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source: trunk/sources/ALGLIB/leastsquares.cs @ 2465

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Last change on this file since 2465 was 2430, checked in by gkronber, 15 years ago
Moved ALGLIB code into a separate plugin. #783
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[2154]	1	/*************************************************************************
	2	Copyright (c) 2006-2007, Sergey Bochkanov (ALGLIB project).
	3
[2430]	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.
[2154]	9
[2430]	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.
[2154]	14
[2430]	15	A copy of the GNU General Public License is available at
	16	http://www.fsf.org/licensing/licenses
[2154]	17
[2430]	18	>>> END OF LICENSE >>>
[2154]	19	*************************************************************************/
	20
	21	using System;
	22
[2430]	23	namespace alglib
[2154]	24	{
[2430]	25	public class leastsquares
	26	{
	27	/*************************************************************************
	28	Weighted approximation by arbitrary function basis in a space of arbitrary
	29	dimension using linear least squares method.
[2154]	30
[2430]	31	Input parameters:
	32	Y - array[0..N-1]
	33	It contains a set of function values in N points. Space
	34	dimension and points don't matter. Procedure works with
	35	function values in these points and values of basis functions
	36	only.
[2154]	37
[2430]	38	W - array[0..N-1]
	39	It contains weights corresponding to function values. Each
	40	summand in square sum of approximation deviations from given
	41	values is multiplied by the square of corresponding weight.
[2154]	42
[2430]	43	FMatrix-a table of basis functions values, array[0..N-1, 0..M-1].
	44	FMatrix[I, J] - value of J-th basis function in I-th point.
[2154]	45
[2430]	46	N - number of points used. N>=1.
	47	M - number of basis functions, M>=1.
[2154]	48
[2430]	49	Output parameters:
	50	C - decomposition coefficients.
	51	Array of real numbers whose index goes from 0 to M-1.
	52	C[j] - j-th basis function coefficient.
[2154]	53
[2430]	54	-- ALGLIB --
	55	Copyright by Bochkanov Sergey
	56	*************************************************************************/
	57	public static void buildgeneralleastsquares(ref double[] y,
	58	ref double[] w,
	59	ref double[,] fmatrix,
	60	int n,
	61	int m,
	62	ref double[] c)
	63	{
	64	int i = 0;
	65	int j = 0;
	66	double[,] a = new double[0,0];
	67	double[,] q = new double[0,0];
	68	double[,] vt = new double[0,0];
	69	double[] b = new double[0];
	70	double[] tau = new double[0];
	71	double[,] b2 = new double[0,0];
	72	double[] tauq = new double[0];
	73	double[] taup = new double[0];
	74	double[] d = new double[0];
	75	double[] e = new double[0];
	76	bool isuppera = new bool();
	77	int mi = 0;
	78	int ni = 0;
	79	double v = 0;
	80	int i_ = 0;
	81	int i1_ = 0;
[2154]	82
[2430]	83	mi = n;
	84	ni = m;
	85	c = new double[ni-1+1];
	86
	87	//
	88	// Initialize design matrix.
	89	// Here we are making MI>=NI.
	90	//
	91	a = new double[ni+1, Math.Max(mi, ni)+1];
	92	b = new double[Math.Max(mi, ni)+1];
	93	for(i=1; i<=mi; i++)
[2154]	94	{
[2430]	95	b[i] = w[i-1]*y[i-1];
[2154]	96	}
	97	for(i=mi+1; i<=ni; i++)
	98	{
[2430]	99	b[i] = 0;
[2154]	100	}
[2430]	101	for(j=1; j<=ni; j++)
[2154]	102	{
[2430]	103	i1_ = (0) - (1);
	104	for(i_=1; i_<=mi;i_++)
	105	{
	106	a[j,i_] = fmatrix[i_+i1_,j-1];
	107	}
[2154]	108	}
[2430]	109	for(j=1; j<=ni; j++)
[2154]	110	{
[2430]	111	for(i=mi+1; i<=ni; i++)
	112	{
	113	a[j,i] = 0;
	114	}
[2154]	115	}
[2430]	116	for(j=1; j<=ni; j++)
[2154]	117	{
[2430]	118	for(i=1; i<=mi; i++)
	119	{
	120	a[j,i] = a[j,i]*w[i-1];
	121	}
[2154]	122	}
[2430]	123	mi = Math.Max(mi, ni);
	124
	125	//
	126	// LQ-decomposition of A'
	127	// B2 := Q*B
	128	//
	129	lq.lqdecomposition(ref a, ni, mi, ref tau);
	130	lq.unpackqfromlq(ref a, ni, mi, ref tau, ni, ref q);
	131	b2 = new double[1+1, ni+1];
	132	for(j=1; j<=ni; j++)
[2154]	133	{
[2430]	134	b2[1,j] = 0;
[2154]	135	}
[2430]	136	for(i=1; i<=ni; i++)
[2154]	137	{
[2430]	138	v = 0.0;
	139	for(i_=1; i_<=mi;i_++)
	140	{
	141	v += b[i_]*q[i,i_];
	142	}
	143	b2[1,i] = v;
