Esempio n. 1
0
        /*************************************************************************
        Weighted  fitting  by  Chebyshev  polynomial  in  barycentric  form,  with
        constraints on function values or first derivatives.

        Small regularizing term is used when solving constrained tasks (to improve
        stability).

        Task is linear, so linear least squares solver is used. Complexity of this
        computational scheme is O(N*M^2), mostly dominated by least squares solver

        SEE ALSO:
            PolynomialFit()

        INPUT PARAMETERS:
            X   -   points, array[0..N-1].
            Y   -   function values, array[0..N-1].
            W   -   weights, array[0..N-1]
                    Each summand in square  sum  of  approximation deviations from
                    given  values  is  multiplied  by  the square of corresponding
                    weight. Fill it by 1's if you don't  want  to  solve  weighted
                    task.
            N   -   number of points, N>0.
            XC  -   points where polynomial values/derivatives are constrained,
                    array[0..K-1].
            YC  -   values of constraints, array[0..K-1]
            DC  -   array[0..K-1], types of constraints:
                    * DC[i]=0   means that P(XC[i])=YC[i]
                    * DC[i]=1   means that P'(XC[i])=YC[i]
                    SEE BELOW FOR IMPORTANT INFORMATION ON CONSTRAINTS
            K   -   number of constraints, 0<=K<M.
                    K=0 means no constraints (XC/YC/DC are not used in such cases)
            M   -   number of basis functions (= polynomial_degree + 1), M>=1

        OUTPUT PARAMETERS:
            Info-   same format as in LSFitLinearW() subroutine:
                    * Info>0    task is solved
                    * Info<=0   an error occured:
                                -4 means inconvergence of internal SVD
                                -3 means inconsistent constraints
                                -1 means another errors in parameters passed
                                   (N<=0, for example)
            P   -   interpolant in barycentric form.
            Rep -   report, same format as in LSFitLinearW() subroutine.
                    Following fields are set:
                    * RMSError      rms error on the (X,Y).
                    * AvgError      average error on the (X,Y).
                    * AvgRelError   average relative error on the non-zero Y
                    * MaxError      maximum error
                                    NON-WEIGHTED ERRORS ARE CALCULATED

        IMPORTANT:
            this subroitine doesn't calculate task's condition number for K<>0.

        SETTING CONSTRAINTS - DANGERS AND OPPORTUNITIES:

        Setting constraints can lead  to undesired  results,  like ill-conditioned
        behavior, or inconsistency being detected. From the other side,  it allows
        us to improve quality of the fit. Here we summarize  our  experience  with
        constrained regression splines:
        * even simple constraints can be inconsistent, see  Wikipedia  article  on
          this subject: http://en.wikipedia.org/wiki/Birkhoff_interpolation
        * the  greater  is  M (given  fixed  constraints),  the  more chances that
          constraints will be consistent
        * in the general case, consistency of constraints is NOT GUARANTEED.
        * in the one special cases, however, we can  guarantee  consistency.  This
          case  is:  M>1  and constraints on the function values (NOT DERIVATIVES)

        Our final recommendation is to use constraints  WHEN  AND  ONLY  when  you
        can't solve your task without them. Anything beyond  special  cases  given
        above is not guaranteed and may result in inconsistency.

          -- ALGLIB PROJECT --
             Copyright 10.12.2009 by Bochkanov Sergey
        *************************************************************************/
        public static void polynomialfitwc(double[] x,
            double[] y,
            ref double[] w,
            int n,
            double[] xc,
            double[] yc,
            ref int[] dc,
            int k,
            int m,
            ref int info,
            ref ratint.barycentricinterpolant p,
            ref polynomialfitreport rep)
        {
            double xa = 0;
            double xb = 0;
            double sa = 0;
            double sb = 0;
            double[] xoriginal = new double[0];
            double[] yoriginal = new double[0];
            double[] y2 = new double[0];
            double[] w2 = new double[0];
            double[] tmp = new double[0];
            double[] tmp2 = new double[0];
            double[] tmpdiff = new double[0];
            double[] bx = new double[0];
            double[] by = new double[0];
            double[] bw = new double[0];
            double[,] fmatrix = new double[0,0];
            double[,] cmatrix = new double[0,0];
            int i = 0;
            int j = 0;
            double mx = 0;
            double decay = 0;
            double u = 0;
            double v = 0;
            double s = 0;
            int relcnt = 0;
            lsfit.lsfitreport lrep = new lsfit.lsfitreport();
            int i_ = 0;

