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- *> \brief \b ZGSVJ1 pre-processor for the routine zgesvj, applies Jacobi rotations targeting only particular pivots.
- *
- * =========== DOCUMENTATION ===========
- *
- * Online html documentation available at
- * http://www.netlib.org/lapack/explore-html/
- *
- *> \htmlonly
- *> Download ZGSVJ1 + dependencies
- *> <a href="http://www.netlib.org/cgi-bin/netlibfiles.tgz?format=tgz&filename=/lapack/lapack_routine/dgsvj1.f">
- *> [TGZ]</a>
- *> <a href="http://www.netlib.org/cgi-bin/netlibfiles.zip?format=zip&filename=/lapack/lapack_routine/dgsvj1.f">
- *> [ZIP]</a>
- *> <a href="http://www.netlib.org/cgi-bin/netlibfiles.txt?format=txt&filename=/lapack/lapack_routine/dgsvj1.f">
- *> [TXT]</a>
- *> \endhtmlonly
- *
- * Definition:
- * ===========
- *
- * SUBROUTINE ZGSVJ1( JOBV, M, N, N1, A, LDA, D, SVA, MV, V, LDV,
- * EPS, SFMIN, TOL, NSWEEP, WORK, LWORK, INFO )
- *
- * .. Scalar Arguments ..
- * DOUBLE PRECISION EPS, SFMIN, TOL
- * INTEGER INFO, LDA, LDV, LWORK, M, MV, N, N1, NSWEEP
- * CHARACTER*1 JOBV
- * ..
- * .. Array Arguments ..
- * COMPLEX*16 A( LDA, * ), D( N ), V( LDV, * ), WORK( LWORK )
- * DOUBLE PRECISION SVA( N )
- * ..
- *
- *
- *> \par Purpose:
- * =============
- *>
- *> \verbatim
- *>
- *> ZGSVJ1 is called from ZGESVJ as a pre-processor and that is its main
- *> purpose. It applies Jacobi rotations in the same way as ZGESVJ does, but
- *> it targets only particular pivots and it does not check convergence
- *> (stopping criterion). Few tunning parameters (marked by [TP]) are
- *> available for the implementer.
- *>
- *> Further Details
- *> ~~~~~~~~~~~~~~~
- *> ZGSVJ1 applies few sweeps of Jacobi rotations in the column space of
- *> the input M-by-N matrix A. The pivot pairs are taken from the (1,2)
- *> off-diagonal block in the corresponding N-by-N Gram matrix A^T * A. The
- *> block-entries (tiles) of the (1,2) off-diagonal block are marked by the
- *> [x]'s in the following scheme:
- *>
- *> | * * * [x] [x] [x]|
- *> | * * * [x] [x] [x]| Row-cycling in the nblr-by-nblc [x] blocks.
- *> | * * * [x] [x] [x]| Row-cyclic pivoting inside each [x] block.
- *> |[x] [x] [x] * * * |
- *> |[x] [x] [x] * * * |
- *> |[x] [x] [x] * * * |
- *>
- *> In terms of the columns of A, the first N1 columns are rotated 'against'
- *> the remaining N-N1 columns, trying to increase the angle between the
- *> corresponding subspaces. The off-diagonal block is N1-by(N-N1) and it is
- *> tiled using quadratic tiles of side KBL. Here, KBL is a tunning parmeter.
- *> The number of sweeps is given in NSWEEP and the orthogonality threshold
- *> is given in TOL.
- *> \endverbatim
- *
- * Arguments:
- * ==========
- *
- *> \param[in] JOBV
- *> \verbatim
- *> JOBV is CHARACTER*1
- *> Specifies whether the output from this procedure is used
- *> to compute the matrix V:
- *> = 'V': the product of the Jacobi rotations is accumulated
- *> by postmulyiplying the N-by-N array V.
- *> (See the description of V.)
- *> = 'A': the product of the Jacobi rotations is accumulated
- *> by postmulyiplying the MV-by-N array V.
- *> (See the descriptions of MV and V.)
- *> = 'N': the Jacobi rotations are not accumulated.
- *> \endverbatim
- *>
- *> \param[in] M
- *> \verbatim
- *> M is INTEGER
- *> The number of rows of the input matrix A. M >= 0.
- *> \endverbatim
- *>
- *> \param[in] N
- *> \verbatim
- *> N is INTEGER
- *> The number of columns of the input matrix A.
- *> M >= N >= 0.
- *> \endverbatim
- *>
- *> \param[in] N1
- *> \verbatim
- *> N1 is INTEGER
- *> N1 specifies the 2 x 2 block partition, the first N1 columns are
- *> rotated 'against' the remaining N-N1 columns of A.
