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source: trunk/sources/ALGLIB/minlm.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: 35.2 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 minlm
26	{
27	public struct lmstate
28	{
29	public bool wrongparams;
30	public int n;
31	public int m;
32	public double epsf;
33	public double epsx;
34	public int maxits;
35	public int flags;
36	public int usermode;
37	public double[] x;
38	public double f;
39	public double[] fi;
40	public double[,] j;
41	public double[,] h;
42	public double[] g;
43	public bool needf;
44	public bool needfg;
45	public bool needfgh;
46	public bool needfij;
47	public bool xupdated;
48	public lbfgs.lbfgsstate internalstate;
49	public lbfgs.lbfgsreport internalrep;
50	public double[] xprec;
51	public double[] xbase;
52	public double[] xdir;
53	public double[] gbase;
54	public double[,] rawmodel;
55	public double[,] model;
56	public double[] work;
57	public AP.rcommstate rstate;
58	public int repiterationscount;
59	public int repterminationtype;
60	public int repnfunc;
61	public int repnjac;
62	public int repngrad;
63	public int repnhess;
64	public int repncholesky;
65	};
66
67
68	public struct lmreport
69	{
70	public int iterationscount;
71	public int terminationtype;
72	public int nfunc;
73	public int njac;
74	public int ngrad;
75	public int nhess;
76	public int ncholesky;
77	};
78
79
80
81
82	public const int lmmodefj = 0;
83	public const int lmmodefgj = 1;
84	public const int lmmodefgh = 2;
85	public const int lmflagnoprelbfgs = 1;
86	public const int lmflagnointlbfgs = 2;
87	public const int lmprelbfgsm = 5;
88	public const int lmintlbfgsits = 5;
89	public const int lbfgsnorealloc = 1;
90
91
92	/*************************************************************************
93	LEVENBERG-MARQUARDT-LIKE METHOD FOR NON-LINEAR OPTIMIZATION
94
95	Optimization using function gradient and Hessian. Algorithm - Levenberg-
96	Marquardt modification with L-BFGS pre-optimization and internal
97	pre-conditioned L-BFGS optimization after each Levenberg-Marquardt step.
98
99	Function F has general form (not "sum-of-squares"):
100
101	F = F(x[0], ..., x[n-1])
102
103	EXAMPLE
104
105	See HTML-documentation.
106
107	INPUT PARAMETERS:
108	N - dimension, N>1
109	X - initial solution, array[0..N-1]
110	EpsF - stopping criterion. Algorithm stops if
111	\|F(k+1)-F(k)\| <= EpsF*max{\|F(k)\|, \|F(k+1)\|, 1}
112	EpsX - stopping criterion. Algorithm stops if
113	\|X(k+1)-X(k)\| <= EpsX*(1+\|X(k)\|)
114	MaxIts - stopping criterion. Algorithm stops after MaxIts iterations.
115	MaxIts=0 means no stopping criterion.
116
117	OUTPUT PARAMETERS:
118	State - structure which stores algorithm state between subsequent
119	calls of MinLMIteration. Used for reverse communication.
120	This structure should be passed to MinLMIteration subroutine.
121
122	See also MinLMIteration, MinLMResults.
123
124	NOTE
125
126	Passing EpsF=0, EpsX=0 and MaxIts=0 (simultaneously) will lead to automatic
127	stopping criterion selection (small EpsX).
