458 lines
15 KiB
Fortran
458 lines
15 KiB
Fortran
SUBROUTINE ZTRSMF ( SIDE, UPLO, TRANSA, DIAG, M, N, ALPHA, A, LDA,
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$ B, LDB )
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* .. Scalar Arguments ..
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IMPLICIT NONE
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CHARACTER*1 SIDE, UPLO, TRANSA, DIAG
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INTEGER M, N, LDA, LDB
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COMPLEX*16 ALPHA
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* .. Array Arguments ..
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COMPLEX*16 A( LDA, * ), B( LDB, * )
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* ..
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*
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* Purpose
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* =======
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*
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* ZTRSM solves one of the matrix equations
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*
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* op( A )*X = alpha*B, or X*op( A ) = alpha*B,
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*
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* where alpha is a scalar, X and B are m by n matrices, A is a unit, or
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* non-unit, upper or lower triangular matrix and op( A ) is one of
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*
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* op( A ) = A or op( A ) = A' or op( A ) = conjg( A' ).
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*
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* The matrix X is overwritten on B.
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*
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* Parameters
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* ==========
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*
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* SIDE - CHARACTER*1.
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* On entry, SIDE specifies whether op( A ) appears on the left
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* or right of X as follows:
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*
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* SIDE = 'L' or 'l' op( A )*X = alpha*B.
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*
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* SIDE = 'R' or 'r' X*op( A ) = alpha*B.
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*
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* Unchanged on exit.
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*
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* UPLO - CHARACTER*1.
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* On entry, UPLO specifies whether the matrix A is an upper or
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* lower triangular matrix as follows:
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*
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* UPLO = 'U' or 'u' A is an upper triangular matrix.
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*
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* UPLO = 'L' or 'l' A is a lower triangular matrix.
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*
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* Unchanged on exit.
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*
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* TRANSA - CHARACTER*1.
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* On entry, TRANSA specifies the form of op( A ) to be used in
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* the matrix multiplication as follows:
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*
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* TRANSA = 'N' or 'n' op( A ) = A.
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*
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* TRANSA = 'T' or 't' op( A ) = A'.
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*
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* TRANSA = 'C' or 'c' op( A ) = conjg( A' ).
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*
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* Unchanged on exit.
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*
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* DIAG - CHARACTER*1.
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* On entry, DIAG specifies whether or not A is unit triangular
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* as follows:
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*
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* DIAG = 'U' or 'u' A is assumed to be unit triangular.
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*
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* DIAG = 'N' or 'n' A is not assumed to be unit
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* triangular.
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*
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* Unchanged on exit.
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*
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* M - INTEGER.
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* On entry, M specifies the number of rows of B. M must be at
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* least zero.
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* Unchanged on exit.
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*
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* N - INTEGER.
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* On entry, N specifies the number of columns of B. N must be
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* at least zero.
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* Unchanged on exit.
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*
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* ALPHA - COMPLEX*16 .
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* On entry, ALPHA specifies the scalar alpha. When alpha is
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* zero then A is not referenced and B need not be set before
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* entry.
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* Unchanged on exit.
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*
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* A - COMPLEX*16 array of DIMENSION ( LDA, k ), where k is m
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* when SIDE = 'L' or 'l' and is n when SIDE = 'R' or 'r'.
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* Before entry with UPLO = 'U' or 'u', the leading k by k
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* upper triangular part of the array A must contain the upper
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* triangular matrix and the strictly lower triangular part of
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* A is not referenced.
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* Before entry with UPLO = 'L' or 'l', the leading k by k
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* lower triangular part of the array A must contain the lower
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* triangular matrix and the strictly upper triangular part of
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* A is not referenced.
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* Note that when DIAG = 'U' or 'u', the diagonal elements of
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* A are not referenced either, but are assumed to be unity.
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* Unchanged on exit.
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*
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* LDA - INTEGER.
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* On entry, LDA specifies the first dimension of A as declared
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* in the calling (sub) program. When SIDE = 'L' or 'l' then
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* LDA must be at least max( 1, m ), when SIDE = 'R' or 'r'
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* then LDA must be at least max( 1, n ).
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* Unchanged on exit.