[2154]	144	}
[2430]	145
	146	//
	147	// Back from A' to A
	148	// Making cols(A)=rows(A)
	149	//
	150	for(i=1; i<=ni-1; i++)
[2154]	151	{
[2430]	152	for(i_=i+1; i_<=ni;i_++)
[2154]	153	{
[2430]	154	a[i,i_] = a[i_,i];
[2154]	155	}
[2430]	156	}
	157	for(i=2; i<=ni; i++)
	158	{
	159	for(j=1; j<=i-1; j++)
[2154]	160	{
[2430]	161	a[i,j] = 0;
[2154]	162	}
	163	}
[2430]	164
	165	//
	166	// Bidiagonal decomposition of A
	167	// A = Q * d2 * P'
	168	// B2 := (Q'*B2')'
	169	//
	170	bidiagonal.tobidiagonal(ref a, ni, ni, ref tauq, ref taup);
	171	bidiagonal.multiplybyqfrombidiagonal(ref a, ni, ni, ref tauq, ref b2, 1, ni, true, false);
	172	bidiagonal.unpackptfrombidiagonal(ref a, ni, ni, ref taup, ni, ref vt);
	173	bidiagonal.unpackdiagonalsfrombidiagonal(ref a, ni, ni, ref isuppera, ref d, ref e);
	174
	175	//
	176	// Singular value decomposition of A
	177	// A = U * d * V'
	178	// B2 := (U'*B2')'
	179	//
	180	if( !bdsvd.bidiagonalsvddecomposition(ref d, e, ni, isuppera, false, ref b2, 1, ref q, 0, ref vt, ni) )
[2154]	181	{
[2430]	182	for(i=0; i<=ni-1; i++)
	183	{
	184	c[i] = 0;
	185	}
	186	return;
[2154]	187	}
[2430]	188
	189	//
	190	// B2 := (d^(-1) * B2')'
	191	//
	192	if( d[1]!=0 )
	193	{
	194	for(i=1; i<=ni; i++)
	195	{
	196	if( d[i]>AP.Math.MachineEpsilon10Math.Sqrt(ni)*d[1] )
	197	{
	198	b2[1,i] = b2[1,i]/d[i];
	199	}
	200	else
	201	{
	202	b2[1,i] = 0;
	203	}
	204	}
	205	}
	206
	207	//
	208	// B := (V * B2')'
	209	//
	210	for(i=1; i<=ni; i++)
	211	{
	212	b[i] = 0;
	213	}
	214	for(i=1; i<=ni; i++)
	215	{
	216	v = b2[1,i];
	217	for(i_=1; i_<=ni;i_++)
	218	{
	219	b[i_] = b[i_] + v*vt[i,i_];
	220	}
	221	}
	222
	223	//
	224	// Out
	225	//
	226	for(i=1; i<=ni; i++)
	227	{
	228	c[i-1] = b[i];
	229	}
[2154]	230	}
	231
	232
[2430]	233	/*************************************************************************
	234	Linear approximation using least squares method
[2154]	235
[2430]	236	The subroutine calculates coefficients of the line approximating given
	237	function.
[2154]	238
[2430]	239	Input parameters:
	240	X - array[0..N-1], it contains a set of abscissas.
	241	Y - array[0..N-1], function values.
	242	N - number of points, N>=1
[2154]	243
[2430]	244	Output parameters:
	245	a, b- coefficients of linear approximation a+b*t
[2154]	246
[2430]	247	-- ALGLIB --
	248	Copyright by Bochkanov Sergey
	249	*************************************************************************/
	250	public static void buildlinearleastsquares(ref double[] x,
	251	ref double[] y,
	252	int n,
	253	ref double a,
	254	ref double b)
	255	{
	256	double pp = 0;
	257	double qq = 0;
	258	double pq = 0;
	259	double b1 = 0;
	260	double b2 = 0;
	261	double d1 = 0;
	262	double d2 = 0;
	263	double t1 = 0;
	264	double t2 = 0;
	265	double phi = 0;
	266	double c = 0;
	267	double s = 0;
	268	double m = 0;
	269	int i = 0;
[2154]	270
[2430]	271	pp = n;
	272	qq = 0;
	273	pq = 0;
	274	b1 = 0;
	275	b2 = 0;
	276	for(i=0; i<=n-1; i++)
	277	{
	278	pq = pq+x[i];
	279	qq = qq+AP.Math.Sqr(x[i]);
	280	b1 = b1+y[i];
	281	b2 = b2+x[i]*y[i];
	282	}
	283	phi = Math.Atan2(2*pq, qq-pp)/2;
	284	c = Math.Cos(phi);
	285	s = Math.Sin(phi);
	286	d1 = AP.Math.Sqr(c)pp+AP.Math.Sqr(s)qq-2sc*pq;
	287	d2 = AP.Math.Sqr(s)pp+AP.Math.Sqr(c)qq+2sc*pq;
	288	if( Math.Abs(d1)>Math.Abs(d2) )
	289	{
	290	m = Math.Abs(d1);
	291	}
	292	else
	293	{
	294	m = Math.Abs(d2);
	295	}
	296	t1 = cb1-sb2;
	297	t2 = sb1+cb2;
	298	if( Math.Abs(d1)>mAP.Math.MachineEpsilon1000 )
	299	{
	300	t1 = t1/d1;
	301	}
	302	else
	303	{
	304	t1 = 0;
	305	}
	306	if( Math.Abs(d2)>mAP.Math.MachineEpsilon1000 )
	307	{
	308	t2 = t2/d2;
	309	}
	310	else
	311	{
	312	t2 = 0;
	313	}
	314	a = ct1+st2;
	315	b = -(st1)+ct2;
[2154]	316	}
	317
	318
[2430]	319	/*************************************************************************
	320	Weighted cubic spline approximation using linear least squares
[2154]	321
[2430]	322	Input parameters:
	323	X - array[0..N-1], abscissas
	324	Y - array[0..N-1], function values
	325	W - array[0..N-1], weights.
	326	A, B- interval to build splines in.
	327	N - number of points used. N>=1.
	328	M - number of basic splines, M>=2.
[2154]	329
[2430]	330	Output parameters:
