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source: trunk/sources/HeuristicLab.ExtLibs/HeuristicLab.ALGLIB/2.3.0/ALGLIB-2.3.0/ratint.cs @ 2806

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Last change on this file since 2806 was 2806, checked in by gkronber, 15 years ago
Added plugin for new version of ALGLIB. #875 (Update ALGLIB sources)
File size: 47.1 KB

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[2806]	1	/*************************************************************************
	2	Copyright (c) 2007-2009, 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 ratint
	26	{
	27	/*************************************************************************
	28	Barycentric interpolant.
	29	*************************************************************************/
	30	public struct barycentricinterpolant
	31	{
	32	public int n;
	33	public double sy;
	34	public double[] x;
	35	public double[] y;
	36	public double[] w;
	37	};
	38
	39
	40	/*************************************************************************
	41	Barycentric fitting report:
	42	TaskRCond reciprocal of task's condition number
	43	RMSError RMS error
	44	AvgError average error
	45	AvgRelError average relative error (for non-zero Y[I])
	46	MaxError maximum error
	47	*************************************************************************/
	48	public struct barycentricfitreport
	49	{
	50	public double taskrcond;
	51	public int dbest;
	52	public double rmserror;
	53	public double avgerror;
	54	public double avgrelerror;
	55	public double maxerror;
	56	};
	57
	58
	59
	60
	61	public const int brcvnum = 10;
	62
	63
	64	/*************************************************************************
	65	Rational interpolation using barycentric formula
	66
	67	F(t) = SUM(i=0,n-1,w[i]*f[i]/(t-x[i])) / SUM(i=0,n-1,w[i]/(t-x[i]))
	68
	69	Input parameters:
	70	B - barycentric interpolant built with one of model building
	71	subroutines.
	72	T - interpolation point
	73
	74	Result:
	75	barycentric interpolant F(t)
	76
	77	-- ALGLIB --
	78	Copyright 17.08.2009 by Bochkanov Sergey
	79	*************************************************************************/
	80	public static double barycentriccalc(ref barycentricinterpolant b,
	81	double t)
	82	{
	83	double result = 0;
	84	double s1 = 0;
	85	double s2 = 0;
	86	double s = 0;
	87	double v = 0;
	88	int i = 0;
	89
	90
	91	//
	92	// special case: N=1
	93	//
	94	if( b.n==1 )
	95	{
	96	result = b.sy*b.y[0];
	97	return result;
	98	}
	99
	100	//
	101	// Here we assume that task is normalized, i.e.:
	102	// 1. abs(Y[i])<=1
	103	// 2. abs(W[i])<=1
	104	// 3. X[] is ordered
	105	//
	106	s = Math.Abs(t-b.x[0]);
	107	for(i=0; i<=b.n-1; i++)
	108	{
	109	v = b.x[i];
	110	if( (double)(v)==(double)(t) )
	111	{
	112	result = b.sy*b.y[i];
	113	return result;
	114	}
	115	v = Math.Abs(t-v);
	116	if( (double)(v)<(double)(s) )
	117	{
	118	s = v;
	119	}
	120	}
	121	s1 = 0;
	122	s2 = 0;
	123	for(i=0; i<=b.n-1; i++)
	124	{
	125	v = s/(t-b.x[i]);
	126	v = v*b.w[i];
	127	s1 = s1+v*b.y[i];
	128	s2 = s2+v;
	129	}
	130	result = b.sy*s1/s2;
	131	return result;
	132	}
	133
	134
	135	/*************************************************************************
	136	Differentiation of barycentric interpolant: first derivative.
	137
	138	Algorithm used in this subroutine is very robust and should not fail until
	139	provided with values too close to MaxRealNumber (usually MaxRealNumber/N
	140	or greater will overflow).
	141
	142	INPUT PARAMETERS:
	143	B - barycentric interpolant built with one of model building
	144	subroutines.
	145	T - interpolation point
	146
	147	OUTPUT PARAMETERS:
	148	F - barycentric interpolant at T
	149	DF - first derivative
	150
	151	NOTE
	152
	153
	154	-- ALGLIB --
	155	Copyright 17.08.2009 by Bochkanov Sergey
	156	*************************************************************************/
	157	public static void barycentricdiff1(ref barycentricinterpolant b,
	158	double t,
	159	ref double f,
	160	ref double df)
	161	{
	162	double v = 0;
	163	double vv = 0;
	164	int i = 0;
	165	int k = 0;
	166	double n0 = 0;
	167	double n1 = 0;
	168	double d0 = 0;
	169	double d1 = 0;
	170	double s0 = 0;
	171	double s1 = 0;
	172	double xk = 0;
	173	double xi = 0;
	174	double xmin = 0;
	175	double xmax = 0;
	176	double xscale1 = 0;
	177	double xoffs1 = 0;
	178	double xscale2 = 0;
	179	double xoffs2 = 0;
	180	double xprev = 0;
	181
	182
	183	//
	184	// special case: N=1
	185	//
	186	if( b.n==1 )
	187	{
	188	f = b.sy*b.y[0];
	189	df = 0;
	190	return;
	191	}
	192	if( (double)(b.sy)==(double)(0) )
