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340 lines
13 KiB
Fortran
340 lines
13 KiB
Fortran
*DECK SSICS
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SUBROUTINE SSICS (N, NELT, IA, JA, A, ISYM, NEL, IEL, JEL, EL, D,
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+ R, IWARN)
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C***BEGIN PROLOGUE SSICS
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C***PURPOSE Incompl. Cholesky Decomposition Preconditioner SLAP Set Up.
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C Routine to generate the Incomplete Cholesky decomposition,
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C L*D*L-trans, of a symmetric positive definite matrix, A,
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C which is stored in SLAP Column format. The unit lower
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C triangular matrix L is stored by rows, and the inverse of
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C the diagonal matrix D is stored.
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C***LIBRARY SLATEC (SLAP)
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C***CATEGORY D2E
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C***TYPE SINGLE PRECISION (SSICS-S, DSICS-D)
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C***KEYWORDS INCOMPLETE CHOLESKY FACTORIZATION,
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C ITERATIVE PRECONDITION, LINEAR SYSTEM, SLAP SPARSE
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C***AUTHOR Greenbaum, Anne, (Courant Institute)
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C Seager, Mark K., (LLNL)
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C Lawrence Livermore National Laboratory
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C PO BOX 808, L-60
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C Livermore, CA 94550 (510) 423-3141
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C seager@llnl.gov
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C***DESCRIPTION
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C
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C *Usage:
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C INTEGER N, NELT, IA(NELT), JA(NELT), ISYM
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C INTEGER NEL, IEL(NEL), JEL(NEL), IWARN
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C REAL A(NELT), EL(NEL), D(N), R(N)
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C
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C CALL SSICS( N, NELT, IA, JA, A, ISYM, NEL, IEL, JEL, EL, D, R,
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C $ IWARN )
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C
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C *Arguments:
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C N :IN Integer.
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C Order of the Matrix.
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C NELT :IN Integer.
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C Number of elements in arrays IA, JA, and A.
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C IA :INOUT Integer IA(NELT).
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C JA :INOUT Integer JA(NELT).
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C A :INOUT Real A(NELT).
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C These arrays should hold the matrix A in the SLAP Column
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C format. See "Description", below.
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C ISYM :IN Integer.
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C Flag to indicate symmetric storage format.
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C If ISYM=0, all non-zero entries of the matrix are stored.
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C If ISYM=1, the matrix is symmetric, and only the lower
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C triangle of the matrix is stored.
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C NEL :OUT Integer.
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C Number of non-zeros in the lower triangle of A. Also
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C corresponds to the length of the IEL, JEL, EL arrays.
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C IEL :OUT Integer IEL(NEL).
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C JEL :OUT Integer JEL(NEL).
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C EL :OUT Real EL(NEL).
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C IEL, JEL, EL contain the unit lower triangular factor of the
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C incomplete decomposition of the A matrix stored in SLAP
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C Row format. The Diagonal of ones *IS* stored. See
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C "Description", below for more details about the SLAP Row fmt.
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C D :OUT Real D(N)
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C Upon return this array holds D(I) = 1./DIAG(A).
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C R :WORK Real R(N).
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C Temporary real workspace needed for the factorization.
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C IWARN :OUT Integer.
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C This is a warning variable and is zero if the IC factoriza-
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C tion goes well. It is set to the row index corresponding to
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C the last zero pivot found. See "Description", below.
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C
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C *Description
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C =================== S L A P Column format ==================
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C This routine requires that the matrix A be stored in the
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C SLAP Column format. In this format the non-zeros are stored
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C counting down columns (except for the diagonal entry, which
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C must appear first in each "column") and are stored in the
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C real array A. In other words, for each column in the matrix
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C put the diagonal entry in A. Then put in the other non-zero
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C elements going down the column (except the diagonal) in
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C order. The IA array holds the row index for each non-zero.
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C The JA array holds the offsets into the IA, A arrays for the
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C beginning of each column. That is, IA(JA(ICOL)),
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C A(JA(ICOL)) points to the beginning of the ICOL-th column in
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C IA and A. IA(JA(ICOL+1)-1), A(JA(ICOL+1)-1) points to the
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C end of the ICOL-th column. Note that we always have
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C JA(N+1) = NELT+1, where N is the number of columns in the
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C matrix and NELT is the number of non-zeros in the matrix.
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C
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C Here is an example of the SLAP Column storage format for a
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C 5x5 Matrix (in the A and IA arrays '|' denotes the end of a
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C column):
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C
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C 5x5 Matrix SLAP Column format for 5x5 matrix on left.