	331	CTbl- coefficients table to be used by SplineInterpolation function.
	332	-- ALGLIB --
	333	Copyright by Bochkanov Sergey
	334	*************************************************************************/
	335	public static void buildsplineleastsquares(ref double[] x,
	336	ref double[] y,
	337	ref double[] w,
	338	double a,
	339	double b,
	340	int n,
	341	int m,
	342	ref double[] ctbl)
	343	{
	344	int i = 0;
	345	int j = 0;
	346	double[,] ma = new double[0,0];
	347	double[,] q = new double[0,0];
	348	double[,] vt = new double[0,0];
	349	double[] mb = new double[0];
	350	double[] tau = new double[0];
	351	double[,] b2 = new double[0,0];
	352	double[] tauq = new double[0];
	353	double[] taup = new double[0];
	354	double[] d = new double[0];
	355	double[] e = new double[0];
	356	bool isuppera = new bool();
	357	int mi = 0;
	358	int ni = 0;
	359	double v = 0;
	360	double[] sx = new double[0];
	361	double[] sy = new double[0];
	362	int i_ = 0;
[2154]	363
[2430]	364	System.Diagnostics.Debug.Assert(m>=2, "BuildSplineLeastSquares: M is too small!");
	365	mi = n;
	366	ni = m;
	367	sx = new double[ni-1+1];
	368	sy = new double[ni-1+1];
	369
	370	//
	371	// Initializing design matrix
	372	// Here we are making MI>=NI
	373	//
	374	ma = new double[ni+1, Math.Max(mi, ni)+1];
	375	mb = new double[Math.Max(mi, ni)+1];
	376	for(j=0; j<=ni-1; j++)
[2154]	377	{
[2430]	378	sx[j] = a+(b-a)*j/(ni-1);
[2154]	379	}
[2430]	380	for(j=0; j<=ni-1; j++)
	381	{
	382	for(i=0; i<=ni-1; i++)
	383	{
	384	sy[i] = 0;
	385	}
	386	sy[j] = 1;
	387	spline3.buildcubicspline(sx, sy, ni, 0, 0.0, 0, 0.0, ref ctbl);
	388	for(i=0; i<=mi-1; i++)
	389	{
	390	ma[j+1,i+1] = w[i]*spline3.splineinterpolation(ref ctbl, x[i]);
	391	}
	392	}
	393	for(j=1; j<=ni; j++)
	394	{
	395	for(i=mi+1; i<=ni; i++)
	396	{
	397	ma[j,i] = 0;
	398	}
	399	}
	400
	401	//
	402	// Initializing right part
	403	//
[2154]	404	for(i=0; i<=mi-1; i++)
	405	{
[2430]	406	mb[i+1] = w[i]*y[i];
[2154]	407	}
	408	for(i=mi+1; i<=ni; i++)
	409	{
[2430]	410	mb[i] = 0;
[2154]	411	}
[2430]	412	mi = Math.Max(mi, ni);
	413
	414	//
	415	// LQ-decomposition of A'
	416	// B2 := Q*B
	417	//
	418	lq.lqdecomposition(ref ma, ni, mi, ref tau);
	419	lq.unpackqfromlq(ref ma, ni, mi, ref tau, ni, ref q);
	420	b2 = new double[1+1, ni+1];
	421	for(j=1; j<=ni; j++)
[2154]	422	{
[2430]	423	b2[1,j] = 0;
[2154]	424	}
[2430]	425	for(i=1; i<=ni; i++)
[2154]	426	{
[2430]	427	v = 0.0;
	428	for(i_=1; i_<=mi;i_++)
	429	{
	430	v += mb[i_]*q[i,i_];
	431	}
	432	b2[1,i] = v;
[2154]	433	}
[2430]	434
	435	//
	436	// Back from A' to A
	437	// Making cols(A)=rows(A)
	438	//
	439	for(i=1; i<=ni-1; i++)
[2154]	440	{
[2430]	441	for(i_=i+1; i_<=ni;i_++)
	442	{
	443	ma[i,i_] = ma[i_,i];
	444	}
[2154]	445	}
[2430]	446	for(i=2; i<=ni; i++)
[2154]	447	{
[2430]	448	for(j=1; j<=i-1; j++)
[2154]	449	{
[2430]	450	ma[i,j] = 0;
	451	}
	452	}
	453
	454	//
	455	// Bidiagonal decomposition of A
	456	// A = Q * d2 * P'
	457	// B2 := (Q'*B2')'
	458	//
	459	bidiagonal.tobidiagonal(ref ma, ni, ni, ref tauq, ref taup);
	460	bidiagonal.multiplybyqfrombidiagonal(ref ma, ni, ni, ref tauq, ref b2, 1, ni, true, false);
	461	bidiagonal.unpackptfrombidiagonal(ref ma, ni, ni, ref taup, ni, ref vt);
	462	bidiagonal.unpackdiagonalsfrombidiagonal(ref ma, ni, ni, ref isuppera, ref d, ref e);
	463
	464	//
	465	// Singular value decomposition of A
	466	// A = U * d * V'
	467	// B2 := (U'*B2')'
	468	//
	469	if( !bdsvd.bidiagonalsvddecomposition(ref d, e, ni, isuppera, false, ref b2, 1, ref q, 0, ref vt, ni) )
	470	{
	471	for(i=1; i<=ni; i++)
	472	{
	473	d[i] = 0;
	474	b2[1,i] = 0;
	475	for(j=1; j<=ni; j++)
[2154]	476	{
[2430]	477	if( i==j )
	478	{
	479	vt[i,j] = 1;
	480	}
	481	else
	482	{
	483	vt[i,j] = 0;
	484	}
[2154]	485	}
	486	}
[2430]	487	b2[1,1] = 1;
[2154]	488	}
[2430]	489
	490	//
	491	// B2 := (d^(-1) * B2')'
	492	//
	493	for(i=1; i<=ni; i++)
[2154]	494	{
[2430]	495	if( d[i]>AP.Math.MachineEpsilon10Math.Sqrt(ni)*d[1] )
	496	{
	497	b2[1,i] = b2[1,i]/d[i];
	498	}
	499	else
	500	{
	501	b2[1,i] = 0;
	502	}
[2154]	503	}
[2430]	504
	505	//
	506	// B := (V * B2')'
	507	//
	508	for(i=1; i<=ni; i++)
[2154]	509	{
[2430]	510	mb[i] = 0;
[2154]	511	}
[2430]	512	for(i=1; i<=ni; i++)
[2154]	513	{
[2430]	514	v = b2[1,i];
	515	for(i_=1; i_<=ni;i_++)
	516	{
	517	mb[i_] = mb[i_] + v*vt[i,i_];
	518	}
[2154]	519	}
[2430]	520
	521	//
	522	// Forming result spline
	523	//
	524	for(i=0; i<=ni-1; i++)
	525	{
	526	sy[i] = mb[i+1];
	527	}
	528	spline3.buildcubicspline(sx, sy, ni, 0, 0.0, 0, 0.0, ref ctbl);
[2154]	529	}
	530
	531
[2430]	532	/*************************************************************************
	533	Polynomial approximation using least squares method
[2154]	534
[2430]	535	The subroutine calculates coefficients of the polynomial approximating