128
129	-- ALGLIB --
130	Copyright 30.03.2009 by Bochkanov Sergey
131	*************************************************************************/
132	public static void minlmfgh(int n,
133	ref double[] x,
134	double epsf,
135	double epsx,
136	int maxits,
137	ref lmstate state)
138	{
139	int i_ = 0;
140
141
142	//
143	// Prepare RComm
144	//
145	state.rstate.ia = new int[3+1];
146	state.rstate.ba = new bool[0+1];
147	state.rstate.ra = new double[8+1];
148	state.rstate.stage = -1;
149
150	//
151	// prepare internal structures
152	//
153	lmprepare(n, 0, true, ref state);
154
155	//
156	// initialize, check parameters
157	//
158	state.xupdated = false;
159	state.n = n;
160	state.m = 0;
161	state.epsf = epsf;
162	state.epsx = epsx;
163	state.maxits = maxits;
164	state.flags = 0;
165	if( (double)(state.epsf)==(double)(0) & (double)(state.epsx)==(double)(0) & state.maxits==0 )
166	{
167	state.epsx = 1.0E-6;
168	}
169	state.usermode = lmmodefgh;
170	state.wrongparams = false;
171	if( n<1 \| (double)(epsf)<(double)(0) \| (double)(epsx)<(double)(0) \| maxits<0 )
172	{
173	state.wrongparams = true;
174	return;
175	}
176	for(i_=0; i_<=n-1;i_++)
177	{
178	state.x[i_] = x[i_];
179	}
180	}
181
182
183	/*************************************************************************
184	LEVENBERG-MARQUARDT-LIKE METHOD FOR NON-LINEAR OPTIMIZATION
185
186	Optimization using function gradient and Jacobian. Algorithm - Levenberg-
187	Marquardt modification with L-BFGS pre-optimization and internal
188	pre-conditioned L-BFGS optimization after each Levenberg-Marquardt step.
189
190	Function F is represented as sum of squares:
191
192	F = f[0]^2(x[0],...,x[n-1]) + ... + f[m-1]^2(x[0],...,x[n-1])
193
194	EXAMPLE
195
196	See HTML-documentation.
197
198	INPUT PARAMETERS:
199	N - dimension, N>1
200	M - number of functions f[i]
201	X - initial solution, array[0..N-1]
202	EpsF - stopping criterion. Algorithm stops if
203	\|F(k+1)-F(k)\| <= EpsF*max{\|F(k)\|, \|F(k+1)\|, 1}
204	EpsX - stopping criterion. Algorithm stops if
205	\|X(k+1)-X(k)\| <= EpsX*(1+\|X(k)\|)
206	MaxIts - stopping criterion. Algorithm stops after MaxIts iterations.
207	MaxIts=0 means no stopping criterion.
208
209	OUTPUT PARAMETERS:
210	State - structure which stores algorithm state between subsequent
211	calls of MinLMIteration. Used for reverse communication.
212	This structure should be passed to MinLMIteration subroutine.
213
214	See also MinLMIteration, MinLMResults.
215
216	NOTE
217
218	Passing EpsF=0, EpsX=0 and MaxIts=0 (simultaneously) will lead to automatic
219	stopping criterion selection (small EpsX).
220
221	-- ALGLIB --
222	Copyright 30.03.2009 by Bochkanov Sergey
223	*************************************************************************/
224	public static void minlmfgj(int n,
225	int m,
226	ref double[] x,
227	double epsf,
228	double epsx,
229	int maxits,
230	ref lmstate state)
231	{
232	int i_ = 0;
233
234
235	//
236	// Prepare RComm
237	//
238	state.rstate.ia = new int[3+1];
239	state.rstate.ba = new bool[0+1];
240	state.rstate.ra = new double[8+1];
241	state.rstate.stage = -1;
242
243	//
244	// prepare internal structures
245	//
246	lmprepare(n, m, true, ref state);
247
248	//
249	// initialize, check parameters
250	//
251	state.xupdated = false;
252	state.n = n;
253	state.m = m;
254	state.epsf = epsf;
255	state.epsx = epsx;
256	state.maxits = maxits;
257	state.flags = 0;
258	if( (double)(state.epsf)==(double)(0) & (double)(state.epsx)==(double)(0) & state.maxits==0 )
259	{
260	state.epsx = 1.0E-6;
261	}
262	state.usermode = lmmodefgj;
263	state.wrongparams = false;
264	if( n<1 \| m<1 \| (double)(epsf)<(double)(0) \| (double)(epsx)<(double)(0) \| maxits<0 )
265	{
266	state.wrongparams = true;
267	return;
268	}
269	for(i_=0; i_<=n-1;i_++)
270	{
271	state.x[i_] = x[i_];
272	}
273	}
274
275
276	/*************************************************************************
277	CLASSIC LEVENBERG-MARQUARDT METHOD FOR NON-LINEAR OPTIMIZATION
278
279	Optimization using Jacobi matrix. Algorithm - classic Levenberg-Marquardt
280	method.