            x = (double[])x.Clone();
            y = (double[])y.Clone();
            xc = (double[])xc.Clone();
            yc = (double[])yc.Clone();

            if( m<1 | n<1 | k<0 | k>=m )
            {
                info = -1;
                return;
            }
            for(i=0; i<=k-1; i++)
            {
                info = 0;
                if( dc[i]<0 )
                {
                    info = -1;
                }
                if( dc[i]>1 )
                {
                    info = -1;
                }
                if( info<0 )
                {
                    return;
                }
            }
            
            //
            // weight decay for correct handling of task which becomes
            // degenerate after constraints are applied
            //
            decay = 10000*AP.Math.MachineEpsilon;
            
            //
            // Scale X, Y, XC, YC
            //
            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);
            
            //
            // allocate space, initialize/fill:
            // * FMatrix-   values of basis functions at X[]
            // * CMatrix-   values (derivatives) of basis functions at XC[]
            // * fill constraints matrix
            // * fill first N rows of design matrix with values
            // * fill next M rows of design matrix with regularizing term
            // * append M zeros to Y
            // * append M elements, mean(abs(W)) each, to W
            //
            y2 = new double[n+m];
            w2 = new double[n+m];
            tmp = new double[m];
            tmpdiff = new double[m];
            fmatrix = new double[n+m, m];
            if( k>0 )
            {
                cmatrix = new double[k, m+1];
            }
            
            //
            // Fill design matrix, Y2, W2:
            // * first N rows with basis functions for original points
            // * next M rows with decay terms
            //
            for(i=0; i<=n-1; i++)
            {
                
                //
                // prepare Ith row
                // use Tmp for calculations to avoid multidimensional arrays overhead
                //
                for(j=0; j<=m-1; j++)
                {
                    if( j==0 )
                    {
                        tmp[j] = 1;
                    }
                    else
                    {
                        if( j==1 )
                        {
                            tmp[j] = x[i];
                        }
                        else
                        {
                            tmp[j] = 2*x[i]*tmp[j-1]-tmp[j-2];
                        }
                    }
                }
                for(i_=0; i_<=m-1;i_++)
                {
                    fmatrix[i,i_] = tmp[i_];
                }
            }
            for(i=0; i<=m-1; i++)
            {
                for(j=0; j<=m-1; j++)
                {
                    if( i==j )
                    {
                        fmatrix[n+i,j] = decay;
                    }
                    else
                    {
                        fmatrix[n+i,j] = 0;
                    }
                }
            }
            for(i_=0; i_<=n-1;i_++)
            {
                y2[i_] = y[i_];
            }
            for(i_=0; i_<=n-1;i_++)
            {
                w2[i_] = w[i_];
            }
            mx = 0;
            for(i=0; i<=n-1; i++)
            {
                mx = mx+Math.Abs(w[i]);
            }
            mx = mx/n;
            for(i=0; i<=m-1; i++)
            {
                y2[n+i] = 0;
                w2[n+i] = mx;
            }
            
            //
            // fill constraints matrix
            //
            for(i=0; i<=k-1; i++)
            {
                
                //
                // prepare Ith row
                // use Tmp for basis function values,
                // TmpDiff for basos function derivatives
                //
                for(j=0; j<=m-1; j++)
                {
                    if( j==0 )
                    {
                        tmp[j] = 1;
                        tmpdiff[j] = 0;
                    }
                    else
                    {
                        if( j==1 )
                        {
                            tmp[j] = xc[i];
                            tmpdiff[j] = 1;
                        }
                        else
                        {
                            tmp[j] = 2*xc[i]*tmp[j-1]-tmp[j-2];
                            tmpdiff[j] = 2*(tmp[j-1]+xc[i]*tmpdiff[j-1])-tmpdiff[j-2];
                        }
                    }
                }
                if( dc[i]==0 )
                {
                    for(i_=0; i_<=m-1;i_++)
                    {
                        cmatrix[i,i_] = tmp[i_];
                    }
                }
                if( dc[i]==1 )
                {
                    for(i_=0; i_<=m-1;i_++)
                    {
                        cmatrix[i,i_] = tmpdiff[i_];
                    }
                }
                cmatrix[i,m] = yc[i];
            }
            