	536	given function. It is recommended to use this function only if you need to
	537	obtain coefficients of approximation polynomial. If you have to build and
	538	calculate polynomial approximation (NOT coefficients), it's better to use
	539	BuildChebyshevLeastSquares subroutine in combination with
	540	CalculateChebyshevLeastSquares subroutine. The result of Chebyshev
	541	polynomial approximation is equivalent to the result obtained using powers
	542	of X, but has higher accuracy due to better numerical properties of
	543	Chebyshev polynomials.
[2154]	544
[2430]	545	Input parameters:
	546	X - array[0..N-1], abscissas
	547	Y - array[0..N-1], function values
	548	N - number of points, N>=1
	549	M - order of polynomial required, M>=0
[2154]	550
[2430]	551	Output parameters:
	552	C - approximating polynomial coefficients, array[0..M],
	553	C[i] - coefficient at X^i.
[2154]	554
[2430]	555	-- ALGLIB --
	556	Copyright by Bochkanov Sergey
	557	*************************************************************************/
	558	public static void buildpolynomialleastsquares(ref double[] x,
	559	ref double[] y,
	560	int n,
	561	int m,
	562	ref double[] c)
	563	{
	564	double[] ctbl = new double[0];
	565	double[] w = new double[0];
	566	double[] c1 = new double[0];
	567	double maxx = 0;
	568	double minx = 0;
	569	int i = 0;
	570	int j = 0;
	571	int k = 0;
	572	double e = 0;
	573	double d = 0;
	574	double l1 = 0;
	575	double l2 = 0;
	576	double[] z2 = new double[0];
	577	double[] z1 = new double[0];
[2154]	578
[2430]	579
	580	//
	581	// Initialize
	582	//
	583	maxx = x[0];
	584	minx = x[0];
	585	for(i=1; i<=n-1; i++)
[2154]	586	{
[2430]	587	if( x[i]>maxx )
	588	{
	589	maxx = x[i];
	590	}
	591	if( x[i]<minx )
	592	{
	593	minx = x[i];
	594	}
[2154]	595	}
[2430]	596	if( minx==maxx )
[2154]	597	{
[2430]	598	minx = minx-0.5;
	599	maxx = maxx+0.5;
[2154]	600	}
[2430]	601	w = new double[n-1+1];
	602	for(i=0; i<=n-1; i++)
[2154]	603	{
[2430]	604	w[i] = 1;
	605	}
	606
	607	//
	608	// Build Chebyshev approximation
	609	//
	610	buildchebyshevleastsquares(ref x, ref y, ref w, minx, maxx, n, m, ref ctbl);
	611
	612	//
	613	// From Chebyshev to powers of X
	614	//
	615	c1 = new double[m+1];
	616	for(i=0; i<=m; i++)
	617	{
	618	c1[i] = 0;
	619	}
	620	d = 0;
	621	for(i=0; i<=m; i++)
	622	{
	623	for(k=i; k<=m; k++)
[2154]	624	{
[2430]	625	e = c1[k];
	626	c1[k] = 0;
	627	if( i<=1 & k==i )
[2154]	628	{
[2430]	629	c1[k] = 1;
[2154]	630	}
[2430]	631	else
[2154]	632	{
[2430]	633	if( i!=0 )
	634	{
	635	c1[k] = 2*d;
	636	}
	637	if( k>i+1 )
	638	{
	639	c1[k] = c1[k]-c1[k-2];
	640	}
[2154]	641	}
[2430]	642	d = e;
[2154]	643	}
[2430]	644	d = c1[i];
	645	e = 0;
	646	k = i;
	647	while( k<=m )
	648	{
	649	e = e+c1[k]*ctbl[k];
	650	k = k+2;
	651	}
	652	c1[i] = e;
[2154]	653	}
[2430]	654
	655	//
	656	// Linear translation
	657	//
	658	l1 = 2/(ctbl[m+2]-ctbl[m+1]);
	659	l2 = -(2*ctbl[m+1]/(ctbl[m+2]-ctbl[m+1]))-1;
	660	c = new double[m+1];
	661	z2 = new double[m+1];
	662	z1 = new double[m+1];
	663	c[0] = c1[0];
	664	z1[0] = 1;
	665	z2[0] = 1;
	666	for(i=1; i<=m; i++)
[2154]	667	{
[2430]	668	z2[i] = 1;
	669	z1[i] = l2*z1[i-1];
	670	c[0] = c[0]+c1[i]*z1[i];
[2154]	671	}
[2430]	672	for(j=1; j<=m; j++)
[2154]	673	{
[2430]	674	z2[0] = l1*z2[0];
	675	c[j] = c1[j]*z2[0];
	676	for(i=j+1; i<=m; i++)
	677	{
	678	k = i-j;
	679	z2[k] = l1*z2[k]+z2[k-1];
	680	c[j] = c[j]+c1[i]z2[k]z1[k];
	681	}
[2154]	682	}
	683	}
	684
	685
[2430]	686	/*************************************************************************
	687	Chebyshev polynomial approximation using least squares method.
[2154]	688
[2430]	689	The algorithm reduces interval [A, B] to the interval [-1,1], then builds
	690	least squares approximation using Chebyshev polynomials.