281
282	Function F is represented as sum of squares:
283
284	F = f[0]^2(x[0],...,x[n-1]) + ... + f[m-1]^2(x[0],...,x[n-1])
285
286	EXAMPLE
287
288	See HTML-documentation.
289
290	INPUT PARAMETERS:
291	N - dimension, N>1
292	M - number of functions f[i]
293	X - initial solution, array[0..N-1]
294	EpsF - stopping criterion. Algorithm stops if
295	\|F(k+1)-F(k)\| <= EpsF*max{\|F(k)\|, \|F(k+1)\|, 1}
296	EpsX - stopping criterion. Algorithm stops if
297	\|X(k+1)-X(k)\| <= EpsX*(1+\|X(k)\|)
298	MaxIts - stopping criterion. Algorithm stops after MaxIts iterations.
299	MaxIts=0 means no stopping criterion.
300
301	OUTPUT PARAMETERS:
302	State - structure which stores algorithm state between subsequent
303	calls of MinLMIteration. Used for reverse communication.
304	This structure should be passed to MinLMIteration subroutine.
305
306	See also MinLMIteration, MinLMResults.
307
308	NOTE
309
310	Passing EpsF=0, EpsX=0 and MaxIts=0 (simultaneously) will lead to automatic
311	stopping criterion selection (small EpsX).
312
313	-- ALGLIB --
314	Copyright 30.03.2009 by Bochkanov Sergey
315	*************************************************************************/
316	public static void minlmfj(int n,
317	int m,
318	ref double[] x,
319	double epsf,
320	double epsx,
321	int maxits,
322	ref lmstate state)
323	{
324	int i_ = 0;
325
326
327	//
328	// Prepare RComm
329	//
330	state.rstate.ia = new int[3+1];
331	state.rstate.ba = new bool[0+1];
332	state.rstate.ra = new double[8+1];
333	state.rstate.stage = -1;
334
335	//
336	// prepare internal structures
337	//
338	lmprepare(n, m, true, ref state);
339
340	//
341	// initialize, check parameters
342	//
343	state.xupdated = false;
344	state.n = n;
345	state.m = m;
346	state.epsf = epsf;
347	state.epsx = epsx;
348	state.maxits = maxits;
349	state.flags = 0;
350	if( (double)(state.epsf)==(double)(0) & (double)(state.epsx)==(double)(0) & state.maxits==0 )
351	{
352	state.epsx = 1.0E-6;
353	}
354	state.usermode = lmmodefj;
355	state.wrongparams = false;
356	if( n<1 \| m<1 \| (double)(epsf)<(double)(0) \| (double)(epsx)<(double)(0) \| maxits<0 )
357	{
358	state.wrongparams = true;
359	return;
360	}
361	for(i_=0; i_<=n-1;i_++)
362	{
363	state.x[i_] = x[i_];
364	}
365	}
366
367
368	/*************************************************************************
369	One Levenberg-Marquardt iteration.
370
371	Called after inialization of State structure with MinLMXXX subroutine.
372	See HTML docs for examples.
373
374	Input parameters:
375	State - structure which stores algorithm state between subsequent
376	calls and which is used for reverse communication. Must be
377	initialized with MinLMXXX call first.
378
379	If subroutine returned False, iterative algorithm has converged.
380
381	If subroutine returned True, then:
382	* if State.NeedF=True, - function value F at State.X[0..N-1]