            //
            // Solve constrained task
            //
            if( k>0 )
            {
                
                //
                // solve using regularization
                //
                lsfit.lsfitlinearwc(y2, ref w2, ref fmatrix, cmatrix, n+m, m, k, ref info, ref tmp, ref lrep);
            }
            else
            {
                
                //
                // no constraints, no regularization needed
                //
                lsfit.lsfitlinearwc(y, ref w, ref fmatrix, cmatrix, n, m, 0, ref info, ref tmp, ref lrep);
            }
            if( info<0 )
            {
                return;
            }
            
            //
            // Generate barycentric model and scale it
            // * BX, BY store barycentric model nodes
            // * FMatrix is reused (remember - it is at least MxM, what we need)
            //
            // Model intialization is done in O(M^2). In principle, it can be
            // done in O(M*log(M)), but before it we solved task with O(N*M^2)
            // complexity, so it is only a small amount of total time spent.
            //
            bx = new double[m];
            by = new double[m];
            bw = new double[m];
            tmp2 = new double[m];
            s = 1;
            for(i=0; i<=m-1; i++)
            {
                if( m!=1 )
                {
                    u = Math.Cos(Math.PI*i/(m-1));
                }
                else
                {
                    u = 0;
                }
                v = 0;
                for(j=0; j<=m-1; j++)
                {
                    if( j==0 )
                    {
                        tmp2[j] = 1;
                    }
                    else
                    {
                        if( j==1 )
                        {
                            tmp2[j] = u;
                        }
                        else
                        {
                            tmp2[j] = 2*u*tmp2[j-1]-tmp2[j-2];
                        }
                    }
                    v = v+tmp[j]*tmp2[j];
                }
                bx[i] = u;
                by[i] = v;
                bw[i] = s;
                if( i==0 | i==m-1 )
                {
                    bw[i] = 0.5*bw[i];
                }
                s = -s;
            }
            ratint.barycentricbuildxyw(ref bx, ref by, ref bw, m, ref p);
            ratint.barycentriclintransx(ref p, 2/(xb-xa), -((xa+xb)/(xb-xa)));
            ratint.barycentriclintransy(ref p, sb-sa, sa);
            
            //
            // Scale absolute errors obtained from LSFitLinearW.
            // Relative error should be calculated separately
            // (because of shifting/scaling of the task)
            //
            rep.taskrcond = lrep.taskrcond;
            rep.rmserror = lrep.rmserror*(sb-sa);
            rep.avgerror = lrep.avgerror*(sb-sa);
            rep.maxerror = lrep.maxerror*(sb-sa);
            rep.avgrelerror = 0;
            relcnt = 0;
            for(i=0; i<=n-1; i++)
            {
                if( (double)(yoriginal[i])!=(double)(0) )
                {
                    rep.avgrelerror = rep.avgrelerror+Math.Abs(ratint.barycentriccalc(ref p, xoriginal[i])-yoriginal[i])/Math.Abs(yoriginal[i]);
                    relcnt = relcnt+1;
                }
            }
            if( relcnt!=0 )
            {
                rep.avgrelerror = rep.avgrelerror/relcnt;
            }
        }
        private static void brcunset(ref ratint.barycentricinterpolant b)
        {
            double[] x = new double[0];
            double[] y = new double[0];
            double[] w = new double[0];

            x = new double[1];
            y = new double[1];
            w = new double[1];
            x[0] = 0;
            y[0] = 0;
            w[0] = 1;
            ratint.barycentricbuildxyw(ref x, ref y, ref w, 1, ref b);
        }
Esempio n. 3
0
        /*************************************************************************
        Least squares fitting by polynomial.