[2154]	691
[2430]	692	Input parameters:
	693	X - array[0..N-1], abscissas
	694	Y - array[0..N-1], function values
	695	W - array[0..N-1], weights
	696	A, B- interval to build approximating polynomials in.
	697	N - number of points used. N>=1.
	698	M - order of polynomial, M>=0. This parameter is passed into
	699	CalculateChebyshevLeastSquares function.
[2154]	700
[2430]	701	Output parameters:
	702	CTbl - coefficient table. This parameter is passed into
	703	CalculateChebyshevLeastSquares function.
	704	-- ALGLIB --
	705	Copyright by Bochkanov Sergey
	706	*************************************************************************/
	707	public static void buildchebyshevleastsquares(ref double[] x,
	708	ref double[] y,
	709	ref double[] w,
	710	double a,
	711	double b,
	712	int n,
	713	int m,
	714	ref double[] ctbl)
	715	{
	716	int i = 0;
	717	int j = 0;
	718	double[,] ma = new double[0,0];
	719	double[,] q = new double[0,0];
	720	double[,] vt = new double[0,0];
	721	double[] mb = new double[0];
	722	double[] tau = new double[0];
	723	double[,] b2 = new double[0,0];
	724	double[] tauq = new double[0];
	725	double[] taup = new double[0];
	726	double[] d = new double[0];
	727	double[] e = new double[0];
	728	bool isuppera = new bool();
	729	int mi = 0;
	730	int ni = 0;
	731	double v = 0;
	732	int i_ = 0;
[2154]	733
[2430]	734	mi = n;
	735	ni = m+1;
	736
	737	//
	738	// Initializing design matrix
	739	// Here we are making MI>=NI
	740	//
	741	ma = new double[ni+1, Math.Max(mi, ni)+1];
	742	mb = new double[Math.Max(mi, ni)+1];
	743	for(j=1; j<=ni; j++)
[2154]	744	{
[2430]	745	for(i=1; i<=mi; i++)
[2154]	746	{
[2430]	747	v = 2*(x[i-1]-a)/(b-a)-1;
	748	if( j==1 )
	749	{
	750	ma[j,i] = 1.0;
	751	}
	752	if( j==2 )
	753	{
	754	ma[j,i] = v;
	755	}
	756	if( j>2 )
	757	{
	758	ma[j,i] = 2.0vma[j-1,i]-ma[j-2,i];
	759	}
[2154]	760	}
[2430]	761	}
	762	for(j=1; j<=ni; j++)
	763	{
	764	for(i=1; i<=mi; i++)
[2154]	765	{
[2430]	766	ma[j,i] = w[i-1]*ma[j,i];
[2154]	767	}
[2430]	768	}
	769	for(j=1; j<=ni; j++)
	770	{
	771	for(i=mi+1; i<=ni; i++)
[2154]	772	{
[2430]	773	ma[j,i] = 0;
[2154]	774	}
	775	}
[2430]	776
	777	//
	778	// Initializing right part
	779	//
	780	for(i=0; i<=mi-1; i++)
[2154]	781	{
[2430]	782	mb[i+1] = w[i]*y[i];
[2154]	783	}
	784	for(i=mi+1; i<=ni; i++)
	785	{
[2430]	786	mb[i] = 0;
[2154]	787	}
[2430]	788	mi = Math.Max(mi, ni);
	789
	790	//
	791	// LQ-decomposition of A'
	792	// B2 := Q*B
	793	//
	794	lq.lqdecomposition(ref ma, ni, mi, ref tau);
	795	lq.unpackqfromlq(ref ma, ni, mi, ref tau, ni, ref q);
	796	b2 = new double[1+1, ni+1];
	797	for(j=1; j<=ni; j++)
[2154]	798	{
[2430]	799	b2[1,j] = 0;
[2154]	800	}
[2430]	801	for(i=1; i<=ni; i++)
[2154]	802	{
[2430]	803	v = 0.0;
	804	for(i_=1; i_<=mi;i_++)
	805	{
	806	v += mb[i_]*q[i,i_];
	807	}
	808	b2[1,i] = v;
[2154]	809	}
[2430]	810
	811	//
	812	// Back from A' to A
	813	// Making cols(A)=rows(A)
	814	//
	815	for(i=1; i<=ni-1; i++)
[2154]	816	{
[2430]	817	for(i_=i+1; i_<=ni;i_++)
	818	{
	819	ma[i,i_] = ma[i_,i];
	820	}
[2154]	821	}
[2430]	822	for(i=2; i<=ni; i++)
[2154]	823	{
[2430]	824	for(j=1; j<=i-1; j++)
[2154]	825	{
[2430]	826	ma[i,j] = 0;
	827	}
	828	}
	829
	830	//
	831	// Bidiagonal decomposition of A
	832	// A = Q * d2 * P'
	833	// B2 := (Q'*B2')'
	834	//
	835	bidiagonal.tobidiagonal(ref ma, ni, ni, ref tauq, ref taup);
	836	bidiagonal.multiplybyqfrombidiagonal(ref ma, ni, ni, ref tauq, ref b2, 1, ni, true, false);
	837	bidiagonal.unpackptfrombidiagonal(ref ma, ni, ni, ref taup, ni, ref vt);
	838	bidiagonal.unpackdiagonalsfrombidiagonal(ref ma, ni, ni, ref isuppera, ref d, ref e);
	839
	840	//
	841	// Singular value decomposition of A
	842	// A = U * d * V'
	843	// B2 := (U'*B2')'
	844	//
	845	if( !bdsvd.bidiagonalsvddecomposition(ref d, e, ni, isuppera, false, ref b2, 1, ref q, 0, ref vt, ni) )
	846	{
	847	for(i=1; i<=ni; i++)
	848	{
	849	d[i] = 0;
	850	b2[1,i] = 0;
	851	for(j=1; j<=ni; j++)
[2154]	852	{
[2430]	853	if( i==j )
	854	{
	855	vt[i,j] = 1;
	856	}
	857	else
	858	{
	859	vt[i,j] = 0;
	860	}
[2154]	861	}
	862	}
[2430]	863	b2[1,1] = 1;
[2154]	864	}
[2430]	865
	866	//
	867	// B2 := (d^(-1) * B2')'
	868	//
	869	for(i=1; i<=ni; i++)
[2154]	870	{
[2430]	871	if( d[i]>AP.Math.MachineEpsilon10Math.Sqrt(ni)*d[1] )
	872	{
	873	b2[1,i] = b2[1,i]/d[i];
	874	}
	875	else
	876	{
	877	b2[1,i] = 0;
	878	}
[2154]	879	}
[2430]	880
	881	//
	882	// B := (V * B2')'
	883	//
	884	for(i=1; i<=ni; i++)
[2154]	885	{
[2430]	886	mb[i] = 0;
[2154]	887	}
[2430]	888	for(i=1; i<=ni; i++)
[2154]	889	{
[2430]	890	v = b2[1,i];
	891	for(i_=1; i_<=ni;i_++)
	892	{
	893	mb[i_] = mb[i_] + v*vt[i,i_];
	894	}
[2154]	895	}
[2430]	896
	897	//
	898	// Forming result
	899	//
	900	ctbl = new double[ni+1+1];
	901	for(i=1; i<=ni; i++)
	902	{
	903	ctbl[i-1] = mb[i];
	904	}
	905	ctbl[ni] = a;
	906	ctbl[ni+1] = b;
[2154]	907	}
	908
	909
[2430]	910	/*************************************************************************
