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

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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 estnorm
32	{
33	/*************************************************************************
34	Matrix norm estimation
35
36	The algorithm estimates the 1-norm of square matrix A on the assumption
37	that the multiplication of matrix A by the vector is available (the
38	iterative method is used). It is recommended to use this algorithm if it
39	is hard to calculate matrix elements explicitly (for example, when
40	estimating the inverse matrix norm).
41
42	The algorithm uses back communication for multiplying the vector by the
43	matrix. If KASE=0 after returning from a subroutine, its execution was
44	completed successfully, otherwise it is required to multiply the returned
45	vector by matrix A and call the subroutine again.
46
47	The DemoIterativeEstimateNorm subroutine shows a simple example.
48
49	Parameters:
50	N - size of matrix A.
51	V - vector. It is initialized by the subroutine on the first
52	call. It is then passed into it on repeated calls.
53	X - if KASE<>0, it contains the vector to be replaced by:
54	A * X, if KASE=1
55	A^T * X, if KASE=2
56	Array whose index ranges within [1..N].
57	ISGN - vector. It is initialized by the subroutine on the first
58	call. It is then passed into it on repeated calls.
59	EST - if KASE=0, it contains the lower boundary of the matrix
60	norm estimate.
61	KASE - on the first call, it should be equal to 0. After the last
62	return, it is equal to 0 (EST contains the matrix norm),
63	on intermediate returns it can be equal to 1 or 2 depending
64	on the operation to be performed on vector X.
65
66	-- LAPACK auxiliary routine (version 3.0) --
67	Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
68	Courant Institute, Argonne National Lab, and Rice University
69	February 29, 1992
70	*************************************************************************/
71	public static void iterativeestimate1norm(int n,
72	ref double[] v,
73	ref double[] x,
74	ref int[] isgn,
75	ref double est,
76	ref int kase)
77	{
78	int itmax = 0;
79	int i = 0;
80	double t = 0;
81	bool flg = new bool();
82	int positer = 0;
83	int posj = 0;
84	int posjlast = 0;
85	int posjump = 0;
86	int posaltsgn = 0;
87	int posestold = 0;
88	int postemp = 0;
89	int i_ = 0;
90
91	itmax = 5;
92	posaltsgn = n+1;
93	posestold = n+2;
94	postemp = n+3;
95	positer = n+1;
96	posj = n+2;
97	posjlast = n+3;
98	posjump = n+4;
99	if( kase==0 )
100	{
101	v = new double[n+3+1];
102	x = new double[n+1];
103	isgn = new int[n+4+1];
104	t = (double)(1)/(double)(n);
105	for(i=1; i<=n; i++)
106	{
107	x[i] = t;
108	}
109	kase = 1;
110	isgn[posjump] = 1;
111	return;
112	}
113
114	//
115	// ................ ENTRY (JUMP = 1)
116	// FIRST ITERATION. X HAS BEEN OVERWRITTEN BY A*X.
117	//
118	if( isgn[posjump]==1 )
119	{
120	if( n==1 )
121	{
122	v[1] = x[1];
123	est = Math.Abs(v[1]);
124	kase = 0;
125	return;
126	}
127	est = 0;
128	for(i=1; i<=n; i++)
129	{
130	est = est+Math.Abs(x[i]);
131	}
132	for(i=1; i<=n; i++)
133	{
134	if( (double)(x[i])>=(double)(0) )
135	{
136	x[i] = 1;
137	}
138	else
139	{
140	x[i] = -1;
141	}
142	isgn[i] = Math.Sign(x[i]);
143	}
144	kase = 2;
145	isgn[posjump] = 2;
146	return;
147	}
148
149	//
150	// ................ ENTRY (JUMP = 2)
151	// FIRST ITERATION. X HAS BEEN OVERWRITTEN BY TRANDPOSE(A)*X.
152	//
153	if( isgn[posjump]==2 )
154	{
155	isgn[posj] = 1;
156	for(i=2; i<=n; i++)
157	{
158	if( (double)(Math.Abs(x[i]))>(double)(Math.Abs(x[isgn[posj]])) )
159	{
160	isgn[posj] = i;
161	}
162	}
163	isgn[positer] = 2;
164
165	//
166	// MAIN LOOP - ITERATIONS 2,3,...,ITMAX.
167	//
168	for(i=1; i<=n; i++)
169	{
170	x[i] = 0;
171	}
172	x[isgn[posj]] = 1;
173	kase = 1;
174	isgn[posjump] = 3;
175	return;
176	}
177
178	//
179	// ................ ENTRY (JUMP = 3)
180	// X HAS BEEN OVERWRITTEN BY A*X.
181	//
182	if( isgn[posjump]==3 )
183	{
184	for(i_=1; i_<=n;i_++)
185	{
186	v[i_] = x[i_];
187	}
188	v[posestold] = est;
189	est = 0;
190	for(i=1; i<=n; i++)
191	{
192	est = est+Math.Abs(v[i]);
193	}
194	flg = false;
195	for(i=1; i<=n; i++)
196	{
197	if( (double)(x[i])>=(double)(0) & isgn[i]<0 \| (double)(x[i])<(double)(0) & isgn[i]>=0 )
198	{
199	flg = true;
200	}
201	}
202
203	//
204	// REPEATED SIGN VECTOR DETECTED, HENCE ALGORITHM HAS CONVERGED.
