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source: trunk/sources/HeuristicLab.ExtLibs/HeuristicLab.ALGLIB/2.1.2.2591/ALGLIB-2.1.2.2591/spdinverse.cs @ 2645

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Last change on this file since 2645 was 2645, checked in by mkommend, 14 years ago
extracted external libraries and adapted dependent plugins (ticket #837)
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1	/*************************************************************************
2	Copyright (c) 1992-2007 The University of Tennessee. All rights reserved.
3
4	Contributors:
5	* Sergey Bochkanov (ALGLIB project). Translation from FORTRAN to
6	pseudocode.
7
8	See subroutines comments for additional copyrights.
9
10	>>> SOURCE LICENSE >>>
11	This program is free software; you can redistribute it and/or modify
12	it under the terms of the GNU General Public License as published by
13	the Free Software Foundation (www.fsf.org); either version 2 of the
14	License, or (at your option) any later version.
15
16	This program is distributed in the hope that it will be useful,
17	but WITHOUT ANY WARRANTY; without even the implied warranty of
18	MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
19	GNU General Public License for more details.
20
21	A copy of the GNU General Public License is available at
22	http://www.fsf.org/licensing/licenses
23
24	>>> END OF LICENSE >>>
25	*************************************************************************/
26
27	using System;
28
29	namespace alglib
30	{
31	public class spdinverse
32	{
33	/*************************************************************************
34	Inversion of a symmetric positive definite matrix which is given
35	by Cholesky decomposition.
36
37	Input parameters:
38	A - Cholesky decomposition of the matrix to be inverted:
39	A=UU or A = LL'.
40	Output of CholeskyDecomposition subroutine.
41	Array with elements [0..N-1, 0..N-1].
42	N - size of matrix A.
43	IsUpper storage format.
44	If IsUpper = True, then matrix A is given as A = U'*U
45	(matrix contains upper triangle).
46	Similarly, if IsUpper = False, then A = L*L'.
47
48	Output parameters:
49	A - upper or lower triangle of symmetric matrix A^-1, depending
50	on the value of IsUpper.
51
52	Result:
53	True, if the inversion succeeded.
54	False, if matrix A contains zero elements on its main diagonal.
55	Matrix A could not be inverted.
56
57	The algorithm is the modification of DPOTRI and DLAUU2 subroutines from
58	LAPACK library.
59	*************************************************************************/
60	public static bool spdmatrixcholeskyinverse(ref double[,] a,
61	int n,
62	bool isupper)
63	{
64	bool result = new bool();
65	int i = 0;
66	int j = 0;
67	int k = 0;
68	double v = 0;
69	double ajj = 0;
70	double aii = 0;
71	double[] t = new double[0];
72	double[,] a1 = new double[0,0];
73	int i_ = 0;
74
75	result = true;
76
77	//
78	// Test the input parameters.
79	//
80	t = new double[n-1+1];
81	if( isupper )
82	{
83
84	//
85	// Compute inverse of upper triangular matrix.
86	//
87	for(j=0; j<=n-1; j++)
88	{
89	if( (double)(a[j,j])==(double)(0) )
90	{
91	result = false;
92	return result;
93	}
94	a[j,j] = 1/a[j,j];
95	ajj = -a[j,j];
96
97	//
98	// Compute elements 1:j-1 of j-th column.
99	//
100	for(i_=0; i_<=j-1;i_++)
101	{
102	t[i_] = a[i_,j];
103	}
104	for(i=0; i<=j-1; i++)
105	{
106	v = 0.0;
107	for(i_=i; i_<=j-1;i_++)
108	{
109	v += a[i,i_]*t[i_];
110	}
111	a[i,j] = v;
112	}
113	for(i_=0; i_<=j-1;i_++)
114	{
115	a[i_,j] = ajj*a[i_,j];
116	}
117	}
118
119	//
120	// InvA = InvU * InvU'
121	//
122	for(i=0; i<=n-1; i++)
123	{
124	aii = a[i,i];
125	if( i<n-1 )
126	{
127	v = 0.0;
128	for(i_=i; i_<=n-1;i_++)
129	{
130	v += a[i,i_]*a[i,i_];
131	}
132	a[i,i] = v;
133	for(k=0; k<=i-1; k++)
134	{
135	v = 0.0;
136	for(i_=i+1; i_<=n-1;i_++)
137	{
138	v += a[k,i_]*a[i,i_];
139	}
140	a[k,i] = a[k,i]*aii+v;
141	}
142	}
143	else
144	{
145	for(i_=0; i_<=i;i_++)
146	{
147	a[i_,i] = aii*a[i_,i];
148	}
149	}
150	}
151	}
152	else
153	{
154
155	//
156	// Compute inverse of lower triangular matrix.