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C 1 2 3 4 5 6 7 8 9 10 11
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C |11 12 0 0 15| A: 11 21 51 | 22 12 | 33 53 | 44 | 55 15 35
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C |21 22 0 0 0| IA: 1 2 5 | 2 1 | 3 5 | 4 | 5 1 3
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C | 0 0 33 0 35| JA: 1 4 6 8 9 12
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C | 0 0 0 44 0|
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C |51 0 53 0 55|
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C
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C ==================== S L A P Row format ====================
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C
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C This routine requires that the matrix A be stored in the
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C SLAP Row format. In this format the non-zeros are stored
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C counting across rows (except for the diagonal entry, which
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C must appear first in each "row") and are stored in the real
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C array A. In other words, for each row in the matrix put the
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C diagonal entry in A. Then put in the other non-zero
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C elements going across the row (except the diagonal) in
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C order. The JA array holds the column index for each
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C non-zero. The IA array holds the offsets into the JA, A
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C arrays for the beginning of each row. That is,
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C JA(IA(IROW)), A(IA(IROW)) points to the beginning of the
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C IROW-th row in JA and A. JA(IA(IROW+1)-1), A(IA(IROW+1)-1)
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C points to the end of the IROW-th row. Note that we always
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C have IA(N+1) = NELT+1, where N is the number of rows in
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C the matrix and NELT is the number of non-zeros in the
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C matrix.
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C
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C Here is an example of the SLAP Row storage format for a 5x5
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C Matrix (in the A and JA arrays '|' denotes the end of a row):
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C
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C 5x5 Matrix SLAP Row format for 5x5 matrix on left.
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C 1 2 3 4 5 6 7 8 9 10 11
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C |11 12 0 0 15| A: 11 12 15 | 22 21 | 33 35 | 44 | 55 51 53
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C |21 22 0 0 0| JA: 1 2 5 | 2 1 | 3 5 | 4 | 5 1 3
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C | 0 0 33 0 35| IA: 1 4 6 8 9 12
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C | 0 0 0 44 0|
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C |51 0 53 0 55|
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C
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C With the SLAP format some of the "inner loops" of this
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C routine should vectorize on machines with hardware support
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C for vector gather/scatter operations. Your compiler may
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C require a compiler directive to convince it that there are
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C no implicit vector dependencies. Compiler directives for
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C the Alliant FX/Fortran and CRI CFT/CFT77 compilers are
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C supplied with the standard SLAP distribution.
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C
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C The IC factorization does not always exist for SPD matrices.
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C In the event that a zero pivot is found it is set to be 1.0
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C and the factorization proceeds. The integer variable IWARN
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C is set to the last row where the Diagonal was fudged. This
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C eventuality hardly ever occurs in practice.
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C
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C***SEE ALSO SCG, SSICCG
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C***REFERENCES 1. Gene Golub and Charles Van Loan, Matrix Computations,
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C Johns Hopkins University Press, Baltimore, Maryland,
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C 1983.
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C***ROUTINES CALLED XERMSG
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C***REVISION HISTORY (YYMMDD)
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C 871119 DATE WRITTEN
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C 881213 Previous REVISION DATE
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C 890915 Made changes requested at July 1989 CML Meeting. (MKS)
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C 890922 Numerous changes to prologue to make closer to SLATEC
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C standard. (FNF)
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C 890929 Numerous changes to reduce SP/DP differences. (FNF)
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C 900805 Changed XERRWV calls to calls to XERMSG. (RWC)
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C 910411 Prologue converted to Version 4.0 format. (BAB)
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C 920511 Added complete declaration section. (WRB)
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C 920929 Corrected format of reference. (FNF)
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C 930701 Updated CATEGORY section. (FNF, WRB)
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C***END PROLOGUE SSICS
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C .. Scalar Arguments ..
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INTEGER ISYM, IWARN, N, NEL, NELT
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C .. Array Arguments ..
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REAL A(NELT), D(N), EL(NEL), R(N)
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INTEGER IA(NELT), IEL(NEL), JA(NELT), JEL(NEL)
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C .. Local Scalars ..
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REAL ELTMP
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INTEGER I, IBGN, IC, ICBGN, ICEND, ICOL, IEND, IR, IRBGN, IREND,
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+ IROW, IRR, J, JBGN, JELTMP, JEND
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CHARACTER XERN1*8
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C .. External Subroutines ..
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EXTERNAL XERMSG
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C***FIRST EXECUTABLE STATEMENT SSICS
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C
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C Set the lower triangle in IEL, JEL, EL
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C
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IWARN = 0
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C
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C All matrix elements stored in IA, JA, A. Pick out the lower
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C triangle (making sure that the Diagonal of EL is one) and
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C store by rows.
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C
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NEL = 1
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IEL(1) = 1
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JEL(1) = 1
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EL(1) = 1
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D(1) = A(1)
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CVD$R NOCONCUR
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DO 30 IROW = 2, N
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C Put in the Diagonal.
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NEL = NEL + 1
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IEL(IROW) = NEL
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JEL(NEL) = IROW
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EL(NEL) = 1
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D(IROW) = A(JA(IROW))
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C
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C Look in all the lower triangle columns for a matching row.
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C Since the matrix is symmetric, we can look across the
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C ITOW-th row by looking down the IROW-th column (if it is
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C stored ISYM=0)...