- *> \endverbatim
- *>
- *> \param[in,out] A
- *> \verbatim
- *> A is COMPLEX*16 array, dimension (LDA,N)
- *> On entry, M-by-N matrix A, such that A*diag(D) represents
- *> the input matrix.
- *> On exit,
- *> A_onexit * D_onexit represents the input matrix A*diag(D)
- *> post-multiplied by a sequence of Jacobi rotations, where the
- *> rotation threshold and the total number of sweeps are given in
- *> TOL and NSWEEP, respectively.
- *> (See the descriptions of N1, D, TOL and NSWEEP.)
- *> \endverbatim
- *>
- *> \param[in] LDA
- *> \verbatim
- *> LDA is INTEGER
- *> The leading dimension of the array A. LDA >= max(1,M).
- *> \endverbatim
- *>
- *> \param[in,out] D
- *> \verbatim
- *> D is COMPLEX*16 array, dimension (N)
- *> The array D accumulates the scaling factors from the fast scaled
- *> Jacobi rotations.
- *> On entry, A*diag(D) represents the input matrix.
- *> On exit, A_onexit*diag(D_onexit) represents the input matrix
- *> post-multiplied by a sequence of Jacobi rotations, where the
- *> rotation threshold and the total number of sweeps are given in
- *> TOL and NSWEEP, respectively.
- *> (See the descriptions of N1, A, TOL and NSWEEP.)
- *> \endverbatim
- *>
- *> \param[in,out] SVA
- *> \verbatim
- *> SVA is DOUBLE PRECISION array, dimension (N)
- *> On entry, SVA contains the Euclidean norms of the columns of
- *> the matrix A*diag(D).
- *> On exit, SVA contains the Euclidean norms of the columns of
- *> the matrix onexit*diag(D_onexit).
- *> \endverbatim
- *>
- *> \param[in] MV
- *> \verbatim
- *> MV is INTEGER
- *> If JOBV .EQ. 'A', then MV rows of V are post-multipled by a
- *> sequence of Jacobi rotations.
- *> If JOBV = 'N', then MV is not referenced.
- *> \endverbatim
- *>
- *> \param[in,out] V
- *> \verbatim
- *> V is COMPLEX*16 array, dimension (LDV,N)
- *> If JOBV .EQ. 'V' then N rows of V are post-multipled by a
- *> sequence of Jacobi rotations.
- *> If JOBV .EQ. 'A' then MV rows of V are post-multipled by a
- *> sequence of Jacobi rotations.
- *> If JOBV = 'N', then V is not referenced.
- *> \endverbatim
- *>
- *> \param[in] LDV
- *> \verbatim
- *> LDV is INTEGER
- *> The leading dimension of the array V, LDV >= 1.
- *> If JOBV = 'V', LDV .GE. N.
- *> If JOBV = 'A', LDV .GE. MV.
- *> \endverbatim
- *>
- *> \param[in] EPS
- *> \verbatim
- *> EPS is DOUBLE PRECISION
- *> EPS = DLAMCH('Epsilon')
- *> \endverbatim
- *>
- *> \param[in] SFMIN
- *> \verbatim
- *> SFMIN is DOUBLE PRECISION
- *> SFMIN = DLAMCH('Safe Minimum')
- *> \endverbatim
- *>
- *> \param[in] TOL
- *> \verbatim
- *> TOL is DOUBLE PRECISION
- *> TOL is the threshold for Jacobi rotations. For a pair
- *> A(:,p), A(:,q) of pivot columns, the Jacobi rotation is
- *> applied only if ABS(COS(angle(A(:,p),A(:,q)))) .GT. TOL.
- *> \endverbatim
- *>
- *> \param[in] NSWEEP
- *> \verbatim
- *> NSWEEP is INTEGER
- *> NSWEEP is the number of sweeps of Jacobi rotations to be
- *> performed.
- *> \endverbatim
- *>
- *> \param[out] WORK
- *> \verbatim
- *> WORK is COMPLEX*16 array, dimension (LWORK)
- *> \endverbatim
- *>
- *> \param[in] LWORK
- *> \verbatim
- *> LWORK is INTEGER
- *> LWORK is the dimension of WORK. LWORK .GE. M.
- *> \endverbatim
- *>
- *> \param[out] INFO
- *> \verbatim
- *> INFO is INTEGER
- *> = 0 : successful exit.
- *> < 0 : if INFO = -i, then the i-th argument had an illegal value
- *> \endverbatim
- *
- * Authors:
- * ========
- *
- *> \author Univ. of Tennessee
- *> \author Univ. of California Berkeley
- *> \author Univ. of Colorado Denver
- *> \author NAG Ltd.