	193	{
	194	f = 0;
	195	df = 0;
	196	return;
	197	}
	198	System.Diagnostics.Debug.Assert((double)(b.sy)>(double)(0), "BarycentricDiff1: internal error");
	199
	200	//
	201	// We assume than N>1 and B.SY>0. Find:
	202	// 1. pivot point (X[i] closest to T)
	203	// 2. width of interval containing X[i]
	204	//
	205	v = Math.Abs(b.x[0]-t);
	206	k = 0;
	207	xmin = b.x[0];
	208	xmax = b.x[0];
	209	for(i=1; i<=b.n-1; i++)
	210	{
	211	vv = b.x[i];
	212	if( (double)(Math.Abs(vv-t))<(double)(v) )
	213	{
	214	v = Math.Abs(vv-t);
	215	k = i;
	216	}
	217	xmin = Math.Min(xmin, vv);
	218	xmax = Math.Max(xmax, vv);
	219	}
	220
	221	//
	222	// pivot point found, calculate dNumerator and dDenominator
	223	//
	224	xscale1 = 1/(xmax-xmin);
	225	xoffs1 = -(xmin/(xmax-xmin))+1;
	226	xscale2 = 2;
	227	xoffs2 = -3;
	228	t = t*xscale1+xoffs1;
	229	t = t*xscale2+xoffs2;
	230	xk = b.x[k];
	231	xk = xk*xscale1+xoffs1;
	232	xk = xk*xscale2+xoffs2;
	233	v = t-xk;
	234	n0 = 0;
	235	n1 = 0;
	236	d0 = 0;
	237	d1 = 0;
	238	xprev = -2;
	239	for(i=0; i<=b.n-1; i++)
	240	{
	241	xi = b.x[i];
	242	xi = xi*xscale1+xoffs1;
	243	xi = xi*xscale2+xoffs2;
	244	System.Diagnostics.Debug.Assert((double)(xi)>(double)(xprev), "BarycentricDiff1: points are too close!");
	245	xprev = xi;
	246	if( i!=k )
	247	{
	248	vv = AP.Math.Sqr(t-xi);
	249	s0 = (t-xk)/(t-xi);
	250	s1 = (xk-xi)/vv;
	251	}
	252	else
	253	{
	254	s0 = 1;
	255	s1 = 0;
	256	}
	257	vv = b.w[i]*b.y[i];
	258	n0 = n0+s0*vv;
	259	n1 = n1+s1*vv;
	260	vv = b.w[i];
	261	d0 = d0+s0*vv;
	262	d1 = d1+s1*vv;
	263	}
	264	f = b.sy*n0/d0;
	265	df = (n1d0-n0d1)/AP.Math.Sqr(d0);
	266	if( (double)(df)!=(double)(0) )
	267	{
	268	df = Math.Sign(df)*Math.Exp(Math.Log(Math.Abs(df))+Math.Log(b.sy)+Math.Log(xscale1)+Math.Log(xscale2));
	269	}
	270	}
	271
	272
	273	/*************************************************************************
	274	Differentiation of barycentric interpolant: first/second derivatives.
	275
	276	INPUT PARAMETERS:
	277	B - barycentric interpolant built with one of model building
	278	subroutines.
	279	T - interpolation point
	280
	281	OUTPUT PARAMETERS:
	282	F - barycentric interpolant at T
	283	DF - first derivative
	284	D2F - second derivative
	285
	286	NOTE: this algorithm may fail due to overflow/underflor if used on data
	287	whose values are close to MaxRealNumber or MinRealNumber. Use more robust
	288	BarycentricDiff1() subroutine in such cases.
	289
	290
	291	-- ALGLIB --
	292	Copyright 17.08.2009 by Bochkanov Sergey
	293	*************************************************************************/
	294	public static void barycentricdiff2(ref barycentricinterpolant b,
	295	double t,
	296	ref double f,
	297	ref double df,
	298	ref double d2f)
	299	{
	300	double v = 0;
	301	double vv = 0;
	302	int i = 0;
	303	int k = 0;
	304	double n0 = 0;
	305	double n1 = 0;
	306	double n2 = 0;
	307	double d0 = 0;
	308	double d1 = 0;
	309	double d2 = 0;
	310	double s0 = 0;
	311	double s1 = 0;
	312	double s2 = 0;
	313	double xk = 0;
	314	double xi = 0;
	315
	316	f = 0;
	317	df = 0;
	318	d2f = 0;
	319
	320	//
	321	// special case: N=1
	322	//
	323	if( b.n==1 )
	324	{
	325	f = b.sy*b.y[0];
	326	df = 0;
	327	d2f = 0;
	328	return;
	329	}
	330	if( (double)(b.sy)==(double)(0) )
	331	{
	332	f = 0;
	333	df = 0;
	334	d2f = 0;
	335	return;
	336	}
	337	System.Diagnostics.Debug.Assert((double)(b.sy)>(double)(0), "BarycentricDiff: internal error");
	338
	339	//
	340	// We assume than N>1 and B.SY>0. Find:
	341	// 1. pivot point (X[i] closest to T)
	342	// 2. width of interval containing X[i]
	343	//
	344	v = Math.Abs(b.x[0]-t);
	345	k = 0;
	346	for(i=1; i<=b.n-1; i++)
	347	{
	348	vv = b.x[i];
	349	if( (double)(Math.Abs(vv-t))<(double)(v) )
	350	{
	351	v = Math.Abs(vv-t);
	352	k = i;
	353	}
	354	}
	355
	356	//
	357	// pivot point found, calculate dNumerator and dDenominator
	358	//
	359	xk = b.x[k];
	360	v = t-xk;
	361	n0 = 0;
	362	n1 = 0;
	363	n2 = 0;
	364	d0 = 0;
	365	d1 = 0;
	366	d2 = 0;
	367	for(i=0; i<=b.n-1; i++)
	368	{
	369	if( i!=k )
	370	{
	371	xi = b.x[i];
	372	vv = AP.Math.Sqr(t-xi);
	373	s0 = (t-xk)/(t-xi);
	374	s1 = (xk-xi)/vv;
	375	s2 = -(2(xk-xi)/(vv(t-xi)));
	376	}
	377	else
	378	{
	379	s0 = 1;
	380	s1 = 0;
	381	s2 = 0;
	382	}
	383	vv = b.w[i]*b.y[i];
	384	n0 = n0+s0*vv;
	385	n1 = n1+s1*vv;
	386	n2 = n2+s2*vv;
	387	vv = b.w[i];
	388	d0 = d0+s0*vv;
	389	d1 = d1+s1*vv;
	390	d2 = d2+s2*vv;
	391	}
	392	f = b.sy*n0/d0;
	393	df = b.sy(n1d0-n0*d1)/AP.Math.Sqr(d0);
	394	d2f = b.sy((n2d0-n0d2)AP.Math.Sqr(d0)-(n1d0-n0d1)2d0*d1)/AP.Math.Sqr(AP.Math.Sqr(d0));