157	//
158	for(j=n-1; j>=0; j--)
159	{
160	if( (double)(a[j,j])==(double)(0) )
161	{
162	result = false;
163	return result;
164	}
165	a[j,j] = 1/a[j,j];
166	ajj = -a[j,j];
167	if( j<n-1 )
168	{
169
170	//
171	// Compute elements j+1:n of j-th column.
172	//
173	for(i_=j+1; i_<=n-1;i_++)
174	{
175	t[i_] = a[i_,j];
176	}
177	for(i=j+1+1; i<=n; i++)
178	{
179	v = 0.0;
180	for(i_=j+1; i_<=i-1;i_++)
181	{
182	v += a[i-1,i_]*t[i_];
183	}
184	a[i-1,j] = v;
185	}
186	for(i_=j+1; i_<=n-1;i_++)
187	{
188	a[i_,j] = ajj*a[i_,j];
189	}
190	}
191	}
192
193	//
194	// InvA = InvL' * InvL
195	//
196	for(i=0; i<=n-1; i++)
197	{
198	aii = a[i,i];
199	if( i<n-1 )
200	{
201	v = 0.0;
202	for(i_=i; i_<=n-1;i_++)
203	{
204	v += a[i_,i]*a[i_,i];
205	}
206	a[i,i] = v;
207	for(k=0; k<=i-1; k++)
208	{
209	v = 0.0;
210	for(i_=i+1; i_<=n-1;i_++)
211	{
212	v += a[i_,k]*a[i_,i];
213	}
214	a[i,k] = aii*a[i,k]+v;
215	}
216	}
217	else
218	{
219	for(i_=0; i_<=i;i_++)
220	{
221	a[i,i_] = aii*a[i,i_];
222	}
223	}
224	}
225	}
226	return result;
227	}
228
229
230	/*************************************************************************
231	Inversion of a symmetric positive definite matrix.
232
233	Given an upper or lower triangle of a symmetric positive definite matrix,
234	the algorithm generates matrix A^-1 and saves the upper or lower triangle
235	depending on the input.
236
237	Input parameters:
238	A - matrix to be inverted (upper or lower triangle).
239	Array with elements [0..N-1,0..N-1].
240	N - size of matrix A.
241	IsUpper - storage format.
242	If IsUpper = True, then the upper triangle of matrix A is
243	given, otherwise the lower triangle is given.
244
245	Output parameters:
246	A - inverse of matrix A.
247	Array with elements [0..N-1,0..N-1].
248	If IsUpper = True, then the upper triangle of matrix A^-1
249	is used, and the elements below the main diagonal are not
250	used nor changed. The same applies if IsUpper = False.
251
252	Result:
253	True, if the matrix is positive definite.
254	False, if the matrix is not positive definite (and it could not be
255	inverted by this algorithm).
256	*************************************************************************/
257	public static bool spdmatrixinverse(ref double[,] a,
258	int n,
259	bool isupper)
260	{
261	bool result = new bool();
262
263	result = false;
264	if( cholesky.spdmatrixcholesky(ref a, n, isupper) )
265	{
266	if( spdmatrixcholeskyinverse(ref a, n, isupper) )
267	{
268	result = true;
269	}
270	}
271	return result;
272	}
273
274
275	public static bool inversecholesky(ref double[,] a,
276	int n,
277	bool isupper)
278	{
279	bool result = new bool();
280	int i = 0;
281	int j = 0;
282	int k = 0;
283	int nmj = 0;
284	int jm1 = 0;
285	int jp1 = 0;
286	int ip1 = 0;
287	double v = 0;
288	double ajj = 0;
289	double aii = 0;
290	double[] t = new double[0];
291	double[] d = new double[0];
292	int i_ = 0;
293
294	result = true;
295
296	//
297	// Test the input parameters.
