subroutine dpbfa(abd,lda,n,m,info) integer lda,n,m,info double precision abd(lda,n) c c dpbfa factors a double precision symmetric positive definite c matrix stored in band form. c c dpbfa is usually called by dpbco, but it can be called c directly with a saving in time if rcond is not needed. c c on entry c c abd double precision(lda, n) c the matrix to be factored. the columns of the upper c triangle are stored in the columns of abd and the c diagonals of the upper triangle are stored in the c rows of abd . see the comments below for details. c c lda integer c the leading dimension of the array abd . c lda must be .ge. m + 1 . c c n integer c the order of the matrix a . c c m integer c the number of diagonals above the main diagonal. c 0 .le. m .lt. n . c c on return c c abd an upper triangular matrix r , stored in band c form, so that a = trans(r)*r . c c info integer c = 0 for normal return. c = k if the leading minor of order k is not c positive definite. c c band storage c c if a is a symmetric positive definite band matrix, c the following program segment will set up the input. c c m = (band width above diagonal) c do 20 j = 1, n c i1 = max(1, j-m) c do 10 i = i1, j c k = i-j+m+1 c abd(k,j) = a(i,j) c 10 continue c 20 continue c c linpack. this version dated 08/14/78 . c cleve moler, university of new mexico, argonne national lab. c c subroutines and functions c c blas ddot c fortran max,sqrt c c internal variables c double precision ddot,t double precision s integer ik,j,jk,k,mu c begin block with ...exits to 40 c c do 30 j = 1, n info = j s = 0.0d0 ik = m + 1 jk = max(j-m,1) mu = max(m+2-j,1) if (m .lt. mu) go to 20 do 10 k = mu, m t = abd(k,j) - ddot(k-mu,abd(ik,jk),1,abd(mu,j),1) t = t/abd(m+1,jk) abd(k,j) = t s = s + t*t ik = ik - 1 jk = jk + 1 10 continue 20 continue s = abd(m+1,j) - s c ......exit if (s .le. 0.0d0) go to 40 abd(m+1,j) = sqrt(s) 30 continue info = 0 40 continue return end