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*
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* B - COMPLEX*16 array of DIMENSION ( LDB, n ).
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* Before entry, the leading m by n part of the array B must
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* contain the right-hand side matrix B, and on exit is
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* overwritten by the solution matrix X.
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*
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* LDB - INTEGER.
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* On entry, LDB specifies the first dimension of B as declared
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* in the calling (sub) program. LDB must be at least
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* max( 1, m ).
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* Unchanged on exit.
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*
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*
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* Level 3 Blas routine.
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*
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* -- Written on 8-February-1989.
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* Jack Dongarra, Argonne National Laboratory.
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* Iain Duff, AERE Harwell.
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* Jeremy Du Croz, Numerical Algorithms Group Ltd.
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* Sven Hammarling, Numerical Algorithms Group Ltd.
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*
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*
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* .. External Functions ..
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LOGICAL LSAME
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EXTERNAL LSAME
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* .. External Subroutines ..
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EXTERNAL XERBLA
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* .. Intrinsic Functions ..
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INTRINSIC DCONJG, MAX
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* .. Local Scalars ..
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LOGICAL LSIDE, NOCONJ, NOUNIT, UPPER
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INTEGER I, INFO, J, K, NROWA
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COMPLEX*16 TEMP
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* .. Parameters ..
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COMPLEX*16 ONE
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PARAMETER ( ONE = ( 1.0D+0, 0.0D+0 ) )
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COMPLEX*16 ZERO
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PARAMETER ( ZERO = ( 0.0D+0, 0.0D+0 ) )
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* ..
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* .. Executable Statements ..
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*
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* Test the input parameters.
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*
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LSIDE = LSAME( SIDE , 'L' )
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IF( LSIDE )THEN
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NROWA = M
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ELSE
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NROWA = N
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END IF
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NOCONJ = (LSAME( TRANSA, 'N' ) .OR. LSAME( TRANSA, 'T' ))
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NOUNIT = LSAME( DIAG , 'N' )
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UPPER = LSAME( UPLO , 'U' )
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*
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INFO = 0
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IF( ( .NOT.LSIDE ).AND.
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$ ( .NOT.LSAME( SIDE , 'R' ) ) )THEN
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INFO = 1
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ELSE IF( ( .NOT.UPPER ).AND.
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$ ( .NOT.LSAME( UPLO , 'L' ) ) )THEN
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INFO = 2
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ELSE IF( ( .NOT.LSAME( TRANSA, 'N' ) ).AND.
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$ ( .NOT.LSAME( TRANSA, 'T' ) ).AND.
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$ ( .NOT.LSAME( TRANSA, 'R' ) ).AND.
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$ ( .NOT.LSAME( TRANSA, 'C' ) ) )THEN
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INFO = 3
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ELSE IF( ( .NOT.LSAME( DIAG , 'U' ) ).AND.
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$ ( .NOT.LSAME( DIAG , 'N' ) ) )THEN
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INFO = 4
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ELSE IF( M .LT.0 )THEN
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INFO = 5
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ELSE IF( N .LT.0 )THEN
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INFO = 6
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ELSE IF( LDA.LT.MAX( 1, NROWA ) )THEN
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INFO = 9
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ELSE IF( LDB.LT.MAX( 1, M ) )THEN
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INFO = 11
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END IF
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IF( INFO.NE.0 )THEN
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CALL XERBLA( 'ZTRSM ', INFO )
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RETURN
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END IF
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*
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* Quick return if possible.
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*
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IF( N.EQ.0 )
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$ RETURN
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*
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* And when alpha.eq.zero.
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*
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IF( ALPHA.EQ.ZERO )THEN
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DO 20, J = 1, N
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DO 10, I = 1, M
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B( I, J ) = ZERO
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10 CONTINUE
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20 CONTINUE
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RETURN
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END IF
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*
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* Start the operations.
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*
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IF( LSIDE )THEN
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IF( LSAME( TRANSA, 'N' ) .OR. LSAME( TRANSA, 'R' ) )THEN
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*
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* Form B := alpha*inv( A )*B.