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IF( ISYM.EQ.0 ) THEN
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ICBGN = JA(IROW)
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ICEND = JA(IROW+1)-1
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ELSE
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ICBGN = 1
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ICEND = IROW-1
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ENDIF
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DO 20 IC = ICBGN, ICEND
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IF( ISYM.EQ.0 ) THEN
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ICOL = IA(IC)
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IF( ICOL.GE.IROW ) GOTO 20
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ELSE
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ICOL = IC
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ENDIF
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JBGN = JA(ICOL)+1
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JEND = JA(ICOL+1)-1
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IF( JBGN.LE.JEND .AND. IA(JEND).GE.IROW ) THEN
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CVD$ NOVECTOR
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DO 10 J = JBGN, JEND
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IF( IA(J).EQ.IROW ) THEN
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NEL = NEL + 1
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JEL(NEL) = ICOL
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EL(NEL) = A(J)
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GOTO 20
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ENDIF
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10 CONTINUE
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ENDIF
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20 CONTINUE
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30 CONTINUE
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IEL(N+1) = NEL+1
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C
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C Sort ROWS of lower triangle into descending order (count out
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C along rows out from Diagonal).
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C
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DO 60 IROW = 2, N
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IBGN = IEL(IROW)+1
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IEND = IEL(IROW+1)-1
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IF( IBGN.LT.IEND ) THEN
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DO 50 I = IBGN, IEND-1
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CVD$ NOVECTOR
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DO 40 J = I+1, IEND
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IF( JEL(I).GT.JEL(J) ) THEN
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JELTMP = JEL(J)
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JEL(J) = JEL(I)
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JEL(I) = JELTMP
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ELTMP = EL(J)
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EL(J) = EL(I)
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EL(I) = ELTMP
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ENDIF
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40 CONTINUE
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50 CONTINUE
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ENDIF
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60 CONTINUE
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C
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C Perform the Incomplete Cholesky decomposition by looping
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C over the rows.
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C Scale the first column. Use the structure of A to pick out
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C the rows with something in column 1.
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C
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IRBGN = JA(1)+1
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IREND = JA(2)-1
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DO 65 IRR = IRBGN, IREND
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IR = IA(IRR)
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C Find the index into EL for EL(1,IR).
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C Hint: it's the second entry.
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I = IEL(IR)+1
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EL(I) = EL(I)/D(1)
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65 CONTINUE
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C
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DO 110 IROW = 2, N
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C
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C Update the IROW-th diagonal.
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C
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DO 66 I = 1, IROW-1
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R(I) = 0
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66 CONTINUE
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IBGN = IEL(IROW)+1
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IEND = IEL(IROW+1)-1
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IF( IBGN.LE.IEND ) THEN
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CLLL. OPTION ASSERT (NOHAZARD)
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CDIR$ IVDEP
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CVD$ NODEPCHK
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DO 70 I = IBGN, IEND
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R(JEL(I)) = EL(I)*D(JEL(I))
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D(IROW) = D(IROW) - EL(I)*R(JEL(I))
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70 CONTINUE
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C
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C Check to see if we have a problem with the diagonal.
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C
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IF( D(IROW).LE.0.0E0 ) THEN
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IF( IWARN.EQ.0 ) IWARN = IROW
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D(IROW) = 1
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ENDIF
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ENDIF
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C
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C Update each EL(IROW+1:N,IROW), if there are any.
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C Use the structure of A to determine the Non-zero elements
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C of the IROW-th column of EL.
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C
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IRBGN = JA(IROW)
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IREND = JA(IROW+1)-1
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DO 100 IRR = IRBGN, IREND
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IR = IA(IRR)
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IF( IR.LE.IROW ) GOTO 100
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C Find the index into EL for EL(IR,IROW)
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IBGN = IEL(IR)+1
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IEND = IEL(IR+1)-1
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IF( JEL(IBGN).GT.IROW ) GOTO 100
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DO 90 I = IBGN, IEND
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IF( JEL(I).EQ.IROW ) THEN
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ICEND = IEND
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91 IF( JEL(ICEND).GE.IROW ) THEN
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ICEND = ICEND - 1
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GOTO 91
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ENDIF
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C Sum up the EL(IR,1:IROW-1)*R(1:IROW-1) contributions.
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CLLL. OPTION ASSERT (NOHAZARD)
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CDIR$ IVDEP
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CVD$ NODEPCHK
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DO 80 IC = IBGN, ICEND
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EL(I) = EL(I) - EL(IC)*R(JEL(IC))
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80 CONTINUE
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EL(I) = EL(I)/D(IROW)
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GOTO 100
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ENDIF
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90 CONTINUE
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C
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C If we get here, we have real problems...
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WRITE (XERN1, '(I8)') IROW
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CALL XERMSG ('SLATEC', 'SSICS',
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$ 'A and EL data structure mismatch in row '// XERN1, 1, 2)
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100 CONTINUE
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110 CONTINUE
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C
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C Replace diagonals by their inverses.
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C
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CVD$ CONCUR
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DO 120 I =1, N
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D(I) = 1.0E0/D(I)
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120 CONTINUE
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RETURN
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C------------- LAST LINE OF SSICS FOLLOWS ----------------------------
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END
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