path: root/math/deboor/l2appr.f

subroutine l2appr ( t, n, k, q, diag, bcoef )
c  from  * a practical guide to splines *  by c. de boor
c  to be called in main program  l 2 m a i n .
calls subprograms  bsplvb, bchfac/slv
c
constructs the (weighted discrete) l2-approximation by splines of order
c  k  with knot sequence  t(1), ..., t(n+k)  to given data points
c  ( tau(i), gtau(i) ), i=1,...,ntau. the b-spline coefficients
c  b c o e f   of the approximating spline are determined from the
c  normal equations using cholesky's method.
c
c******  i n p u t  ******
c  t(1), ..., t(n+k)  the knot sequence
c  n.....the dimension of the space of splines of order k with knots t.
c  k.....the order
c
c  w a r n i n g  . . .  the restriction   k .le. kmax (= 20)	is impo-
c	 sed by the arbitrary dimension statement for  biatx  below, but
c	 is  n o w h e r e   c h e c k e d   for.
c
c******  w o r k  a r r a y s  ******
c  q....a work array of size (at least) k*n. its first	k  rows are used
c	for the  k  lower diagonals of the gramian matrix  c .
c  diag.....a work array of length  n  used in bchfac .
c
c******  i n p u t  via  c o m m o n  /data/  ******
c  ntau.....number of data points
c  (tau(i),gtau(i)), i=1,...,ntau     are the  ntau  data points to be
c	 fitted .
c  weight(i), i=1,...,ntau    are the corresponding weights .
c
c******  o u t p u t  ******
c  bcoef(1), ..., bcoef(n)  the b-spline coeffs. of the l2-appr.
c
c******  m e t h o d  ******
c  the b-spline coefficients of the l2-appr. are determined as the sol-
c  ution of the normal equations
c     sum ( (b(i),b(j))*bcoef(j) : j=1,...,n)  = (b(i),g),
c						i = 1, ..., n .
c  here,  b(i)	denotes the i-th b-spline,  g  denotes the function to
c  be approximated, and the  i n n e r	 p r o d u c t	of two funct-
c  ions  f  and  g  is given by
c      (f,g)  :=  sum ( f(tau(i))*g(tau(i))*weight(i) : i=1,...,ntau) .
c  the arrays  t a u  and  w e i g h t	are given in common block
c   d a t a , as is the array  g t a u	containing the sequence
c  g(tau(i)), i=1,...,ntau.
c  the relevant function values of the b-splines  b(i), i=1,...,n, are
c  supplied by the subprogram  b s p l v b .
c     the coeff.matrix	c , with
c	    c(i,j)  :=	(b(i), b(j)), i,j=1,...,n,
c  of the normal equations is symmetric and (2*k-1)-banded, therefore
c  can be specified by giving its k bands at or below the diagonal. for
c  i=1,...,n,  we store
c   (b(i),b(j))  =  c(i,j)  in	q(i-j+1,j), j=i,...,min0(i+k-1,n)
c  and the right side
c   (b(i), g )	in  bcoef(i) .
c  since b-spline values are most efficiently generated by finding sim-
c  ultaneously the value of  e v e r y	nonzero b-spline at one point,
c  the entries of  c  (i.e., of  q ), are generated by computing, for
c  each ll, all the terms involving  tau(ll)  simultaneously and adding
c  them to all relevant entries.
c     parameter kmax=20,ntmax=200
      integer k,n,   i,j,jj,left,leftmk,ll,mm,ntau
c     real bcoef(n),diag(n),q(k,n),t(1),  biatx(kmax),dw,gtau,tau,weight
      real bcoef(n),diag(n),q(k,n),t(1),  biatx(  20),dw,gtau,tau,weight
c     dimension t(n+k)
current fortran standard makes it impossible to specify the exact dimen-
c  sion of  t  without the introduction of additional otherwise super-
c  fluous arguments.
c     common / data / ntau, tau(ntmax),gtau(ntmax),weight(ntmax)
      common / data / ntau, tau(  200),gtau(  200),weight(  200)
      do 7 j=1,n
	 bcoef(j) = 0.
	 do 7 i=1,k
    7	    q(i,j) = 0.
      left = k
      leftmk = 0
      do 20 ll=1,ntau
c		    locate  l e f t  s.t. tau(ll) in (t(left),t(left+1))
   10	    if (left .eq. n)		go to 15
	    if (tau(ll) .lt. t(left+1)) go to 15
	    left = left+1
	    leftmk = leftmk + 1
					go to 10
   15	 call bsplvb ( t, k, 1, tau(ll), left, biatx )
c	 biatx(mm) contains the value of b(left-k+mm) at tau(ll).
c	 hence, with  dw := biatx(mm)*weight(ll), the number dw*gtau(ll)
c	 is a summand in the inner product
c	    (b(left-k+mm), g)  which goes into	bcoef(left-k+mm)
c	 and the number biatx(jj)*dw is a summand in the inner product
c	    (b(left-k+jj), b(left-k+mm)), into	q(jj-mm+1,left-k+mm)
c	 since	(left-k+jj) - (left-k+mm) + 1  =  jj - mm + 1 .
	 do 20 mm=1,k
	    dw = biatx(mm)*weight(ll)
	    j = leftmk + mm
	    bcoef(j) = dw*gtau(ll) + bcoef(j)
	    i = 1
	    do 20 jj=mm,k
	       q(i,j) = biatx(jj)*dw + q(i,j)
   20	       i = i + 1
c
c	      construct cholesky factorization for  c  in  q , then use
c	      it to solve the normal equations
c		     c*x  =  bcoef
c	      for  x , and store  x  in  bcoef .
      call bchfac ( q, k, n, diag )
      call bchslv ( q, k, n, bcoef )
					return
      end