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*
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IF( UPPER )THEN
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DO 60, J = 1, N
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IF( ALPHA.NE.ONE )THEN
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DO 30, I = 1, M
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B( I, J ) = ALPHA*B( I, J )
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30 CONTINUE
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END IF
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DO 50, K = M, 1, -1
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IF( B( K, J ).NE.ZERO )THEN
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IF( NOUNIT ) THEN
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IF (NOCONJ) THEN
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B( K, J ) = B( K, J )/A( K, K )
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ELSE
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B( K, J ) = B( K, J )/DCONJG(A( K, K ))
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ENDIF
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ENDIF
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IF (NOCONJ) THEN
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DO 40, I = 1, K - 1
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B( I, J ) = B( I, J ) - B( K, J )*A( I, K )
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40 CONTINUE
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ELSE
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DO 45, I = 1, K - 1
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B( I, J ) = B( I, J ) - B( K, J )*DCONJG(A( I, K ))
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45 CONTINUE
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ENDIF
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END IF
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50 CONTINUE
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60 CONTINUE
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ELSE
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DO 100, J = 1, N
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IF( ALPHA.NE.ONE )THEN
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DO 70, I = 1, M
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B( I, J ) = ALPHA*B( I, J )
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70 CONTINUE
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END IF
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DO 90 K = 1, M
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IF (NOCONJ) THEN
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IF( B( K, J ).NE.ZERO )THEN
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IF( NOUNIT )
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$ B( K, J ) = B( K, J )/A( K, K )
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DO 80, I = K + 1, M
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B( I, J ) = B( I, J ) - B( K, J )*A( I, K )
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80 CONTINUE
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END IF
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ELSE
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IF( B( K, J ).NE.ZERO )THEN
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IF( NOUNIT )
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$ B( K, J ) = B( K, J )/DCONJG(A( K, K ))
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DO 85, I = K + 1, M
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B( I, J ) = B( I, J ) - B( K, J )*DCONJG(A( I, K ))
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85 CONTINUE
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END IF
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ENDIF
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90 CONTINUE
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100 CONTINUE
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END IF
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ELSE
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*
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* Form B := alpha*inv( A' )*B
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* or B := alpha*inv( conjg( A' ) )*B.
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*
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IF( UPPER )THEN
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DO 140, J = 1, N
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DO 130, I = 1, M
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TEMP = ALPHA*B( I, J )
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IF( NOCONJ )THEN
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DO 110, K = 1, I - 1
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TEMP = TEMP - A( K, I )*B( K, J )
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110 CONTINUE
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IF( NOUNIT )
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$ TEMP = TEMP/A( I, I )
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ELSE
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DO 120, K = 1, I - 1
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TEMP = TEMP - DCONJG( A( K, I ) )*B( K, J )
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120 CONTINUE
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IF( NOUNIT )
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$ TEMP = TEMP/DCONJG( A( I, I ) )
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END IF
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B( I, J ) = TEMP
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130 CONTINUE
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140 CONTINUE
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ELSE
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DO 180, J = 1, N
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DO 170, I = M, 1, -1
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TEMP = ALPHA*B( I, J )
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IF( NOCONJ )THEN
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DO 150, K = I + 1, M
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TEMP = TEMP - A( K, I )*B( K, J )
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150 CONTINUE
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IF( NOUNIT )
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$ TEMP = TEMP/A( I, I )
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ELSE
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DO 160, K = I + 1, M
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TEMP = TEMP - DCONJG( A( K, I ) )*B( K, J )
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160 CONTINUE
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IF( NOUNIT )
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$ TEMP = TEMP/DCONJG( A( I, I ) )
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END IF
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B( I, J ) = TEMP
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170 CONTINUE
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180 CONTINUE
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END IF
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END IF
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ELSE
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IF( LSAME( TRANSA, 'N' ) .OR. LSAME( TRANSA, 'R' ) )THEN
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*
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* Form B := alpha*B*inv( A ).