	911	Weighted Chebyshev polynomial constrained least squares approximation.
[2154]	912
[2430]	913	The algorithm reduces [A,B] to [-1,1] and builds the Chebyshev polynomials
	914	series by approximating a given function using the least squares method.
[2154]	915
[2430]	916	Input parameters:
	917	X - abscissas, array[0..N-1]
	918	Y - function values, array[0..N-1]
	919	W - weights, array[0..N-1]. Each item in the squared sum of
	920	deviations from given values is multiplied by a square of
	921	corresponding weight.
	922	A, B- interval in which the approximating polynomials are built.
	923	N - number of points, N>0.
	924	XC, YC, DC-
	925	constraints (see description below)., array[0..NC-1]
	926	NC - number of constraints. 0 <= NC < M+1.
	927	M - degree of polynomial, M>=0. This parameter is passed into the
	928	CalculateChebyshevLeastSquares subroutine.
[2154]	929
[2430]	930	Output parameters:
	931	CTbl- coefficient table. This parameter is passed into the
	932	CalculateChebyshevLeastSquares subroutine.
[2154]	933
[2430]	934	Result:
	935	True, if the algorithm succeeded.
	936	False, if the internal singular value decomposition subroutine hasn't
	937	converged or the given constraints could not be met simultaneously (e.g.
	938	P(0)=0 è P(0)=1).
[2154]	939
[2430]	940	Specifying constraints:
	941	This subroutine can solve the problem having constrained function
	942	values or its derivatives in several points. NC specifies the number of
	943	constraints, DC - the type of constraints, XC and YC - constraints as such.
	944	Thus, for each i from 0 to NC-1 the following constraint is given:
	945	P(xc[i]) = yc[i], if DC[i]=0
	946	or
	947	d/dx(P(xc[i])) = yc[i], if DC[i]=1
	948	(here P(x) is approximating polynomial).
	949	This version of the subroutine supports only either polynomial or its
	950	derivative value constraints. If DC[i] is not equal to 0 and 1, the
	951	subroutine will be aborted. The number of constraints should be less than
	952	the number of degrees of freedom of approximating polynomial - M+1 (at
	953	that, it could be equal to 0).
[2154]	954
[2430]	955	-- ALGLIB --
	956	Copyright by Bochkanov Sergey
	957	*************************************************************************/
	958	public static bool buildchebyshevleastsquaresconstrained(ref double[] x,
	959	ref double[] y,
	960	ref double[] w,
	961	double a,
	962	double b,
	963	int n,
	964	ref double[] xc,
	965	ref double[] yc,
	966	ref int[] dc,
	967	int nc,
	968	int m,
	969	ref double[] ctbl)
	970	{
	971	bool result = new bool();
	972	int i = 0;
	973	int j = 0;
	974	int reducedsize = 0;
	975	double[,] designmatrix = new double[0,0];
	976	double[] rightpart = new double[0];
	977	double[,] cmatrix = new double[0,0];
	978	double[,] c = new double[0,0];
	979	double[,] u = new double[0,0];
	980	double[,] vt = new double[0,0];
	981	double[] d = new double[0];
	982	double[] cr = new double[0];
	983	double[] ws = new double[0];
	984	double[] tj = new double[0];
	985	double[] uj = new double[0];
	986	double[] dtj = new double[0];
	987	double[] tmp = new double[0];
	988	double[] tmp2 = new double[0];
	989	double[,] tmpmatrix = new double[0,0];
	990	double v = 0;
	991	int i_ = 0;
[2154]	992
[2430]	993	System.Diagnostics.Debug.Assert(n>0);
	994	System.Diagnostics.Debug.Assert(m>=0);
	995	System.Diagnostics.Debug.Assert(nc>=0 & nc<m+1);
	996	result = true;
	997
	998	//
	999	// Initialize design matrix and right part.
	1000	// Add fictional rows if needed to ensure that N>=M+1.
