subroutine dchdc(a,lda,p,work,jpvt,job,info) integer lda,p,jpvt(1),job,info double precision a(lda,1),work(1) c c dchdc computes the cholesky decomposition of a positive definite c matrix. a pivoting option allows the user to estimate the c condition of a positive definite matrix or determine the rank c of a positive semidefinite matrix. c c on entry c c a double precision(lda,p). c a contains the matrix whose decomposition is to c be computed. onlt the upper half of a need be stored. c the lower part of the array a is not referenced. c c lda integer. c lda is the leading dimension of the array a. c c p integer. c p is the order of the matrix. c c work double precision. c work is a work array. c c jpvt integer(p). c jpvt contains integers that control the selection c of the pivot elements, if pivoting has been requested. c each diagonal element a(k,k) c is placed in one of three classes according to the c value of jpvt(k). c c if jpvt(k) .gt. 0, then x(k) is an initial c element. c c if jpvt(k) .eq. 0, then x(k) is a free element. c c if jpvt(k) .lt. 0, then x(k) is a final element. c c before the decomposition is computed, initial elements c are moved by symmetric row and column interchanges to c the beginning of the array a and final c elements to the end. both initial and final elements c are frozen in place during the computation and only c free elements are moved. at the k-th stage of the c reduction, if a(k,k) is occupied by a free element c it is interchanged with the largest free element c a(l,l) with l .ge. k. jpvt is not referenced if c job .eq. 0. c c job integer. c job is an integer that initiates column pivoting. c if job .eq. 0, no pivoting is done. c if job .ne. 0, pivoting is done. c c on return c c a a contains in its upper half the cholesky factor c of the matrix a as it has been permuted by pivoting. c c jpvt jpvt(j) contains the index of the diagonal element c of a that was moved into the j-th position, c provided pivoting was requested. c c info contains the index of the last positive diagonal c element of the cholesky factor. c c for positive definite matrices info = p is the normal return. c for pivoting with positive semidefinite matrices info will c in general be less than p. however, info may be greater than c the rank of a, since rounding error can cause an otherwise zero c element to be positive. indefinite systems will always cause c info to be less than p. c c linpack. this version dated 08/14/78 . c j.j. dongarra and g.w. stewart, argonne national laboratory and c university of maryland. c c c blas daxpy,dswap c fortran dsqrt c c internal variables c integer pu,pl,plp1,j,jp,jt,k,kb,km1,kp1,l,maxl double precision temp double precision maxdia logical swapk,negk c pl = 1 pu = 0 info = p if (job .eq. 0) go to 160 c c pivoting has been requested. rearrange the c the elements according to jpvt. c do 70 k = 1, p swapk = jpvt(k) .gt. 0 negk = jpvt(k) .lt. 0 jpvt(k) = k if (negk) jpvt(k) = -jpvt(k) if (.not.swapk) go to 60 if (k .eq. pl) go to 50 call dswap(pl-1,a(1,k),1,a(1,pl),1) temp = a(k,k) a(k,k) = a(pl,pl) a(pl,pl) = temp plp1 = pl + 1 if (p .lt. plp1) go to 40 do 30 j = plp1, p if (j .ge. k) go to 10 temp = a(pl,j) a(pl,j) = a(j,k) a(j,k) = temp go to 20 10 continue if (j .eq. k) go to 20 temp = a(k,j) a(k,j) = a(pl,j) a(pl,j) = temp 20 continue 30 continue 40 continue jpvt(k) = jpvt(pl) jpvt(pl) = k 50 continue pl = pl + 1 60 continue 70 continue pu = p if (p .lt. pl) go to 150 do 140 kb = pl, p k = p - kb + pl if (jpvt(k) .ge. 0) go to 130 jpvt(k) = -jpvt(k) if (pu .eq. k) go to 120 call dswap(k-1,a(1,k),1,a(1,pu),1) temp = a(k,k) a(k,k) = a(pu,pu) a(pu,pu) = temp kp1 = k + 1 if (p .lt. kp1) go to 110 do 100 j = kp1, p if (j .ge. pu) go to 80 temp = a(k,j) a(k,j) = a(j,pu) a(j,pu) = temp go to 90 80 continue if (j .eq. pu) go to 90 temp = a(k,j) a(k,j) = a(pu,j) a(pu,j) = temp 90 continue 100 continue 110 continue jt = jpvt(k) jpvt(k) = jpvt(pu) jpvt(pu) = jt 120 continue pu = pu - 1 130 continue 140 continue 150 continue 160 continue do 270 k = 1, p c c reduction loop. c maxdia = a(k,k) kp1 = k + 1 maxl = k c c determine the pivot element. c if (k .lt. pl .or. k .ge. pu) go to 190 do 180 l = kp1, pu if (a(l,l) .le. maxdia) go to 170 maxdia = a(l,l) maxl = l 170 continue 180 continue 190 continue c c quit if the pivot element is not positive. c if (maxdia .gt. 0.0d0) go to 200 info = k - 1 c ......exit go to 280 200 continue if (k .eq. maxl) go to 210 c c start the pivoting and update jpvt. c km1 = k - 1 call dswap(km1,a(1,k),1,a(1,maxl),1) a(maxl,maxl) = a(k,k) a(k,k) = maxdia jp = jpvt(maxl) jpvt(maxl) = jpvt(k) jpvt(k) = jp 210 continue c c reduction step. pivoting is contained across the rows. c work(k) = dsqrt(a(k,k)) a(k,k) = work(k) if (p .lt. kp1) go to 260 do 250 j = kp1, p if (k .eq. maxl) go to 240 if (j .ge. maxl) go to 220 temp = a(k,j) a(k,j) = a(j,maxl) a(j,maxl) = temp go to 230 220 continue if (j .eq. maxl) go to 230 temp = a(k,j) a(k,j) = a(maxl,j) a(maxl,j) = temp 230 continue 240 continue a(k,j) = a(k,j)/work(k) work(j) = a(k,j) temp = -a(k,j) call daxpy(j-k,temp,work(kp1),1,a(kp1,j),1) 250 continue 260 continue 270 continue 280 continue return end