383	is required
384	* if State.NeedFG=True - function value F and gradient G
385	are required
386	* if State.NeedFiJ=True - function vector f[i] and Jacobi matrix J
387	are required
388	* if State.NeedFGH=True - function value F, gradient G and Hesian H
389	are required
390
391	One and only one of this fields can be set at time.
392
393	Results are stored:
394	* function value - in LMState.F
395	* gradient - in LMState.G[0..N-1]
396	* Jacobi matrix - in LMState.J[0..M-1,0..N-1]
397	* Hessian - in LMState.H[0..N-1,0..N-1]
398
399	-- ALGLIB --
400	Copyright 10.03.2009 by Bochkanov Sergey
401	*************************************************************************/
402	public static bool minlmiteration(ref lmstate state)
403	{
404	bool result = new bool();
405	int n = 0;
406	int m = 0;
407	int i = 0;
408	double xnorm = 0;
409	double stepnorm = 0;
410	bool spd = new bool();
411	double fbase = 0;
412	double fnew = 0;
413	double lambda = 0;
414	double nu = 0;
415	double lambdaup = 0;
416	double lambdadown = 0;
417	int lbfgsflags = 0;
418	double v = 0;
419	int i_ = 0;
420
421
422	//
423	// Reverse communication preparations
424	// I know it looks ugly, but it works the same way
425	// anywhere from C++ to Python.
426	//
427	// This code initializes locals by:
428	// * random values determined during code
429	// generation - on first subroutine call
430	// * values from previous call - on subsequent calls
431	//
432	if( state.rstate.stage>=0 )
433	{
434	n = state.rstate.ia[0];
435	m = state.rstate.ia[1];
436	i = state.rstate.ia[2];
437	lbfgsflags = state.rstate.ia[3];
438	spd = state.rstate.ba[0];
439	xnorm = state.rstate.ra[0];
440	stepnorm = state.rstate.ra[1];
441	fbase = state.rstate.ra[2];
442	fnew = state.rstate.ra[3];
443	lambda = state.rstate.ra[4];
444	nu = state.rstate.ra[5];
445	lambdaup = state.rstate.ra[6];
446	lambdadown = state.rstate.ra[7];
447	v = state.rstate.ra[8];
448	}
449	else
450	{
451	n = -983;
452	m = -989;
453	i = -834;
454	lbfgsflags = 900;
455	spd = true;
456	xnorm = 364;
457	stepnorm = 214;
458	fbase = -338;
459	fnew = -686;
460	lambda = 912;
461	nu = 585;
462	lambdaup = 497;
463	lambdadown = -271;
464	v = -581;
465	}
466	if( state.rstate.stage==0 )
467	{
468	goto lbl_0;
469	}
470	if( state.rstate.stage==1 )
471	{
472	goto lbl_1;
473	}
474	if( state.rstate.stage==2 )
475	{
476	goto lbl_2;
477	}
478	if( state.rstate.stage==3 )
479	{
480	goto lbl_3;
481	}
482	if( state.rstate.stage==4 )
483	{
484	goto lbl_4;
485	}
486	if( state.rstate.stage==5 )
487	{
488	goto lbl_5;
489	}
490	if( state.rstate.stage==6 )
491	{
492	goto lbl_6;
493	}
494
495	//
496	// Routine body
497	//
498	System.Diagnostics.Debug.Assert(state.usermode==lmmodefj \| state.usermode==lmmodefgj \| state.usermode==lmmodefgh, "LM: internal error");
499	if( state.wrongparams )
500	{
501	state.repterminationtype = -1;
502	result = false;
503	return result;
504	}
505
506	//
507	// prepare params
508	//
509	n = state.n;
510	m = state.m;
511	lambdaup = 10;
512	lambdadown = 0.3;
513	nu = 2;
514	lbfgsflags = 0;
515
516	//
517	// if we have F and G
518	//
519	if( ! ((state.usermode==lmmodefgj \| state.usermode==lmmodefgh) & state.flags/lmflagnoprelbfgs%2==0) )
520	{
521	goto lbl_7;
522	}
523
524	//
525	// First stage of the hybrid algorithm: LBFGS
526	//
527	lbfgs.minlbfgs(n, Math.Min(n, lmprelbfgsm), ref state.x, 0.0, 0.0, 0.0, Math.Max(25, n), 0, ref state.internalstate);
528	lbl_9:
529	if( ! lbfgs.minlbfgsiteration(ref state.internalstate) )
530	{
531	goto lbl_10;
532	}
533
534	//
535	// RComm
536	//
537	for(i_=0; i_<=n-1;i_++)
538	{
539	state.x[i_] = state.internalstate.x[i_];
540	}
541	lmclearrequestfields(ref state);
542	state.needfg = true;
543	state.rstate.stage = 0;
544	goto lbl_rcomm;
545	lbl_0:
546	state.repnfunc = state.repnfunc+1;
547	state.repngrad = state.repngrad+1;
548
549	//
550	// Call LBFGS
551	//
552	state.internalstate.f = state.f;
553	for(i_=0; i_<=n-1;i_++)
554	{
555	state.internalstate.g[i_] = state.g[i_];
556	}
557	goto lbl_9;
558	lbl_10:
559	lbfgs.minlbfgsresults(ref state.internalstate, ref state.x, ref state.internalrep);
560	lbl_7:
561
562	//
563	// Second stage of the hybrid algorithm: LM
564	// Initialize quadratic model.