	1001	//
	1002	designmatrix = new double[Math.Max(n, m+1)+1, m+1+1];
	1003	rightpart = new double[Math.Max(n, m+1)+1];
	1004	for(i=1; i<=n; i++)
[2154]	1005	{
[2430]	1006	for(j=1; j<=m+1; j++)
[2154]	1007	{
[2430]	1008	v = 2*(x[i-1]-a)/(b-a)-1;
	1009	if( j==1 )
	1010	{
	1011	designmatrix[i,j] = 1.0;
	1012	}
	1013	if( j==2 )
	1014	{
	1015	designmatrix[i,j] = v;
	1016	}
	1017	if( j>2 )
	1018	{
	1019	designmatrix[i,j] = 2.0vdesignmatrix[i,j-1]-designmatrix[i,j-2];
	1020	}
[2154]	1021	}
[2430]	1022	}
	1023	for(i=1; i<=n; i++)
	1024	{
	1025	for(j=1; j<=m+1; j++)
[2154]	1026	{
[2430]	1027	designmatrix[i,j] = w[i-1]*designmatrix[i,j];
[2154]	1028	}
[2430]	1029	}
	1030	for(i=n+1; i<=m+1; i++)
	1031	{
	1032	for(j=1; j<=m+1; j++)
[2154]	1033	{
[2430]	1034	designmatrix[i,j] = 0;
[2154]	1035	}
	1036	}
[2430]	1037	for(i=0; i<=n-1; i++)
[2154]	1038	{
[2430]	1039	rightpart[i+1] = w[i]*y[i];
[2154]	1040	}
[2430]	1041	for(i=n+1; i<=m+1; i++)
[2154]	1042	{
[2430]	1043	rightpart[i] = 0;
[2154]	1044	}
[2430]	1045	n = Math.Max(n, m+1);
[2154]	1046
	1047	//
[2430]	1048	// Now N>=M+1 and we are ready to the next stage.
	1049	// Handle constraints.
	1050	// Represent feasible set of coefficients as x = C*t + d
[2154]	1051	//
[2430]	1052	c = new double[m+1+1, m+1+1];
	1053	d = new double[m+1+1];
	1054	if( nc==0 )
[2154]	1055	{
[2430]	1056
	1057	//
	1058	// No constraints
	1059	//
	1060	for(i=1; i<=m+1; i++)
[2154]	1061	{
[2430]	1062	for(j=1; j<=m+1; j++)
	1063	{
	1064	c[i,j] = 0;
	1065	}
	1066	d[i] = 0;
[2154]	1067	}
[2430]	1068	for(i=1; i<=m+1; i++)
	1069	{
	1070	c[i,i] = 1;
	1071	}
	1072	reducedsize = m+1;
[2154]	1073	}
[2430]	1074	else
[2154]	1075	{
[2430]	1076
	1077	//
	1078	// Constraints are present.
	1079	// Fill constraints matrix CMatrix and solve CMatrix*x = cr.
	1080	//
	1081	cmatrix = new double[nc+1, m+1+1];
	1082	cr = new double[nc+1];
	1083	tj = new double[m+1];
	1084	uj = new double[m+1];
	1085	dtj = new double[m+1];
	1086	for(i=0; i<=nc-1; i++)
[2154]	1087	{
[2430]	1088	v = 2*(xc[i]-a)/(b-a)-1;
	1089	for(j=0; j<=m; j++)
[2154]	1090	{
[2430]	1091	if( j==0 )
	1092	{
	1093	tj[j] = 1;
	1094	uj[j] = 1;
	1095	dtj[j] = 0;
	1096	}
	1097	if( j==1 )
	1098	{
	1099	tj[j] = v;
	1100	uj[j] = 2*v;
	1101	dtj[j] = 1;
	1102	}
	1103	if( j>1 )
	1104	{
	1105	tj[j] = 2vtj[j-1]-tj[j-2];
	1106	uj[j] = 2vuj[j-1]-uj[j-2];
	1107	dtj[j] = j*uj[j-1];
	1108	}
	1109	System.Diagnostics.Debug.Assert(dc[i]==0 \| dc[i]==1);
	1110	if( dc[i]==0 )
	1111	{
	1112	cmatrix[i+1,j+1] = tj[j];
	1113	}
	1114	if( dc[i]==1 )
	1115	{
	1116	cmatrix[i+1,j+1] = dtj[j];
	1117	}
[2154]	1118	}
[2430]	1119	cr[i+1] = yc[i];
	1120	}
	1121
	1122	//
	1123	// Solve CMatrix*x = cr.
	1124	// Fill C and d:
	1125	// 1. SVD: CMatrix = U * WS * V^T
	1126	// 2. C := V[1:M+1,NC+1:M+1]
	1127	// 3. tmp := WS^-1 * U^T * cr
	1128	// 4. d := V[1:M+1,1:NC] * tmp
	1129	//
	1130	if( !svd.svddecomposition(cmatrix, nc, m+1, 2, 2, 2, ref ws, ref u, ref vt) )
	1131	{
	1132	result = false;
	1133	return result;
	1134	}
	1135	if( ws[1]==0 \| ws[nc]<=AP.Math.MachineEpsilon10Math.Sqrt(nc)*ws[1] )
	1136	{
	1137	result = false;
	1138	return result;
	1139	}
	1140	c = new double[m+1+1, m+1-nc+1];
	1141	d = new double[m+1+1];
	1142	for(i=1; i<=m+1-nc; i++)
	1143	{
	1144	for(i_=1; i_<=m+1;i_++)
[2154]	1145	{
[2430]	1146	c[i_,i] = vt[nc+i,i_];
[2154]	1147	}
[2430]	1148	}
	1149	tmp = new double[nc+1];
	1150	for(i=1; i<=nc; i++)
	1151	{
	1152	v = 0.0;
	1153	for(i_=1; i_<=nc;i_++)
[2154]	1154	{
[2430]	1155	v += u[i_,i]*cr[i_];
[2154]	1156	}
[2430]	1157	tmp[i] = v/ws[i];
	1158	}
	1159	for(i=1; i<=m+1; i++)
	1160	{
	1161	d[i] = 0;
	1162	}
	1163	for(i=1; i<=nc; i++)
	1164	{
	1165	v = tmp[i];
	1166	for(i_=1; i_<=m+1;i_++)
[2154]	1167	{
[2430]	1168	d[i_] = d[i_] + v*vt[i,i_];
[2154]	1169	}
[2430]	1170	}
	1171
	1172	//
	1173	// Reduce problem:
	1174	// 1. RightPart := RightPart - DesignMatrix*d
	1175	// 2. DesignMatrix := DesignMatrix*C
	1176	//
	1177	for(i=1; i<=n; i++)
	1178	{
	1179	v = 0.0;
	1180	for(i_=1; i_<=m+1;i_++)
[2154]	1181	{
[2430]	1182	v += designmatrix[i,i_]*d[i_];
[2154]	1183	}
[2430]	1184	rightpart[i] = rightpart[i]-v;
[2154]	1185	}
[2430]	1186	reducedsize = m+1-nc;
	1187	tmpmatrix = new double[n+1, reducedsize+1];
	1188	tmp = new double[n+1];
	1189	blas.matrixmatrixmultiply(ref designmatrix, 1, n, 1, m+1, false, ref c, 1, m+1, 1, reducedsize, false, 1.0, ref tmpmatrix, 1, n, 1, reducedsize, 0.0, ref tmp);
	1190	blas.copymatrix(ref tmpmatrix, 1, n, 1, reducedsize, ref designmatrix, 1, n, 1, reducedsize);
[2154]	1191	}
	1192
	1193	//
[2430]	1194	// Solve reduced problem DesignMatrix*t = RightPart.