298	//
299	t = new double[n+1];
300	d = new double[n+1];
301	if( isupper )
302	{
303
304	//
305	// Compute inverse of upper triangular matrix.
306	//
307	for(j=1; j<=n; j++)
308	{
309	if( (double)(a[j,j])==(double)(0) )
310	{
311	result = false;
312	return result;
313	}
314	jm1 = j-1;
315	a[j,j] = 1/a[j,j];
316	ajj = -a[j,j];
317
318	//
319	// Compute elements 1:j-1 of j-th column.
320	//
321	for(i_=1; i_<=jm1;i_++)
322	{
323	t[i_] = a[i_,j];
324	}
325	for(i=1; i<=j-1; i++)
326	{
327	v = 0.0;
328	for(i_=i; i_<=jm1;i_++)
329	{
330	v += a[i,i_]*a[i_,j];
331	}
332	a[i,j] = v;
333	}
334	for(i_=1; i_<=jm1;i_++)
335	{
336	a[i_,j] = ajj*a[i_,j];
337	}
338	}
339
340	//
341	// InvA = InvU * InvU'
342	//
343	for(i=1; i<=n; i++)
344	{
345	aii = a[i,i];
346	if( i<n )
347	{
348	v = 0.0;
349	for(i_=i; i_<=n;i_++)
350	{
351	v += a[i,i_]*a[i,i_];
352	}
353	a[i,i] = v;
354	ip1 = i+1;
355	for(k=1; k<=i-1; k++)
356	{
357	v = 0.0;
358	for(i_=ip1; i_<=n;i_++)
359	{
360	v += a[k,i_]*a[i,i_];
361	}
362	a[k,i] = a[k,i]*aii+v;
363	}
364	}
365	else
366	{
367	for(i_=1; i_<=i;i_++)
368	{
369	a[i_,i] = aii*a[i_,i];
370	}
371	}
372	}
373	}
374	else
375	{
376
377	//
378	// Compute inverse of lower triangular matrix.
379	//
380	for(j=n; j>=1; j--)
381	{
382	if( (double)(a[j,j])==(double)(0) )
383	{
384	result = false;
385	return result;
386	}
387	a[j,j] = 1/a[j,j];
388	ajj = -a[j,j];
389	if( j<n )
390	{
391
392	//
393	// Compute elements j+1:n of j-th column.
394	//
395	nmj = n-j;
396	jp1 = j+1;
397	for(i_=jp1; i_<=n;i_++)
398	{
399	t[i_] = a[i_,j];
400	}
401	for(i=j+1; i<=n; i++)
402	{
403	v = 0.0;
404	for(i_=jp1; i_<=i;i_++)
405	{
406	v += a[i,i_]*t[i_];
407	}
408	a[i,j] = v;
409	}
410	for(i_=jp1; i_<=n;i_++)
411	{
412	a[i_,j] = ajj*a[i_,j];
413	}
414	}
415	}
416
417	//
418	// InvA = InvL' * InvL
419	//
420	for(i=1; i<=n; i++)
421	{
422	aii = a[i,i];
423	if( i<n )
424	{
425	v = 0.0;
426	for(i_=i; i_<=n;i_++)
427	{
428	v += a[i_,i]*a[i_,i];
429	}
430	a[i,i] = v;
431	ip1 = i+1;
432	for(k=1; k<=i-1; k++)
433	{
434	v = 0.0;
435	for(i_=ip1; i_<=n;i_++)
436	{
437	v += a[i_,k]*a[i_,i];
438	}
439	a[i,k] = aii*a[i,k]+v;
440	}
441	}
442	else
443	{
444	for(i_=1; i_<=i;i_++)
445	{
446	a[i,i_] = aii*a[i,i_];
447	}
448	}
449	}
450	}
451	return result;
452	}
453
454
455	public static bool inversesymmetricpositivedefinite(ref double[,] a,
456	int n,
457	bool isupper)
458	{
459	bool result = new bool();
460
461	result = false;
462	if( cholesky.choleskydecomposition(ref a, n, isupper) )
463	{
464	if( inversecholesky(ref a, n, isupper) )
465	{
466	result = true;
467	}
468	}
469	return result;
470	}
471	}
472	}

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