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*
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IF( UPPER )THEN
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DO 230, J = 1, N
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IF( ALPHA.NE.ONE )THEN
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DO 190, I = 1, M
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B( I, J ) = ALPHA*B( I, J )
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190 CONTINUE
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END IF
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DO 210, K = 1, J - 1
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IF( A( K, J ).NE.ZERO )THEN
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IF (NOCONJ) THEN
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DO 200, I = 1, M
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B( I, J ) = B( I, J ) - A( K, J )*B( I, K )
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200 CONTINUE
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ELSE
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DO 205, I = 1, M
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B( I, J ) = B( I, J ) - DCONJG(A( K, J ))*B( I, K )
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205 CONTINUE
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ENDIF
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END IF
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210 CONTINUE
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IF( NOUNIT )THEN
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IF (NOCONJ) THEN
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TEMP = ONE/A( J, J )
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ELSE
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TEMP = ONE/DCONJG(A( J, J ))
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ENDIF
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DO 220, I = 1, M
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B( I, J ) = TEMP*B( I, J )
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220 CONTINUE
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END IF
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230 CONTINUE
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ELSE
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DO 280, J = N, 1, -1
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IF( ALPHA.NE.ONE )THEN
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DO 240, I = 1, M
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B( I, J ) = ALPHA*B( I, J )
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240 CONTINUE
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END IF
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DO 260, K = J + 1, N
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IF( A( K, J ).NE.ZERO )THEN
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IF (NOCONJ) THEN
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DO 250, I = 1, M
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B( I, J ) = B( I, J ) - A( K, J )*B( I, K )
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250 CONTINUE
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ELSE
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DO 255, I = 1, M
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B( I, J ) = B( I, J ) - DCONJG(A( K, J ))*B( I, K )
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255 CONTINUE
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ENDIF
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END IF
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260 CONTINUE
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IF( NOUNIT )THEN
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IF (NOCONJ) THEN
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TEMP = ONE/A( J, J )
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ELSE
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TEMP = ONE/DCONJG(A( J, J ))
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ENDIF
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DO 270, I = 1, M
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B( I, J ) = TEMP*B( I, J )
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270 CONTINUE
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END IF
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280 CONTINUE
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END IF
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ELSE
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*
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* Form B := alpha*B*inv( A' )
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* or B := alpha*B*inv( conjg( A' ) ).
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*
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IF( UPPER )THEN
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DO 330, K = N, 1, -1
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IF( NOUNIT )THEN
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IF( NOCONJ )THEN
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TEMP = ONE/A( K, K )
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ELSE
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TEMP = ONE/DCONJG( A( K, K ) )
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END IF
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DO 290, I = 1, M
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B( I, K ) = TEMP*B( I, K )
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290 CONTINUE
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END IF
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DO 310, J = 1, K - 1
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IF( A( J, K ).NE.ZERO )THEN
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IF( NOCONJ )THEN
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TEMP = A( J, K )
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ELSE
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TEMP = DCONJG( A( J, K ) )
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END IF
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DO 300, I = 1, M
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B( I, J ) = B( I, J ) - TEMP*B( I, K )
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300 CONTINUE
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END IF
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310 CONTINUE
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IF( ALPHA.NE.ONE )THEN
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DO 320, I = 1, M
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B( I, K ) = ALPHA*B( I, K )
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320 CONTINUE
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END IF
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330 CONTINUE
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ELSE
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DO 380, K = 1, N
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IF( NOUNIT )THEN
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IF( NOCONJ )THEN
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TEMP = ONE/A( K, K )
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ELSE
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TEMP = ONE/DCONJG( A( K, K ) )
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END IF
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DO 340, I = 1, M
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B( I, K ) = TEMP*B( I, K )
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340 CONTINUE
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END IF
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DO 360, J = K + 1, N
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IF( A( J, K ).NE.ZERO )THEN
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IF( NOCONJ )THEN
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TEMP = A( J, K )
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ELSE
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TEMP = DCONJG( A( J, K ) )
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END IF
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DO 350, I = 1, M
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B( I, J ) = B( I, J ) - TEMP*B( I, K )
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350 CONTINUE
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END IF
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360 CONTINUE
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IF( ALPHA.NE.ONE )THEN
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DO 370, I = 1, M
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B( I, K ) = ALPHA*B( I, K )
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370 CONTINUE
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END IF
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380 CONTINUE
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END IF
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END IF
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END IF
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*
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RETURN
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*
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* End of ZTRSM .
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*
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END
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