[2154]	1195	//
[2430]	1196	if( !svd.svddecomposition(designmatrix, n, reducedsize, 1, 1, 2, ref ws, ref u, ref vt) )
[2154]	1197	{
	1198	result = false;
	1199	return result;
	1200	}
[2430]	1201	tmp = new double[reducedsize+1];
	1202	tmp2 = new double[reducedsize+1];
	1203	for(i=1; i<=reducedsize; i++)
[2154]	1204	{
[2430]	1205	tmp[i] = 0;
[2154]	1206	}
[2430]	1207	for(i=1; i<=n; i++)
[2154]	1208	{
[2430]	1209	v = rightpart[i];
	1210	for(i_=1; i_<=reducedsize;i_++)
[2154]	1211	{
[2430]	1212	tmp[i_] = tmp[i_] + v*u[i,i_];
[2154]	1213	}
	1214	}
[2430]	1215	for(i=1; i<=reducedsize; i++)
[2154]	1216	{
[2430]	1217	if( ws[i]!=0 & ws[i]>AP.Math.MachineEpsilon10Math.Sqrt(nc)*ws[1] )
[2154]	1218	{
[2430]	1219	tmp[i] = tmp[i]/ws[i];
[2154]	1220	}
[2430]	1221	else
	1222	{
	1223	tmp[i] = 0;
	1224	}
[2154]	1225	}
[2430]	1226	for(i=1; i<=reducedsize; i++)
[2154]	1227	{
[2430]	1228	tmp2[i] = 0;
[2154]	1229	}
[2430]	1230	for(i=1; i<=reducedsize; i++)
[2154]	1231	{
	1232	v = tmp[i];
[2430]	1233	for(i_=1; i_<=reducedsize;i_++)
[2154]	1234	{
[2430]	1235	tmp2[i_] = tmp2[i_] + v*vt[i,i_];
[2154]	1236	}
	1237	}
	1238
	1239	//
[2430]	1240	// Solution is in the tmp2.
	1241	// Transform it from t to x.
[2154]	1242	//
[2430]	1243	ctbl = new double[m+2+1];
	1244	for(i=1; i<=m+1; i++)
[2154]	1245	{
	1246	v = 0.0;
[2430]	1247	for(i_=1; i_<=reducedsize;i_++)
[2154]	1248	{
[2430]	1249	v += c[i,i_]*tmp2[i_];
[2154]	1250	}
[2430]	1251	ctbl[i-1] = v+d[i];
[2154]	1252	}
[2430]	1253	ctbl[m+1] = a;
	1254	ctbl[m+2] = b;
[2154]	1255	return result;
	1256	}
	1257
	1258
[2430]	1259	/*************************************************************************
	1260	Calculation of a Chebyshev polynomial obtained during least squares
	1261	approximaion at the given point.
[2154]	1262
[2430]	1263	Input parameters:
	1264	M - order of polynomial (parameter of the
	1265	BuildChebyshevLeastSquares function).
	1266	A - coefficient table.
	1267	A[0..M] contains coefficients of the i-th Chebyshev polynomial.
	1268	A[M+1] contains left boundary of approximation interval.
	1269	A[M+2] contains right boundary of approximation interval.
	1270	X - point to perform calculations in.
[2154]	1271
[2430]	1272	The result is the value at the given point.
[2154]	1273
[2430]	1274	It should be noted that array A contains coefficients of the Chebyshev
	1275	polynomials defined on interval [-1,1]. Argument is reduced to this
	1276	interval before calculating polynomial value.
	1277	-- ALGLIB --
	1278	Copyright by Bochkanov Sergey
	1279	*************************************************************************/
	1280	public static double calculatechebyshevleastsquares(int m,
	1281	ref double[] a,
	1282	double x)
	1283	{
	1284	double result = 0;
	1285	double b1 = 0;
	1286	double b2 = 0;
	1287	int i = 0;
[2154]	1288
[2430]	1289	x = 2*(x-a[m+1])/(a[m+2]-a[m+1])-1;
	1290	b1 = 0;
	1291	b2 = 0;
	1292	i = m;
	1293	do
	1294	{
	1295	result = 2xb1-b2+a[i];
	1296	b2 = b1;
	1297	b1 = result;
	1298	i = i-1;
	1299	}
	1300	while( i>=0 );
	1301	result = result-x*b2;
	1302	return result;
[2154]	1303	}
	1304	}
	1305	}

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