurrent subroutine for a InternalRealLinTranspose
1458
1459
1460	-- ALGLIB --
1461	Copyright 01.05.2009 by Bochkanov Sergey
1462	*************************************************************************/
1463	private static void fftirltrec(ref double[] a,
1464	int astart,
1465	int astride,
1466	ref double[] b,
1467	int bstart,
1468	int bstride,
1469	int m,
1470	int n)
1471	{
1472	int i = 0;
1473	int j = 0;
1474	int idx1 = 0;
1475	int idx2 = 0;
1476	int m1 = 0;
1477	int n1 = 0;
1478
1479	if( m==0 \| n==0 )
1480	{
1481	return;
1482	}
1483	if( Math.Max(m, n)<=8 )
1484	{
1485	for(i=0; i<=m-1; i++)
1486	{
1487	idx1 = bstart+i;
1488	idx2 = astart+i*astride;
1489	for(j=0; j<=n-1; j++)
1490	{
1491	b[idx1] = a[idx2];
1492	idx1 = idx1+bstride;
1493	idx2 = idx2+1;
1494	}
1495	}
1496	return;
1497	}
1498	if( n>m )
1499	{
1500
1501	//
1502	// New partition:
1503	//
1504	// "A^T -> B" becomes "(A1 A2)^T -> ( B1 )
1505	// ( B2 )
1506	//
1507	n1 = n/2;
1508	if( n-n1>=8 & n1%8!=0 )
1509	{
1510	n1 = n1+(8-n1%8);
1511	}
1512	System.Diagnostics.Debug.Assert(n-n1>0);
1513	fftirltrec(ref a, astart, astride, ref b, bstart, bstride, m, n1);
1514	fftirltrec(ref a, astart+n1, astride, ref b, bstart+n1*bstride, bstride, m, n-n1);
1515	}
1516	else
1517	{
1518
1519	//
1520	// New partition:
1521	//
1522	// "A^T -> B" becomes "( A1 )^T -> ( B1 B2 )
1523	// ( A2 )
1524	//
1525	m1 = m/2;
1526	if( m-m1>=8 & m1%8!=0 )
1527	{
1528	m1 = m1+(8-m1%8);
1529	}
1530	System.Diagnostics.Debug.Assert(m-m1>0);
1531	fftirltrec(ref a, astart, astride, ref b, bstart, bstride, m1, n);
1532	fftirltrec(ref a, astart+m1*astride, astride, ref b, bstart+m1, bstride, m-m1, n);
1533	}
1534	}
1535
1536
1537	/*************************************************************************
1538	recurrent subroutine for FFTFindSmoothRec
1539
1540	-- ALGLIB --
1541	Copyright 01.05.2009 by Bochkanov Sergey
1542	*************************************************************************/
1543	private static void ftbasefindsmoothrec(int n,
1544	int seed,
1545	int leastfactor,
1546	ref int best)
1547	{
1548	System.Diagnostics.Debug.Assert(ftbasemaxsmoothfactor<=5, "FTBaseFindSmoothRec: internal error!");
1549	if( seed>=n )
1550	{
1551	best = Math.Min(best, seed);
1552	return;
1553	}
1554	if( leastfactor<=2 )
1555	{
1556	ftbasefindsmoothrec(n, seed*2, 2, ref best);
1557	}
1558	if( leastfactor<=3 )
1559	{
1560	ftbasefindsmoothrec(n, seed*3, 3, ref best);
1561	}
1562	if( leastfactor<=5 )
1563	{
1564	ftbasefindsmoothrec(n, seed*5, 5, ref best);
1565	}
1566	}
1567
1568
1569	/*************************************************************************
1570	Internal subroutine: array resize
1571
1572	-- ALGLIB --
1573	Copyright 01.05.2009 by Bochkanov Sergey
1574	*************************************************************************/
1575	private static void fftarrayresize(ref int[] a,
1576	ref int asize,
1577	int newasize)
1578	{
1579	int[] tmp = new int[0];
1580	int i = 0;
1581
1582	tmp = new int[asize];
1583	for(i=0; i<=asize-1; i++)
1584	{
1585	tmp[i] = a[i];
1586	}
1587	a = new int[newasize];
1588	for(i=0; i<=asize-1; i++)
1589	{
1590	a[i] = tmp[i];
1591	}
1592	asize = newasize;
1593	}
1594
1595
1596	/*************************************************************************
1597	Reference FHT stub
1598	*************************************************************************/
1599	private static void reffht(ref double[] a,
1600	int n,
1601	int offs)
1602	{
1603	double[] buf = new double[0];
1604	int i = 0;
1605	int j = 0;
1606	double v = 0;
1607
1608	System.Diagnostics.Debug.Assert(n>0, "RefFHTR1D: incorrect N!");
1609	buf = new double[n];
1610	for(i=0; i<=n-1; i++)
1611	{
1612	v = 0;
1613	for(j=0; j<=n-1; j++)
1614	{
1615	v = v+a[offs+j](Math.Cos(2Math.PIij/n)+Math.Sin(2Math.PIi*j/n));
1616	}
1617	buf[i] = v;
1618	}
1619	for(i=0; i<=n-1; i++)
1620	{
1621	a[offs+i] = buf[i];
1622	}
1623	}
1624	}
1625	}

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