	395	}
	396
	397
	398	/*************************************************************************
	399	This subroutine performs linear transformation of the argument.
	400
	401	INPUT PARAMETERS:
	402	B - rational interpolant in barycentric form
	403	CA, CB - transformation coefficients: x = CA*t + CB
	404
	405	OUTPUT PARAMETERS:
	406	B - transformed interpolant with X replaced by T
	407
	408	-- ALGLIB PROJECT --
	409	Copyright 19.08.2009 by Bochkanov Sergey
	410	*************************************************************************/
	411	public static void barycentriclintransx(ref barycentricinterpolant b,
	412	double ca,
	413	double cb)
	414	{
	415	int i = 0;
	416	int j = 0;
	417	double v = 0;
	418
	419
	420	//
	421	// special case, replace by constant F(CB)
	422	//
	423	if( (double)(ca)==(double)(0) )
	424	{
	425	b.sy = barycentriccalc(ref b, cb);
	426	v = 1;
	427	for(i=0; i<=b.n-1; i++)
	428	{
	429	b.y[i] = 1;
	430	b.w[i] = v;
	431	v = -v;
	432	}
	433	return;
	434	}
	435
	436	//
	437	// general case: CA<>0
	438	//
	439	for(i=0; i<=b.n-1; i++)
	440	{
	441	b.x[i] = (b.x[i]-cb)/ca;
	442	}
	443	if( (double)(ca)<(double)(0) )
	444	{
	445	for(i=0; i<=b.n-1; i++)
	446	{
	447	if( i<b.n-1-i )
	448	{
	449	j = b.n-1-i;
	450	v = b.x[i];
	451	b.x[i] = b.x[j];
	452	b.x[j] = v;
	453	v = b.y[i];
	454	b.y[i] = b.y[j];
	455	b.y[j] = v;
	456	v = b.w[i];
	457	b.w[i] = b.w[j];
	458	b.w[j] = v;
	459	}
	460	else
	461	{
	462	break;
	463	}
	464	}
	465	}
	466	}
	467
	468
	469	/*************************************************************************
	470	This subroutine performs linear transformation of the barycentric
	471	interpolant.
	472
	473	INPUT PARAMETERS:
	474	B - rational interpolant in barycentric form
	475	CA, CB - transformation coefficients: B2(x) = CA*B(x) + CB
	476
	477	OUTPUT PARAMETERS:
	478	B - transformed interpolant
	479
	480	-- ALGLIB PROJECT --
	481	Copyright 19.08.2009 by Bochkanov Sergey
	482	*************************************************************************/
	483	public static void barycentriclintransy(ref barycentricinterpolant b,
	484	double ca,
	485	double cb)
	486	{
	487	int i = 0;
	488	double v = 0;
	489	int i_ = 0;
	490
	491	for(i=0; i<=b.n-1; i++)
	492	{
	493	b.y[i] = cab.syb.y[i]+cb;
	494	}
	495	b.sy = 0;
	496	for(i=0; i<=b.n-1; i++)
	497	{
	498	b.sy = Math.Max(b.sy, Math.Abs(b.y[i]));
	499	}
	500	if( (double)(b.sy)>(double)(0) )
	501	{
	502	v = 1/b.sy;
	503	for(i_=0; i_<=b.n-1;i_++)
	504	{
	505	b.y[i_] = v*b.y[i_];
	506	}
	507	}
	508	}
	509
	510
	511	/*************************************************************************
	512	Extracts X/Y/W arrays from rational interpolant
	513
	514	INPUT PARAMETERS:
	515	B - barycentric interpolant
	516
	517	OUTPUT PARAMETERS:
	518	N - nodes count, N>0
	519	X - interpolation nodes, array[0..N-1]
	520	F - function values, array[0..N-1]
	521	W - barycentric weights, array[0..N-1]
	522
	523	-- ALGLIB --
	524	Copyright 17.08.2009 by Bochkanov Sergey
	525	*************************************************************************/
	526	public static void barycentricunpack(ref barycentricinterpolant b,
	527	ref int n,
	528	ref double[] x,
	529	ref double[] y,
	530	ref double[] w)
	531	{
	532	double v = 0;
	533	int i_ = 0;
	534
	535	n = b.n;
	536	x = new double[n];
	537	y = new double[n];
	538	w = new double[n];
	539	v = b.sy;
	540	for(i_=0; i_<=n-1;i_++)
	541	{
	542	x[i_] = b.x[i_];
	543	}
	544	for(i_=0; i_<=n-1;i_++)
	545	{
	546	y[i_] = v*b.y[i_];
	547	}
	548	for(i_=0; i_<=n-1;i_++)
	549	{
	550	w[i_] = b.w[i_];
	551	}
	552	}
	553
	554
	555	/*************************************************************************
	556	Serialization of the barycentric interpolant
	557
	558	INPUT PARAMETERS:
	559	B - barycentric interpolant
	560
	561	OUTPUT PARAMETERS:
	562	RA - array of real numbers which contains interpolant,
	563	array[0..RLen-1]
	564	RLen - RA lenght
	565
	566	-- ALGLIB --
	567	Copyright 17.08.2009 by Bochkanov Sergey
	568	*************************************************************************/
	569	public static void barycentricserialize(ref barycentricinterpolant b,
	570	ref double[] ra,
	571	ref int ralen)
	572	{
	573	int i_ = 0;
	574	int i1_ = 0;
	575
	576	ralen = 2+2+3*b.n;
	577	ra = new double[ralen];
	578	ra[0] = ralen;
	579	ra[1] = brcvnum;
	580	ra[2] = b.n;
	581	ra[3] = b.sy;
	582	i1_ = (0) - (4);
	583	for(i_=4; i_<=4+b.n-1;i_++)
	584	{
	585	ra[i_] = b.x[i_+i1_];
	586	}
	587	i1_ = (0) - (4+b.n);