205	// OR MAY BE CYCLING.
206	//
207	if( !flg \| (double)(est)<=(double)(v[posestold]) )
208	{
209	v[posaltsgn] = 1;
210	for(i=1; i<=n; i++)
211	{
212	x[i] = v[posaltsgn]*(1+((double)(i-1))/((double)(n-1)));
213	v[posaltsgn] = -v[posaltsgn];
214	}
215	kase = 1;
216	isgn[posjump] = 5;
217	return;
218	}
219	for(i=1; i<=n; i++)
220	{
221	if( (double)(x[i])>=(double)(0) )
222	{
223	x[i] = 1;
224	isgn[i] = 1;
225	}
226	else
227	{
228	x[i] = -1;
229	isgn[i] = -1;
230	}
231	}
232	kase = 2;
233	isgn[posjump] = 4;
234	return;
235	}
236
237	//
238	// ................ ENTRY (JUMP = 4)
239	// X HAS BEEN OVERWRITTEN BY TRANDPOSE(A)*X.
240	//
241	if( isgn[posjump]==4 )
242	{
243	isgn[posjlast] = isgn[posj];
244	isgn[posj] = 1;
245	for(i=2; i<=n; i++)
246	{
247	if( (double)(Math.Abs(x[i]))>(double)(Math.Abs(x[isgn[posj]])) )
248	{
249	isgn[posj] = i;
250	}
251	}
252	if( (double)(x[isgn[posjlast]])!=(double)(Math.Abs(x[isgn[posj]])) & isgn[positer]<itmax )
253	{
254	isgn[positer] = isgn[positer]+1;
255	for(i=1; i<=n; i++)
256	{
257	x[i] = 0;
258	}
259	x[isgn[posj]] = 1;
260	kase = 1;
261	isgn[posjump] = 3;
262	return;
263	}
264
265	//
266	// ITERATION COMPLETE. FINAL STAGE.
267	//
268	v[posaltsgn] = 1;
269	for(i=1; i<=n; i++)
270	{
271	x[i] = v[posaltsgn]*(1+((double)(i-1))/((double)(n-1)));
272	v[posaltsgn] = -v[posaltsgn];
273	}
274	kase = 1;
275	isgn[posjump] = 5;
276	return;
277	}
278
279	//
280	// ................ ENTRY (JUMP = 5)
281	// X HAS BEEN OVERWRITTEN BY A*X.
282	//
283	if( isgn[posjump]==5 )
284	{
285	v[postemp] = 0;
286	for(i=1; i<=n; i++)
287	{
288	v[postemp] = v[postemp]+Math.Abs(x[i]);
289	}
290	v[postemp] = 2v[postemp]/(3n);
291	if( (double)(v[postemp])>(double)(est) )
292	{
293	for(i_=1; i_<=n;i_++)
294	{
295	v[i_] = x[i_];
296	}
297	est = v[postemp];
298	}
299	kase = 0;
300	return;
301	}
302	}
303
304
305	/*************************************************************************
306	Example of usage of an IterativeEstimateNorm subroutine
307
308	Input parameters:
309	A - matrix.
310	Array whose indexes range within [1..N, 1..N].
311
312	Return:
313	Matrix norm estimated by the subroutine.
314
315	-- ALGLIB --
316	Copyright 2005 by Bochkanov Sergey
317	*************************************************************************/
318	public static double demoiterativeestimate1norm(ref double[,] a,
319	int n)
320	{
321	double result = 0;
322	int i = 0;
323	double s = 0;
324	double[] x = new double[0];
325	double[] t = new double[0];
326	double[] v = new double[0];
327	int[] iv = new int[0];
328	int kase = 0;
329	int i_ = 0;
330
331	kase = 0;
332	t = new double[n+1];
333	iterativeestimate1norm(n, ref v, ref x, ref iv, ref result, ref kase);
334	while( kase!=0 )
335	{
336	if( kase==1 )
337	{
338	for(i=1; i<=n; i++)
339	{
340	s = 0.0;
341	for(i_=1; i_<=n;i_++)
342	{
343	s += a[i,i_]*x[i_];
344	}
345	t[i] = s;
346	}
347	}
348	else
349	{
350	for(i=1; i<=n; i++)
351	{
352	s = 0.0;
353	for(i_=1; i_<=n;i_++)
354	{
355	s += a[i_,i]*x[i_];
356	}
357	t[i] = s;
358	}
359	}
360	for(i_=1; i_<=n;i_++)
361	{
362	x[i_] = t[i_];
363	}
364	iterativeestimate1norm(n, ref v, ref x, ref iv, ref result, ref kase);
365	}
366	return result;
367	}
368	}
369	}

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