c----------------------------------------------------------------------- c\BeginDoc c c\Name: dsesrt c c\Description: c Sort the array X in the order specified by WHICH and optionally c apply the permutation to the columns of the matrix A. c c\Usage: c call dsesrt c ( WHICH, APPLY, N, X, NA, A, LDA) c c\Arguments c WHICH Character*2. (Input) c 'LM' -> X is sorted into increasing order of magnitude. c 'SM' -> X is sorted into decreasing order of magnitude. c 'LA' -> X is sorted into increasing order of algebraic. c 'SA' -> X is sorted into decreasing order of algebraic. c c APPLY Logical. (Input) c APPLY = .TRUE. -> apply the sorted order to A. c APPLY = .FALSE. -> do not apply the sorted order to A. c c N Integer. (INPUT) c Dimension of the array X. c c X Double precision array of length N. (INPUT/OUTPUT) c The array to be sorted. c c NA Integer. (INPUT) c Number of rows of the matrix A. c c A Double precision array of length NA by N. (INPUT/OUTPUT) c c LDA Integer. (INPUT) c Leading dimension of A. c c\EndDoc c c----------------------------------------------------------------------- c c\BeginLib c c\Routines c dswap Level 1 BLAS that swaps the contents of two vectors. c c\Authors c Danny Sorensen Phuong Vu c Richard Lehoucq CRPC / Rice University c Dept. of Computational & Houston, Texas c Applied Mathematics c Rice University c Houston, Texas c c\Revision history: c 12/15/93: Version ' 2.1'. c Adapted from the sort routine in LANSO and c the ARPACK code dsortr c c\SCCS Information: @(#) c FILE: sesrt.F SID: 2.3 DATE OF SID: 4/19/96 RELEASE: 2 c c\EndLib c c----------------------------------------------------------------------- c subroutine dsesrt (which, apply, n, x, na, a, lda) c c %------------------% c | Scalar Arguments | c %------------------% c character*2 which logical apply integer lda, n, na c c %-----------------% c | Array Arguments | c %-----------------% c Double precision & x(0:n-1), a(lda, 0:n-1) c c %---------------% c | Local Scalars | c %---------------% c integer i, igap, j Double precision & temp c c %----------------------% c | External Subroutines | c %----------------------% c external dswap c c %-----------------------% c | Executable Statements | c %-----------------------% c igap = n / 2 c if (which .eq. 'SA') then c c X is sorted into decreasing order of algebraic. c 10 continue if (igap .eq. 0) go to 9000 do 30 i = igap, n-1 j = i-igap 20 continue c if (j.lt.0) go to 30 c if (x(j).lt.x(j+igap)) then temp = x(j) x(j) = x(j+igap) x(j+igap) = temp if (apply) call dswap( na, a(1, j), 1, a(1,j+igap), 1) else go to 30 endif j = j-igap go to 20 30 continue igap = igap / 2 go to 10 c else if (which .eq. 'SM') then c c X is sorted into decreasing order of magnitude. c 40 continue if (igap .eq. 0) go to 9000 do 60 i = igap, n-1 j = i-igap 50 continue c if (j.lt.0) go to 60 c if (abs(x(j)).lt.abs(x(j+igap))) then temp = x(j) x(j) = x(j+igap) x(j+igap) = temp if (apply) call dswap( na, a(1, j), 1, a(1,j+igap), 1) else go to 60 endif j = j-igap go to 50 60 continue igap = igap / 2 go to 40 c else if (which .eq. 'LA') then c c X is sorted into increasing order of algebraic. c 70 continue if (igap .eq. 0) go to 9000 do 90 i = igap, n-1 j = i-igap 80 continue c if (j.lt.0) go to 90 c if (x(j).gt.x(j+igap)) then temp = x(j) x(j) = x(j+igap) x(j+igap) = temp if (apply) call dswap( na, a(1, j), 1, a(1,j+igap), 1) else go to 90 endif j = j-igap go to 80 90 continue igap = igap / 2 go to 70 c else if (which .eq. 'LM') then c c X is sorted into increasing order of magnitude. c 100 continue if (igap .eq. 0) go to 9000 do 120 i = igap, n-1 j = i-igap 110 continue c if (j.lt.0) go to 120 c if (abs(x(j)).gt.abs(x(j+igap))) then temp = x(j) x(j) = x(j+igap) x(j+igap) = temp if (apply) call dswap( na, a(1, j), 1, a(1,j+igap), 1) else go to 120 endif j = j-igap go to 110 120 continue igap = igap / 2 go to 100 end if c 9000 continue return c c %---------------% c | End of dsesrt | c %---------------% c end