	588	for(i_=4+b.n; i_<=4+2*b.n-1;i_++)
	589	{
	590	ra[i_] = b.y[i_+i1_];
	591	}
	592	i1_ = (0) - (4+2*b.n);
	593	for(i_=4+2b.n; i_<=4+3b.n-1;i_++)
	594	{
	595	ra[i_] = b.w[i_+i1_];
	596	}
	597	}
	598
	599
	600	/*************************************************************************
	601	Unserialization of the barycentric interpolant
	602
	603	INPUT PARAMETERS:
	604	RA - array of real numbers which contains interpolant,
	605
	606	OUTPUT PARAMETERS:
	607	B - barycentric interpolant
	608
	609	-- ALGLIB --
	610	Copyright 17.08.2009 by Bochkanov Sergey
	611	*************************************************************************/
	612	public static void barycentricunserialize(ref double[] ra,
	613	ref barycentricinterpolant b)
	614	{
	615	int i_ = 0;
	616	int i1_ = 0;
	617
	618	System.Diagnostics.Debug.Assert((int)Math.Round(ra[1])==brcvnum, "BarycentricUnserialize: corrupted array!");
	619	b.n = (int)Math.Round(ra[2]);
	620	b.sy = ra[3];
	621	b.x = new double[b.n];
	622	b.y = new double[b.n];
	623	b.w = new double[b.n];
	624	i1_ = (4) - (0);
	625	for(i_=0; i_<=b.n-1;i_++)
	626	{
	627	b.x[i_] = ra[i_+i1_];
	628	}
	629	i1_ = (4+b.n) - (0);
	630	for(i_=0; i_<=b.n-1;i_++)
	631	{
	632	b.y[i_] = ra[i_+i1_];
	633	}
	634	i1_ = (4+2*b.n) - (0);
	635	for(i_=0; i_<=b.n-1;i_++)
	636	{
	637	b.w[i_] = ra[i_+i1_];
	638	}
	639	}
	640
	641
	642	/*************************************************************************
	643	Copying of the barycentric interpolant
	644
	645	INPUT PARAMETERS:
	646	B - barycentric interpolant
	647
	648	OUTPUT PARAMETERS:
	649	B2 - copy(B1)
	650
	651	-- ALGLIB --
	652	Copyright 17.08.2009 by Bochkanov Sergey
	653	*************************************************************************/
	654	public static void barycentriccopy(ref barycentricinterpolant b,
	655	ref barycentricinterpolant b2)
	656	{
	657	int i_ = 0;
	658
	659	b2.n = b.n;
	660	b2.sy = b.sy;
	661	b2.x = new double[b2.n];
	662	b2.y = new double[b2.n];
	663	b2.w = new double[b2.n];
	664	for(i_=0; i_<=b2.n-1;i_++)
	665	{
	666	b2.x[i_] = b.x[i_];
	667	}
	668	for(i_=0; i_<=b2.n-1;i_++)
	669	{
	670	b2.y[i_] = b.y[i_];
	671	}
	672	for(i_=0; i_<=b2.n-1;i_++)
	673	{
	674	b2.w[i_] = b.w[i_];
	675	}
	676	}
	677
	678
	679	/*************************************************************************
	680	Rational interpolant from X/Y/W arrays
	681
	682	F(t) = SUM(i=0,n-1,w[i]*f[i]/(t-x[i])) / SUM(i=0,n-1,w[i]/(t-x[i]))
	683
	684	INPUT PARAMETERS:
	685	X - interpolation nodes, array[0..N-1]
	686	F - function values, array[0..N-1]
	687	W - barycentric weights, array[0..N-1]
	688	N - nodes count, N>0
	689
	690	OUTPUT PARAMETERS:
	691	B - barycentric interpolant built from (X, Y, W)
	692
	693	-- ALGLIB --
	694	Copyright 17.08.2009 by Bochkanov Sergey
	695	*************************************************************************/
	696	public static void barycentricbuildxyw(ref double[] x,
	697	ref double[] y,
	698	ref double[] w,
	699	int n,
	700	ref barycentricinterpolant b)
	701	{
	702	int i_ = 0;
	703
	704	System.Diagnostics.Debug.Assert(n>0, "BarycentricBuildXYW: incorrect N!");
	705
	706	//
	707	// fill X/Y/W
	708	//
	709	b.x = new double[n];
	710	b.y = new double[n];
	711	b.w = new double[n];
	712	for(i_=0; i_<=n-1;i_++)
	713	{
	714	b.x[i_] = x[i_];
	715	}
	716	for(i_=0; i_<=n-1;i_++)
	717	{
	718	b.y[i_] = y[i_];
	719	}
	720	for(i_=0; i_<=n-1;i_++)
	721	{
	722	b.w[i_] = w[i_];
	723	}
	724	b.n = n;
	725
	726	//
	727	// Normalize
	728	//
	729	barycentricnormalize(ref b);
	730	}
	731
	732
	733	/*************************************************************************
	734	Rational interpolant without poles
	735
	736	The subroutine constructs the rational interpolating function without real
	737	poles (see 'Barycentric rational interpolation with no poles and high
	738	rates of approximation', Michael S. Floater. and Kai Hormann, for more
	739	information on this subject).
	740
	741	Input parameters:
	742	X - interpolation nodes, array[0..N-1].
	743	Y - function values, array[0..N-1].
	744	N - number of nodes, N>0.
	745	D - order of the interpolation scheme, 0 <= D <= N-1.
	746	D<0 will cause an error.
	747	D>=N it will be replaced with D=N-1.
	748	if you don't know what D to choose, use small value about 3-5.
	749
	750	Output parameters:
	751	B - barycentric interpolant.
	752
	753	Note:
	754	this algorithm always succeeds and calculates the weights with close
	755	to machine precision.