        This subroutine is "lightweight" alternative for more complex and feature-
        rich PolynomialFitWC().  See  PolynomialFitWC() for more information about
        subroutine parameters (we don't duplicate it here because of length)

          -- ALGLIB PROJECT --
             Copyright 12.10.2009 by Bochkanov Sergey
        *************************************************************************/
        public static void polynomialfit(ref double[] x,
            ref double[] y,
            int n,
            int m,
            ref int info,
            ref ratint.barycentricinterpolant p,
            ref polynomialfitreport rep)
        {
            int i = 0;
            double[] w = new double[0];
            double[] xc = new double[0];
            double[] yc = new double[0];
            int[] dc = new int[0];

            if( n>0 )
            {
                w = new double[n];
                for(i=0; i<=n-1; i++)
                {
                    w[i] = 1;
                }
            }
            polynomialfitwc(x, y, ref w, n, xc, yc, ref dc, 0, m, ref info, ref p, ref rep);
        }
Esempio n. 4
0
        /*************************************************************************
        Lagrange intepolant: generation of the model on the general grid.
        This function has O(N^2) complexity.

        INPUT PARAMETERS:
            X   -   abscissas, array[0..N-1]
            Y   -   function values, array[0..N-1]
            N   -   number of points, N>=1

        OIYTPUT PARAMETERS
            P   -   barycentric model which represents Lagrange interpolant
                    (see ratint unit info and BarycentricCalc() description for
                    more information).

          -- ALGLIB --
             Copyright 02.12.2009 by Bochkanov Sergey
        *************************************************************************/
        public static void polynomialbuild(ref double[] x,
            ref double[] y,
            int n,
            ref ratint.barycentricinterpolant p)
        {
            int j = 0;
            int k = 0;
            double[] w = new double[0];
            double b = 0;
            double a = 0;
            double v = 0;
            double mx = 0;
            int i_ = 0;

            System.Diagnostics.Debug.Assert(n>0, "PolIntBuild: N<=0!");
            
            //
            // calculate W[j]
            // multi-pass algorithm is used to avoid overflow
            //
            w = new double[n];
            a = x[0];
            b = x[0];
            for(j=0; j<=n-1; j++)
            {
                w[j] = 1;
                a = Math.Min(a, x[j]);
                b = Math.Max(b, x[j]);
            }
            for(k=0; k<=n-1; k++)
            {
                
                //
                // W[K] is used instead of 0.0 because
                // cycle on J does not touch K-th element
                // and we MUST get maximum from ALL elements
                //
                mx = Math.Abs(w[k]);
                for(j=0; j<=n-1; j++)
                {
                    if( j!=k )
                    {
                        v = (b-a)/(x[j]-x[k]);
                        w[j] = w[j]*v;
                        mx = Math.Max(mx, Math.Abs(w[j]));
                    }
                }
                if( k%5==0 )
                {
                    
                    //
                    // every 5-th run we renormalize W[]
                    //
                    v = 1/mx;
                    for(i_=0; i_<=n-1;i_++)
                    {
                        w[i_] = v*w[i_];
                    }
                }
            }
            ratint.barycentricbuildxyw(ref x, ref y, ref w, n, ref p);
        }
Esempio n. 5
0
        /*************************************************************************
        Lagrange intepolant on Chebyshev grid (second kind).
        This function has O(N) complexity.

        INPUT PARAMETERS:
            A   -   left boundary of [A,B]
            B   -   right boundary of [A,B]
            Y   -   function values at the nodes, array[0..N-1],
                    Y[I] = Y(0.5*(B+A) + 0.5*(B-A)*Cos(PI*i/(n-1)))
            N   -   number of points, N>=1
                    for N=1 a constant model is constructed.

        OIYTPUT PARAMETERS
            P   -   barycentric model which represents Lagrange interpolant
                    (see ratint unit info and BarycentricCalc() description for
                    more information).

          -- ALGLIB --
             Copyright 03.12.2009 by Bochkanov Sergey
        *************************************************************************/
        public static void polynomialbuildcheb2(double a,
            double b,
            ref double[] y,
            int n,
            ref ratint.barycentricinterpolant p)
        {
            int i = 0;
            double[] w = new double[0];
            double[] x = new double[0];
            double v = 0;

            System.Diagnostics.Debug.Assert(n>0, "PolIntBuildCheb2: N<=0!");
            
            //
            // Special case: N=1
            //
            if( n==1 )
            {
                x = new double[1];
                w = new double[1];
                x[0] = 0.5*(b+a);
                w[0] = 1;
                ratint.barycentricbuildxyw(ref x, ref y, ref w, 1, ref p);
                return;
            }
            
            //
            // general case
            //
            x = new double[n];
            w = new double[n];
            v = 1;
            for(i=0; i<=n-1; i++)
            {
                if( i==0 | i==n-1 )
                {
                    w[i] = v*0.5;
                }
                else
                {
                    w[i] = v;
                }
                x[i] = 0.5*(b+a)+0.5*(b-a)*Math.Cos(Math.PI*i/(n-1));
                v = -v;
            }
            ratint.barycentricbuildxyw(ref x, ref y, ref w, n, ref p);
        }
Esempio n. 6
0
        /*************************************************************************
        Lagrange intepolant on Chebyshev grid (first kind).
        This function has O(N) complexity.