565	//
566	if( state.usermode!=lmmodefgh )
567	{
568	goto lbl_11;
569	}
570
571	//
572	// RComm
573	//
574	lmclearrequestfields(ref state);
575	state.needfgh = true;
576	state.rstate.stage = 1;
577	goto lbl_rcomm;
578	lbl_1:
579	state.repnfunc = state.repnfunc+1;
580	state.repngrad = state.repngrad+1;
581	state.repnhess = state.repnhess+1;
582
583	//
584	// generate raw quadratic model
585	//
586	for(i=0; i<=n-1; i++)
587	{
588	for(i_=0; i_<=n-1;i_++)
589	{
590	state.rawmodel[i,i_] = state.h[i,i_];
591	}
592	}
593	for(i_=0; i_<=n-1;i_++)
594	{
595	state.gbase[i_] = state.g[i_];
596	}
597	fbase = state.f;
598	lbl_11:
599	if( ! (state.usermode==lmmodefgj \| state.usermode==lmmodefj) )
600	{
601	goto lbl_13;
602	}
603
604	//
605	// RComm
606	//
607	lmclearrequestfields(ref state);
608	state.needfij = true;
609	state.rstate.stage = 2;
610	goto lbl_rcomm;
611	lbl_2:
612	state.repnfunc = state.repnfunc+1;
613	state.repnjac = state.repnjac+1;
614
615	//
616	// generate raw quadratic model
617	//
618	blas.matrixmatrixmultiply(ref state.j, 0, m-1, 0, n-1, true, ref state.j, 0, m-1, 0, n-1, false, 1.0, ref state.rawmodel, 0, n-1, 0, n-1, 0.0, ref state.work);
619	blas.matrixvectormultiply(ref state.j, 0, m-1, 0, n-1, true, ref state.fi, 0, m-1, 1.0, ref state.gbase, 0, n-1, 0.0);
620	fbase = 0.0;
621	for(i_=0; i_<=m-1;i_++)
622	{
623	fbase += state.fi[i_]*state.fi[i_];
624	}
625	lbl_13:
626	lambda = 0.001;
627	lbl_15:
628	if( false )
629	{
630	goto lbl_16;
631	}
632
633	//
634	// 1. Model = RawModel+lambda*I
635	// 2. Try to solve (RawModel+LambdaI)dx = -g.
636	// Increase lambda if left part is not positive definite.
637	//
638	for(i=0; i<=n-1; i++)
639	{
640	for(i_=0; i_<=n-1;i_++)
641	{
642	state.model[i,i_] = state.rawmodel[i,i_];
643	}
644	state.model[i,i] = state.model[i,i]+lambda;
645	}
646	spd = cholesky.spdmatrixcholesky(ref state.model, n, true);
647	state.repncholesky = state.repncholesky+1;
648	if( !spd )
649	{
650	lambda = lambdalambdaupnu;
651	nu = nu*2;
652	goto lbl_15;
653	}
654	if( !spdsolve.spdmatrixcholeskysolve(ref state.model, state.gbase, n, true, ref state.xdir) )
655	{
656	lambda = lambdalambdaupnu;
657	nu = nu*2;
658	goto lbl_15;
659	}
660	for(i_=0; i_<=n-1;i_++)
661	{
662	state.xdir[i_] = -1*state.xdir[i_];
663	}
664
665	//
666	// Candidate lambda found.