	756
	757	-- ALGLIB PROJECT --
	758	Copyright 17.06.2007 by Bochkanov Sergey
	759	*************************************************************************/
	760	public static void barycentricbuildfloaterhormann(ref double[] x,
	761	ref double[] y,
	762	int n,
	763	int d,
	764	ref barycentricinterpolant b)
	765	{
	766	double s0 = 0;
	767	double s = 0;
	768	double v = 0;
	769	int i = 0;
	770	int j = 0;
	771	int k = 0;
	772	int[] perm = new int[0];
	773	double[] wtemp = new double[0];
	774	int i_ = 0;
	775
	776	System.Diagnostics.Debug.Assert(n>0, "BarycentricFloaterHormann: N<=0!");
	777	System.Diagnostics.Debug.Assert(d>=0, "BarycentricFloaterHormann: incorrect D!");
	778
	779	//
	780	// Prepare
	781	//
	782	if( d>n-1 )
	783	{
	784	d = n-1;
	785	}
	786	b.n = n;
	787
	788	//
	789	// special case: N=1
	790	//
	791	if( n==1 )
	792	{
	793	b.x = new double[n];
	794	b.y = new double[n];
	795	b.w = new double[n];
	796	b.x[0] = x[0];
	797	b.y[0] = y[0];
	798	b.w[0] = 1;
	799	barycentricnormalize(ref b);
	800	return;
	801	}
	802
	803	//
	804	// Fill X/Y
	805	//
	806	b.x = new double[n];
	807	b.y = new double[n];
	808	for(i_=0; i_<=n-1;i_++)
	809	{
	810	b.x[i_] = x[i_];
	811	}
	812	for(i_=0; i_<=n-1;i_++)
	813	{
	814	b.y[i_] = y[i_];
	815	}
	816	tsort.tagsortfastr(ref b.x, ref b.y, n);
	817
	818	//
	819	// Calculate Wk
	820	//
	821	b.w = new double[n];
	822	s0 = 1;
	823	for(k=1; k<=d; k++)
	824	{
	825	s0 = -s0;
	826	}
	827	for(k=0; k<=n-1; k++)
	828	{
	829
	830	//
	831	// Wk
	832	//
	833	s = 0;
	834	for(i=Math.Max(k-d, 0); i<=Math.Min(k, n-1-d); i++)
	835	{
	836	v = 1;
	837	for(j=i; j<=i+d; j++)
	838	{
	839	if( j!=k )
	840	{
	841	v = v/Math.Abs(b.x[k]-b.x[j]);
	842	}
	843	}
	844	s = s+v;
	845	}
	846	b.w[k] = s0*s;
	847
	848	//
	849	// Next S0
	850	//
	851	s0 = -s0;
	852	}
	853
	854	//
	855	// Normalize
	856	//
	857	barycentricnormalize(ref b);
	858	}
	859
	860
	861	/*************************************************************************
	862	Weghted rational least squares fitting using Floater-Hormann rational
	863	functions with optimal D chosen from [0,9], with constraints and
	864	individual weights.
	865
	866	Equidistant grid with M node on [min(x),max(x)] is used to build basis
	867	functions. Different values of D are tried, optimal D (least WEIGHTED root
	868	mean square error) is chosen. Task is linear, so linear least squares
	869	solver is used. Complexity of this computational scheme is O(N*M^2)
	870	(mostly dominated by the least squares solver).
	871
	872	SEE ALSO
	873	* BarycentricFitFloaterHormann(), "lightweight" fitting without invididual
	874	weights and constraints.
	875
	876	INPUT PARAMETERS:
	877	X - points, array[0..N-1].
	878	Y - function values, array[0..N-1].
	879	W - weights, array[0..N-1]
	880	Each summand in square sum of approximation deviations from
	881	given values is multiplied by the square of corresponding
	882	weight. Fill it by 1's if you don't want to solve weighted
	883	task.
	884	N - number of points, N>0.
	885	XC - points where function values/derivatives are constrained,
	886	array[0..K-1].
	887	YC - values of constraints, array[0..K-1]
	888	DC - array[0..K-1], types of constraints:
	889	* DC[i]=0 means that S(XC[i])=YC[i]
	890	* DC[i]=1 means that S'(XC[i])=YC[i]
	891	SEE BELOW FOR IMPORTANT INFORMATION ON CONSTRAINTS
	892	K - number of constraints, 0<=K<M.
	893	K=0 means no constraints (XC/YC/DC are not used in such cases)
	894	M - number of basis functions ( = number_of_nodes), M>=2.
	895
	896	OUTPUT PARAMETERS:
	897	Info- same format as in LSFitLinearWC() subroutine.
	898	* Info>0 task is solved
	899	* Info<=0 an error occured:
	900	-4 means inconvergence of internal SVD
	901	-3 means inconsistent constraints
	902	-1 means another errors in parameters passed
	903	(N<=0, for example)
	904	B - barycentric interpolant.
	905	Rep - report, same format as in LSFitLinearWC() subroutine.
	906	Following fields are set:
	907	* DBest best value of the D parameter
	908	* RMSError rms error on the (X,Y).
	909	* AvgError average error on the (X,Y).
	910	* AvgRelError average relative error on the non-zero Y
	911	* MaxError maximum error
	912	NON-WEIGHTED ERRORS ARE CALCULATED
	913
	914	IMPORTANT:
	915	this subroitine doesn't calculate task's condition number for K<>0.
	916
	917	SETTING CONSTRAINTS - DANGERS AND OPPORTUNITIES:
	918
	919	Setting constraints can lead to undesired results, like ill-conditioned
	920	behavior, or inconsistency being detected. From the other side, it allows
	921	us to improve quality of the fit. Here we summarize our experience with
	922	constrained barycentric interpolants:
	923	* excessive constraints can be inconsistent. Floater-Hormann basis
	924	functions aren't as flexible as splines (although they are very smooth).
	925	* the more evenly constraints are spread across [min(x),max(x)], the more
	926	chances that they will be consistent
	927	* the greater is M (given fixed constraints), the more chances that
	928	constraints will be consistent
	929	* in the general case, consistency of constraints IS NOT GUARANTEED.
	930	* in the several special cases, however, we CAN guarantee consistency.
	931	* one of this cases is constraints on the function VALUES at the interval
	932	boundaries. Note that consustency of the constraints on the function
	933	DERIVATIVES is NOT guaranteed (you can use in such cases cubic splines
	934	which are more flexible).