        INPUT PARAMETERS:
            A   -   left boundary of [A,B]
            B   -   right boundary of [A,B]
            Y   -   function values at the nodes, array[0..N-1],
                    Y[I] = Y(0.5*(B+A) + 0.5*(B-A)*Cos(PI*(2*i+1)/(2*n)))
            N   -   number of points, N>=1
                    for N=1 a constant model is constructed.

        OIYTPUT PARAMETERS
            P   -   barycentric model which represents Lagrange interpolant
                    (see ratint unit info and BarycentricCalc() description for
                    more information).

          -- ALGLIB --
             Copyright 03.12.2009 by Bochkanov Sergey
        *************************************************************************/
        public static void polynomialbuildcheb1(double a,
            double b,
            ref double[] y,
            int n,
            ref ratint.barycentricinterpolant p)
        {
            int i = 0;
            double[] w = new double[0];
            double[] x = new double[0];
            double v = 0;
            double t = 0;

            System.Diagnostics.Debug.Assert(n>0, "PolIntBuildCheb1: N<=0!");
            
            //
            // Special case: N=1
            //
            if( n==1 )
            {
                x = new double[1];
                w = new double[1];
                x[0] = 0.5*(b+a);
                w[0] = 1;
                ratint.barycentricbuildxyw(ref x, ref y, ref w, 1, ref p);
                return;
            }
            
            //
            // general case
            //
            x = new double[n];
            w = new double[n];
            v = 1;
            for(i=0; i<=n-1; i++)
            {
                t = Math.Tan(0.5*Math.PI*(2*i+1)/(2*n));
                w[i] = 2*v*t/(1+AP.Math.Sqr(t));
                x[i] = 0.5*(b+a)+0.5*(b-a)*(1-AP.Math.Sqr(t))/(1+AP.Math.Sqr(t));
                v = -v;
            }
            ratint.barycentricbuildxyw(ref x, ref y, ref w, n, ref p);
        }
Esempio n. 7
0
        /*************************************************************************
        Lagrange intepolant: generation of the model on equidistant grid.
        This function has O(N) complexity.

        INPUT PARAMETERS:
            A   -   left boundary of [A,B]
            B   -   right boundary of [A,B]
            Y   -   function values at the nodes, array[0..N-1]
            N   -   number of points, N>=1
                    for N=1 a constant model is constructed.

        OIYTPUT PARAMETERS
            P   -   barycentric model which represents Lagrange interpolant
                    (see ratint unit info and BarycentricCalc() description for
                    more information).

          -- ALGLIB --
             Copyright 03.12.2009 by Bochkanov Sergey
        *************************************************************************/
        public static void polynomialbuildeqdist(double a,
            double b,
            ref double[] y,
            int n,
            ref ratint.barycentricinterpolant p)
        {
            int i = 0;
            double[] w = new double[0];
            double[] x = new double[0];
            double v = 0;

            System.Diagnostics.Debug.Assert(n>0, "PolIntBuildEqDist: N<=0!");
            
            //
            // Special case: N=1
            //
            if( n==1 )
            {
                x = new double[1];
                w = new double[1];
                x[0] = 0.5*(b+a);
                w[0] = 1;
                ratint.barycentricbuildxyw(ref x, ref y, ref w, 1, ref p);
                return;
            }
            
            //
            // general case
            //
            x = new double[n];
            w = new double[n];
            v = 1;
            for(i=0; i<=n-1; i++)
            {
                w[i] = v;
                x[i] = a+(b-a)*i/(n-1);
                v = -(v*(n-1-i));
                v = v/(i+1);
            }
            ratint.barycentricbuildxyw(ref x, ref y, ref w, n, ref p);
        }