667	// 1. Save old w in WBase
668	// 1. Test some stopping criterions
669	// 2. If error(w+wdir)>error(w), increase lambda
670	//
671	for(i_=0; i_<=n-1;i_++)
672	{
673	state.xbase[i_] = state.x[i_];
674	}
675	for(i_=0; i_<=n-1;i_++)
676	{
677	state.x[i_] = state.x[i_] + state.xdir[i_];
678	}
679	xnorm = 0.0;
680	for(i_=0; i_<=n-1;i_++)
681	{
682	xnorm += state.xbase[i_]*state.xbase[i_];
683	}
684	stepnorm = 0.0;
685	for(i_=0; i_<=n-1;i_++)
686	{
687	stepnorm += state.xdir[i_]*state.xdir[i_];
688	}
689	xnorm = Math.Sqrt(xnorm);
690	stepnorm = Math.Sqrt(stepnorm);
691	if( (double)(stepnorm)<=(double)(state.epsx*(1+xnorm)) )
692	{
693
694	//
695	// step size if small enough
696	//
697	state.repterminationtype = 2;
698	goto lbl_16;
699	}
700	lmclearrequestfields(ref state);
701	state.needf = true;
702	state.rstate.stage = 3;
703	goto lbl_rcomm;
704	lbl_3:
705	state.repnfunc = state.repnfunc+1;
706	fnew = state.f;
707	if( (double)(Math.Abs(fnew-fbase))<=(double)(state.epsf*Math.Max(1, Math.Max(Math.Abs(fbase), Math.Abs(fnew)))) )
708	{
709
710	//
711	// function change is small enough
712	//
713	state.repterminationtype = 1;
714	goto lbl_16;
715	}
716	if( (double)(fnew)>(double)(fbase) )
717	{
718
719	//
720	// restore state and continue out search for lambda
721	//
722	for(i_=0; i_<=n-1;i_++)
723	{
724	state.x[i_] = state.xbase[i_];
725	}
726	lambda = lambdalambdaupnu;
727	nu = nu*2;
728	goto lbl_15;
729	}
730	if( ! ((state.usermode==lmmodefgj \| state.usermode==lmmodefgh) & state.flags/lmflagnointlbfgs%2==0) )
731	{
732	goto lbl_17;
733	}
734	System.Diagnostics.Debug.Assert(state.usermode==lmmodefgh);
735
736	//
737	// Optimize using inv(cholesky(H)) as preconditioner
738	//
739	if( ! trinverse.rmatrixtrinverse(ref state.model, n, true, false) )
740	{
741	goto lbl_19;
742	}
743
744	//
745	// if matrix can be inverted use it.
746	// just silently move to next iteration otherwise.
747	// (will be very, very rare, mostly for specially
748	// designed near-degenerate tasks)
749	//
750	for(i_=0; i_<=n-1;i_++)
751	{
752	state.xbase[i_] = state.x[i_];
753	}
754	for(i=0; i<=n-1; i++)
755	{
756	state.xprec[i] = 0;
757	}
758	lbfgs.minlbfgs(n, Math.Min(n, lmintlbfgsits), ref state.xprec, 0.0, 0.0, 0.0, lmintlbfgsits, lbfgsflags, ref state.internalstate);
759	lbl_21:
760	if( ! lbfgs.minlbfgsiteration(ref state.internalstate) )
761	{
762	goto lbl_22;
763	}
764
765	//
766	// convert XPrec to unpreconditioned form, then call RComm.
767	//
768	for(i=0; i<=n-1; i++)
769	{
770	v = 0.0;
771	for(i_=i; i_<=n-1;i_++)
772	{
773	v += state.internalstate.x[i_]*state.model[i,i_];
774	}
775	state.x[i] = state.xbase[i]+v;
776	}
777	lmclearrequestfields(ref state);
778	state.needfg = true;
779	state.rstate.stage = 4;
780	goto lbl_rcomm;
781	lbl_4:
782	state.repnfunc = state.repnfunc+1;
783	state.repngrad = state.repngrad+1;
784
785	//
786	// 1. pass State.F to State.InternalState.F
787	// 2. convert gradient back to preconditioned form
788	//
789	state.internalstate.f = state.f;
790	for(i=0; i<=n-1; i++)
791	{
792	state.internalstate.g[i] = 0;
793	}
794	for(i=0; i<=n-1; i++)
795	{
796	v = state.g[i];
797	for(i_=i; i_<=n-1;i_++)
798	{
799	state.internalstate.g[i_] = state.internalstate.g[i_] + v*state.model[i,i_];
800	}
801	}
802
803	//
804	// next iteration
805	//
806	goto lbl_21;
807	lbl_22:
808
809	//
810	// change LBFGS flags to NoRealloc.