	935	* another special case is ONE constraint on the function value (OR, but
	936	not AND, derivative) anywhere in the interval
	937
	938	Our final recommendation is to use constraints WHEN AND ONLY WHEN you
	939	can't solve your task without them. Anything beyond special cases given
	940	above is not guaranteed and may result in inconsistency.
	941
	942	-- ALGLIB PROJECT --
	943	Copyright 18.08.2009 by Bochkanov Sergey
	944	*************************************************************************/
	945	public static void barycentricfitfloaterhormannwc(ref double[] x,
	946	ref double[] y,
	947	ref double[] w,
	948	int n,
	949	ref double[] xc,
	950	ref double[] yc,
	951	ref int[] dc,
	952	int k,
	953	int m,
	954	ref int info,
	955	ref barycentricinterpolant b,
	956	ref barycentricfitreport rep)
	957	{
	958	int d = 0;
	959	int i = 0;
	960	double wrmscur = 0;
	961	double wrmsbest = 0;
	962	barycentricinterpolant locb = new barycentricinterpolant();
	963	barycentricfitreport locrep = new barycentricfitreport();
	964	int locinfo = 0;
	965
	966	if( n<1 \| m<2 \| k<0 \| k>=m )
	967	{
	968	info = -1;
	969	return;
	970	}
	971
	972	//
	973	// Find optimal D
	974	//
	975	// Info is -3 by default (degenerate constraints).
	976	// If LocInfo will always be equal to -3, Info will remain equal to -3.
	977	// If at least once LocInfo will be -4, Info will be -4.
	978	//
	979	wrmsbest = AP.Math.MaxRealNumber;
	980	rep.dbest = -1;
	981	info = -3;
	982	for(d=0; d<=Math.Min(9, n-1); d++)
	983	{
	984	barycentricfitwcfixedd(x, y, ref w, n, xc, yc, ref dc, k, m, d, ref locinfo, ref locb, ref locrep);
	985	System.Diagnostics.Debug.Assert(locinfo==-4 \| locinfo==-3 \| locinfo>0, "BarycentricFitFloaterHormannWC: unexpected result from BarycentricFitWCFixedD!");
	986	if( locinfo>0 )
	987	{
	988
	989	//
	990	// Calculate weghted RMS
	991	//
	992	wrmscur = 0;
	993	for(i=0; i<=n-1; i++)
	994	{
	995	wrmscur = wrmscur+AP.Math.Sqr(w[i]*(y[i]-barycentriccalc(ref locb, x[i])));
	996	}
	997	wrmscur = Math.Sqrt(wrmscur/n);
	998	if( (double)(wrmscur)<(double)(wrmsbest) \| rep.dbest<0 )
	999	{
	1000	barycentriccopy(ref locb, ref b);
	1001	rep.dbest = d;
	1002	info = 1;
	1003	rep.rmserror = locrep.rmserror;
	1004	rep.avgerror = locrep.avgerror;
	1005	rep.avgrelerror = locrep.avgrelerror;
	1006	rep.maxerror = locrep.maxerror;
	1007	rep.taskrcond = locrep.taskrcond;
	1008	wrmsbest = wrmscur;
	1009	}
	1010	}
	1011	else
	1012	{
	1013	if( locinfo!=-3 & info<0 )
	1014	{
	1015	info = locinfo;
	1016	}
	1017	}
	1018	}
	1019	}
	1020
	1021
	1022	/*************************************************************************
	1023	Rational least squares fitting, without weights and constraints.
	1024
	1025	See BarycentricFitFloaterHormannWC() for more information.
	1026
	1027	-- ALGLIB PROJECT --
	1028	Copyright 18.08.2009 by Bochkanov Sergey
	1029	*************************************************************************/
	1030	public static void barycentricfitfloaterhormann(ref double[] x,
	1031	ref double[] y,
	1032	int n,
	1033	int m,
	1034	ref int info,
	1035	ref barycentricinterpolant b,
	1036	ref barycentricfitreport rep)
	1037	{
	1038	double[] w = new double[0];
	1039	double[] xc = new double[0];
	1040	double[] yc = new double[0];
	1041	int[] dc = new int[0];
	1042	int i = 0;
	1043
	1044	if( n<1 )
	1045	{
	1046	info = -1;
	1047	return;
	1048	}
	1049	w = new double[n];
	1050	for(i=0; i<=n-1; i++)
	1051	{
	1052	w[i] = 1;
	1053	}
	1054	barycentricfitfloaterhormannwc(ref x, ref y, ref w, n, ref xc, ref yc, ref dc, 0, m, ref info, ref b, ref rep);