811	// L-BFGS subroutine will use memory allocated from previous run.
812	// it is possible since all subsequent calls will be with same N/M.
813	//
814	lbfgsflags = lbfgsnorealloc;
815
816	//
817	// back to unpreconditioned X
818	//
819	lbfgs.minlbfgsresults(ref state.internalstate, ref state.xprec, ref state.internalrep);
820	for(i=0; i<=n-1; i++)
821	{
822	v = 0.0;
823	for(i_=i; i_<=n-1;i_++)
824	{
825	v += state.xprec[i_]*state.model[i,i_];
826	}
827	state.x[i] = state.xbase[i]+v;
828	}
829	lbl_19:
830	lbl_17:
831
832	//
833	// Accept new position.
834	// Calculate Hessian
835	//
836	if( state.usermode!=lmmodefgh )
837	{
838	goto lbl_23;
839	}
840
841	//
842	// RComm
843	//
844	lmclearrequestfields(ref state);
845	state.needfgh = true;
846	state.rstate.stage = 5;
847	goto lbl_rcomm;
848	lbl_5:
849	state.repnfunc = state.repnfunc+1;
850	state.repngrad = state.repngrad+1;
851	state.repnhess = state.repnhess+1;
852
853	//
854	// Update raw quadratic model
855	//
856	for(i=0; i<=n-1; i++)
857	{
858	for(i_=0; i_<=n-1;i_++)
859	{
860	state.rawmodel[i,i_] = state.h[i,i_];
861	}
862	}
863	for(i_=0; i_<=n-1;i_++)
864	{
865	state.gbase[i_] = state.g[i_];
866	}
867	fbase = state.f;
868	lbl_23:
869	if( ! (state.usermode==lmmodefgj \| state.usermode==lmmodefj) )
870	{
871	goto lbl_25;
872	}
873
874	//
875	// RComm
876	//
877	lmclearrequestfields(ref state);
878	state.needfij = true;
879	state.rstate.stage = 6;
880	goto lbl_rcomm;
881	lbl_6:
882	state.repnfunc = state.repnfunc+1;
883	state.repnjac = state.repnjac+1;
884
885	//
886	// generate raw quadratic model
887	//
888	blas.matrixmatrixmultiply(ref state.j, 0, m-1, 0, n-1, true, ref state.j, 0, m-1, 0, n-1, false, 1.0, ref state.rawmodel, 0, n-1, 0, n-1, 0.0, ref state.work);
889	blas.matrixvectormultiply(ref state.j, 0, m-1, 0, n-1, true, ref state.fi, 0, m-1, 1.0, ref state.gbase, 0, n-1, 0.0);
890	fbase = 0.0;
891	for(i_=0; i_<=m-1;i_++)
892	{
893	fbase += state.fi[i_]*state.fi[i_];
894	}
895	lbl_25:
896	state.repiterationscount = state.repiterationscount+1;
897	if( state.repiterationscount>=state.maxits & state.maxits>0 )
898	{
899	state.repterminationtype = 5;
900	goto lbl_16;
901	}
902
903	//
904	// Update lambda
905	//
906	lambda = lambda*lambdadown;
907	nu = 2;
908	goto lbl_15;
909	lbl_16:
910	result = false;
911	return result;
912
913	//
914	// Saving state
915	//
916	lbl_rcomm:
917	result = true;
918	state.rstate.ia[0] = n;
919	state.rstate.ia[1] = m;
920	state.rstate.ia[2] = i;
921	state.rstate.ia[3] = lbfgsflags;
922	state.rstate.ba[0] = spd;
923	state.rstate.ra[0] = xnorm;
924	state.rstate.ra[1] = stepnorm;
925	state.rstate.ra[2] = fbase;
926	state.rstate.ra[3] = fnew;
927	state.rstate.ra[4] = lambda;
928	state.rstate.ra[5] = nu;
929	state.rstate.ra[6] = lambdaup;
930	state.rstate.ra[7] = lambdadown;
931	state.rstate.ra[8] = v;
932	return result;
933	}
934
935
936	/*************************************************************************
937	Levenberg-Marquardt algorithm results
938
939	Called after MinLMIteration returned False.
940
941	Input parameters:
942	State - algorithm state (used by MinLMIteration).
943
944	Output parameters:
945	X - array[0..N-1], solution
946	Rep - optimization report:
947	* Rep.TerminationType completetion code:
948	* -1 incorrect parameters were specified
949	* 1 relative function improvement is no more than
950	EpsF.
951	* 2 relative step is no more than EpsX.
952	* 4 gradient norm is no more than EpsG
953	* 5 MaxIts steps was taken
954	* Rep.IterationsCount contains iterations count
955	* Rep.NFunc - number of function calculations
956	* Rep.NJac - number of Jacobi matrix calculations
957	* Rep.NGrad - number of gradient calculations
958	* Rep.NHess - number of Hessian calculations
959	* Rep.NCholesky - number of Cholesky decomposition calculations
960
961	-- ALGLIB --
962	Copyright 10.03.2009 by Bochkanov Sergey
963	*************************************************************************/
964	public static void minlmresults(ref lmstate state,
965	ref double[] x,
966	ref lmreport rep)
967	{
968	int i_ = 0;
969
970	x = new double[state.n-1+1];
971	for(i_=0; i_<=state.n-1;i_++)
972	{
973	x[i_] = state.x[i_];
974	}
975	rep.iterationscount = state.repiterationscount;
976	rep.terminationtype = state.repterminationtype;
977	rep.nfunc = state.repnfunc;
978	rep.njac = state.repnjac;
979	rep.ngrad = state.repngrad;
980	rep.nhess = state.repnhess;
981	rep.ncholesky = state.repncholesky;
982	}
983
984
985	/*************************************************************************
986	Prepare internal structures (except for RComm).
987
988	Note: M must be zero for FGH mode, non-zero for FJ/FGJ mode.
989	*************************************************************************/
990	private static void lmprepare(int n,
991	int m,
992	bool havegrad,
993	ref lmstate state)
994	{
995	state.repiterationscount = 0;
996	state.repterminationtype = 0;
997	state.repnfunc = 0;
998	state.repnjac = 0;
999	state.repngrad = 0;
1000	state.repnhess = 0;
1001	state.repncholesky = 0;
1002	if( n<0 \| m<0 )
1003	{
1004	return;
1005	}
1006	if( havegrad )
1007	{
1008	state.g = new double[n-1+1];
1009	}
1010	if( m!=0 )
1011	{
1012	state.j = new double[m-1+1, n-1+1];
1013	state.fi = new double[m-1+1];
1014	state.h = new double[0+1, 0+1];
1015	}
1016	else
1017	{
1018	state.j = new double[0+1, 0+1];
1019	state.fi = new double[0+1];
1020	state.h = new double[n-1+1, n-1+1];
1021	}
1022	state.x = new double[n-1+1];
1023	state.rawmodel = new double[n-1+1, n-1+1];
1024	state.model = new double[n-1+1, n-1+1];
1025	state.xbase = new double[n-1+1];
1026	state.xprec = new double[n-1+1];
1027	state.gbase = new double[n-1+1];
1028	state.xdir = new double[n-1+1];
1029	state.work = new double[Math.Max(n, m)+1];
1030	}
1031
1032
1033	/*************************************************************************
1034	Clears request fileds (to be sure that we don't forgot to clear something)
1035	*************************************************************************/
1036	private static void lmclearrequestfields(ref lmstate state)
1037	{
1038	state.needf = false;
1039	state.needfg = false;
1040	state.needfgh = false;
1041	state.needfij = false;
1042	}
1043	}
1044	}

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