	1055	}
	1056
	1057
	1058	/*************************************************************************
	1059	Normalization of barycentric interpolant:
	1060	* B.N, B.X, B.Y and B.W are initialized
	1061	* B.SY is NOT initialized
	1062	* Y[] is normalized, scaling coefficient is stored in B.SY
	1063	* W[] is normalized, no scaling coefficient is stored
	1064	* X[] is sorted
	1065
	1066	Internal subroutine.
	1067	*************************************************************************/
	1068	private static void barycentricnormalize(ref barycentricinterpolant b)
	1069	{
	1070	int[] p1 = new int[0];
	1071	int[] p2 = new int[0];
	1072	int i = 0;
	1073	int j = 0;
	1074	int j2 = 0;
	1075	double v = 0;
	1076	int i_ = 0;
	1077
	1078
	1079	//
	1080	// Normalize task: \|Y\|<=1, \|W\|<=1, sort X[]
	1081	//
	1082	b.sy = 0;
	1083	for(i=0; i<=b.n-1; i++)
	1084	{
	1085	b.sy = Math.Max(b.sy, Math.Abs(b.y[i]));
	1086	}
	1087	if( (double)(b.sy)>(double)(0) & (double)(Math.Abs(b.sy-1))>(double)(10*AP.Math.MachineEpsilon) )
	1088	{
	1089	v = 1/b.sy;
	1090	for(i_=0; i_<=b.n-1;i_++)
	1091	{
	1092	b.y[i_] = v*b.y[i_];
	1093	}
	1094	}
	1095	v = 0;
	1096	for(i=0; i<=b.n-1; i++)
	1097	{
	1098	v = Math.Max(v, Math.Abs(b.w[i]));
	1099	}
	1100	if( (double)(v)>(double)(0) & (double)(Math.Abs(v-1))>(double)(10*AP.Math.MachineEpsilon) )
	1101	{
	1102	v = 1/v;
	1103	for(i_=0; i_<=b.n-1;i_++)
	1104	{
	1105	b.w[i_] = v*b.w[i_];
	1106	}
	1107	}
	1108	for(i=0; i<=b.n-2; i++)
	1109	{
	1110	if( (double)(b.x[i+1])<(double)(b.x[i]) )
	1111	{
	1112	tsort.tagsort(ref b.x, b.n, ref p1, ref p2);
	1113	for(j=0; j<=b.n-1; j++)
	1114	{
	1115	j2 = p2[j];
	1116	v = b.y[j];
	1117	b.y[j] = b.y[j2];
	1118	b.y[j2] = v;
	1119	v = b.w[j];
	1120	b.w[j] = b.w[j2];
	1121	b.w[j2] = v;
	1122	}
	1123	break;
	1124	}
	1125	}
	1126	}
	1127
	1128
	1129	/*************************************************************************
	1130	Internal subroutine, calculates barycentric basis functions.
	1131	Used for efficient simultaneous calculation of N basis functions.
	1132
	1133	-- ALGLIB --
	1134	Copyright 17.08.2009 by Bochkanov Sergey
	1135	*************************************************************************/
	1136	private static void barycentriccalcbasis(ref barycentricinterpolant b,
	1137	double t,
	1138	ref double[] y)
	1139	{
	1140	double s2 = 0;
	1141	double s = 0;
	1142	double v = 0;
	1143	int i = 0;
	1144	int j = 0;
	1145	int i_ = 0;
	1146
	1147
	1148	//
	1149	// special case: N=1
	1150	//
	1151	if( b.n==1 )
	1152	{
	1153	y[0] = 1;
	1154	return;
	1155	}
	1156
	1157	//
	1158	// Here we assume that task is normalized, i.e.:
	1159	// 1. abs(Y[i])<=1
	1160	// 2. abs(W[i])<=1
	1161	// 3. X[] is ordered
	1162	//
	1163	// First, we decide: should we use "safe" formula (guarded
	1164	// against overflow) or fast one?
	1165	//
	1166	s = Math.Abs(t-b.x[0]);
	1167	for(i=0; i<=b.n-1; i++)
	1168	{
	1169	v = b.x[i];
	1170	if( (double)(v)==(double)(t) )
	1171	{
	1172	for(j=0; j<=b.n-1; j++)
	1173	{
	1174	y[j] = 0;
	1175	}
	1176	y[i] = 1;
	1177	return;
	1178	}
	1179	v = Math.Abs(t-v);
	1180	if( (double)(v)<(double)(s) )
	1181	{
	1182	s = v;
	1183	}
	1184	}
	1185	s2 = 0;
	1186	for(i=0; i<=b.n-1; i++)
	1187	{
	1188	v = s/(t-b.x[i]);
	1189	v = v*b.w[i];
	1190	y[i] = v;
	1191	s2 = s2+v;
	1192	}
	1193	v = 1/s2;
	1194	for(i_=0; i_<=b.n-1;i_++)
	1195	{
	1196	y[i_] = v*y[i_];
	1197	}
	1198	}
	1199
	1200
	1201	/*************************************************************************
	1202	Internal Floater-Hormann fitting subroutine for fixed D
	1203	*************************************************************************/
	1204	private static void barycentricfitwcfixedd(double[] x,
	1205	double[] y,
	1206	ref double[] w,
	1207	int n,
	1208	double[] xc,
	1209	double[] yc,
	1210	ref int[] dc,
	1211	int k,
	1212	int m,
	1213	int d,
	1214	ref int info,
	1215	ref barycentricinterpolant b,
	1216	ref barycentricfitreport rep)
	1217	{
	1218	double[,] fmatrix = new double[0,0];
	1219	double[,] cmatrix = new double[0,0];
	1220	double[] y2 = new double[0];
	1221	double[] w2 = new double[0];
	1222	double[] sx = new double[0];
	1223	double[] sy = new double[0];
	1224	double[] sbf = new double[0];
	1225	double[] xoriginal = new double[0];
	1226	double[] yoriginal = new double[0];
	1227	double[] tmp = new double[0];
	1228	lsfit.lsfitreport lrep = new lsfit.lsfitreport();
	1229	double v0 = 0;
	1230	double v1 = 0;
	1231	double mx = 0;
	1232	barycentricinterpolant b2 = new barycentricinterpolant();
	1233	int i = 0;
	1234	int j = 0;
	1235	int relcnt = 0;
	1236	double xa = 0;
	1237	double xb = 0;
	1238	double sa = 0;
	1239	double sb = 0;
	1240	double decay = 0;
	1241	int i_ = 0;
	1242
	1243	x = (double[])x.Clone();
	1244	y = (double[])y.Clone();
	1245	xc = (double[])xc.Clone();
	1246	yc = (double[])yc.Clone();
	1247
	1248	if( n<1 \| m<2 \| k<0 \| k>=m )
	1249	{
	1250	info = -1;
	1251	return;
	1252	}
	1253	for(i=0; i<=k-1; i++)
	1254	{
	1255	info = 0;
	1256	if( dc[i]<0 )
	1257	{
	1258	info = -1;
	1259	}
	1260	if( dc[i]>1 )
	1261	{
	1262	info = -1;
	1263	}
	1264	if( info<0 )
	1265	{
	1266	return;
	1267	}
	1268	}
	1269
	1270	//
	1271	// weight decay for correct handling of task which becomes
	1272	// degenerate after constraints are applied
	1273	//
	1274	decay = 10000*AP.Math.MachineEpsilon;
	1275
	1276	//
	1277	// Scale X, Y, XC, YC
	1278	//
	1279	lsfit.lsfitscalexy(ref x, ref y, n, ref xc, ref yc, ref dc, k, ref xa, ref xb, ref sa, ref sb, ref xoriginal, ref yoriginal);
	1280
	1281	//
	1282	// allocate space, initialize:
	1283	// * FMatrix- values of basis functions at X[]
	1284	// * CMatrix- values (derivatives) of basis functions at XC[]
	1285	//
	1286	y2 = new double[n+m];
	1287	w2 = new double[n+m];
	1288	fmatrix = new double[n+m, m];
	1289	if( k>0 )
	1290	{
	1291	cmatrix = new double[k, m+1];
	1292	}
	1293	y2 = new double[n+m];
	1294	w2 = new double[n+m];
	1295
	1296	//
	1297	// Prepare design and constraints matrices:
	1298	// * fill constraints matrix
	1299	// * fill first N rows of design matrix with values
	1300	// * fill next M rows of design matrix with regularizing term
	1301	// * append M zeros to Y
	1302	// * append M elements, mean(abs(W)) each, to W
	1303	//
	1304	sx = new double[m];
	1305	sy = new double[m];
	1306	sbf = new double[m];
	1307	for(j=0; j<=m-1; j++)
	1308	{
	1309	sx[j] = (double)(2*j)/((double)(m-1))-1;
	1310	}
	1311	for(i=0; i<=m-1; i++)
	1312	{
	1313	sy[i] = 1;
	1314	}
	1315	barycentricbuildfloaterhormann(ref sx, ref sy, m, d, ref b2);
	1316	mx = 0;
	1317	for(i=0; i<=n-1; i++)
	1318	{
	1319	barycentriccalcbasis(ref b2, x[i], ref sbf);
	1320	for(i_=0; i_<=m-1;i_++)
	1321	{
	1322	fmatrix[i,i_] = sbf[i_];
	1323	}
	1324	y2[i] = y[i];
	1325	w2[i] = w[i];
	1326	mx = mx+Math.Abs(w[i])/n;
	1327	}
	1328	for(i=0; i<=m-1; i++)
	1329	{
	1330	for(j=0; j<=m-1; j++)
	1331	{
	1332	if( i==j )
	1333	{
	1334	fmatrix[n+i,j] = decay;
	1335	}
	1336	else
	1337	{
	1338	fmatrix[n+i,j] = 0;
	1339	}
	1340	}
	1341	y2[n+i] = 0;
	1342	w2[n+i] = mx;
	1343	}
	1344	if( k>0 )
	1345	{
	1346	for(j=0; j<=m-1; j++)
	1347	{
	1348	for(i=0; i<=m-1; i++)
	1349	{
	1350	sy[i] = 0;
	1351	}
	1352	sy[j] = 1;
	1353	barycentricbuildfloaterhormann(ref sx, ref sy, m, d, ref b2);
	1354	for(i=0; i<=k-1; i++)
	1355	{
	1356	System.Diagnostics.Debug.Assert(dc[i]>=0 & dc[i]<=1, "BarycentricFit: internal error!");
	1357	barycentricdiff1(ref b2, xc[i], ref v0, ref v1);
	1358	if( dc[i]==0 )
	1359	{
	1360	cmatrix[i,j] = v0;
	1361	}
	1362	if( dc[i]==1 )
	1363	{
	1364	cmatrix[i,j] = v1;
	1365	}
	1366	}
	1367	}
	1368	for(i=0; i<=k-1; i++)
	1369	{
	1370	cmatrix[i,m] = yc[i];
	1371	}
	1372	}
	1373
	1374	//
	1375	// Solve constrained task
	1376	//
	1377	if( k>0 )
	1378	{
	1379
	1380	//
	1381	// solve using regularization
	1382	//
	1383	lsfit.lsfitlinearwc(y2, ref w2, ref fmatrix, cmatrix, n+m, m, k, ref info, ref tmp, ref lrep);
	1384	}
	1385	else
	1386	{
	1387
	1388	//
	1389	// no constraints, no regularization needed
	1390	//
	1391	lsfit.lsfitlinearwc(y, ref w, ref fmatrix, cmatrix, n, m, k, ref info, ref tmp, ref lrep);
	1392	}
	1393	if( info<0 )
	1394	{
	1395	return;
	1396	}
	1397
	1398	//
	1399	// Generate interpolant and scale it
	1400	//
	1401	for(i_=0; i_<=m-1;i_++)
	1402	{
	1403	sy[i_] = tmp[i_];
	1404	}
	1405	barycentricbuildfloaterhormann(ref sx, ref sy, m, d, ref b);
	1406	barycentriclintransx(ref b, 2/(xb-xa), -((xa+xb)/(xb-xa)));
	1407	barycentriclintransy(ref b, sb-sa, sa);
	1408
	1409	//
	1410	// Scale absolute errors obtained from LSFitLinearW.
	1411	// Relative error should be calculated separately
	1412	// (because of shifting/scaling of the task)
	1413	//
	1414	rep.taskrcond = lrep.taskrcond;
	1415	rep.rmserror = lrep.rmserror*(sb-sa);
	1416	rep.avgerror = lrep.avgerror*(sb-sa);
	1417	rep.maxerror = lrep.maxerror*(sb-sa);
	1418	rep.avgrelerror = 0;
	1419	relcnt = 0;
	1420	for(i=0; i<=n-1; i++)
	1421	{
	1422	if( (double)(yoriginal[i])!=(double)(0) )
	1423	{
	1424	rep.avgrelerror = rep.avgrelerror+Math.Abs(barycentriccalc(ref b, xoriginal[i])-yoriginal[i])/Math.Abs(yoriginal[i]);
	1425	relcnt = relcnt+1;
	1426	}
	1427	}
	1428	if( relcnt!=0 )
	1429	{
	1430	rep.avgrelerror = rep.avgrelerror/relcnt;
	1431	}
	1432	}
	1433	}
	1434	}

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