- *
- *> \date June 2016
- *
- *> \ingroup complex16OTHERcomputational
- *
- *> \par Contributor:
- * ==================
- *>
- *> Zlatko Drmac (Zagreb, Croatia)
- *
- * =====================================================================
- SUBROUTINE ZGSVJ1( JOBV, M, N, N1, A, LDA, D, SVA, MV, V, LDV,
- $ EPS, SFMIN, TOL, NSWEEP, WORK, LWORK, INFO )
- *
- * -- LAPACK computational routine (version 3.7.0) --
- * -- LAPACK is a software package provided by Univ. of Tennessee, --
- * -- Univ. of California Berkeley, Univ. of Colorado Denver and NAG Ltd..--
- * June 2016
- *
- IMPLICIT NONE
- * .. Scalar Arguments ..
- DOUBLE PRECISION EPS, SFMIN, TOL
- INTEGER INFO, LDA, LDV, LWORK, M, MV, N, N1, NSWEEP
- CHARACTER*1 JOBV
- * ..
- * .. Array Arguments ..
- COMPLEX*16 A( LDA, * ), D( N ), V( LDV, * ), WORK( LWORK )
- DOUBLE PRECISION SVA( N )
- * ..
- *
- * =====================================================================
- *
- * .. Local Parameters ..
- DOUBLE PRECISION ZERO, HALF, ONE
- PARAMETER ( ZERO = 0.0D0, HALF = 0.5D0, ONE = 1.0D0)
- * ..
- * .. Local Scalars ..
- COMPLEX*16 AAPQ, OMPQ
- DOUBLE PRECISION AAPP, AAPP0, AAPQ1, AAQQ, APOAQ, AQOAP, BIG,
- $ BIGTHETA, CS, MXAAPQ, MXSINJ, ROOTBIG,
- $ ROOTEPS, ROOTSFMIN, ROOTTOL, SMALL, SN, T,
- $ TEMP1, THETA, THSIGN
- INTEGER BLSKIP, EMPTSW, i, ibr, igl, IERR, IJBLSK,
- $ ISWROT, jbc, jgl, KBL, MVL, NOTROT, nblc, nblr,
- $ p, PSKIPPED, q, ROWSKIP, SWBAND
- LOGICAL APPLV, ROTOK, RSVEC
- * ..
- * ..
- * .. Intrinsic Functions ..
- INTRINSIC ABS, CONJG, MAX, DBLE, MIN, SIGN, SQRT
- * ..
- * .. External Functions ..
- DOUBLE PRECISION DZNRM2
- COMPLEX*16 ZDOTC
- INTEGER IDAMAX
- LOGICAL LSAME
- EXTERNAL IDAMAX, LSAME, ZDOTC, DZNRM2
- * ..
- * .. External Subroutines ..
- * .. from BLAS
- EXTERNAL ZCOPY, ZROT, ZSWAP
- * .. from LAPACK
- EXTERNAL ZLASCL, ZLASSQ, XERBLA
- * ..
- * .. Executable Statements ..
- *
- * Test the input parameters.
- *
- APPLV = LSAME( JOBV, 'A' )
- RSVEC = LSAME( JOBV, 'V' )
- IF( .NOT.( RSVEC .OR. APPLV .OR. LSAME( JOBV, 'N' ) ) ) THEN
- INFO = -1
- ELSE IF( M.LT.0 ) THEN
- INFO = -2
- ELSE IF( ( N.LT.0 ) .OR. ( N.GT.M ) ) THEN
- INFO = -3
- ELSE IF( N1.LT.0 ) THEN
- INFO = -4
- ELSE IF( LDA.LT.M ) THEN
- INFO = -6
- ELSE IF( ( RSVEC.OR.APPLV ) .AND. ( MV.LT.0 ) ) THEN
- INFO = -9
- ELSE IF( ( RSVEC.AND.( LDV.LT.N ) ).OR.
- $ ( APPLV.AND.( LDV.LT.MV ) ) ) THEN
- INFO = -11
- ELSE IF( TOL.LE.EPS ) THEN
- INFO = -14
- ELSE IF( NSWEEP.LT.0 ) THEN
- INFO = -15
- ELSE IF( LWORK.LT.M ) THEN
- INFO = -17
- ELSE
- INFO = 0
- END IF
- *
- * #:(
- IF( INFO.NE.0 ) THEN
- CALL XERBLA( 'ZGSVJ1', -INFO )
- RETURN
- END IF
- *
- IF( RSVEC ) THEN
- MVL = N
- ELSE IF( APPLV ) THEN
- MVL = MV
- END IF
- RSVEC = RSVEC .OR. APPLV
-
- ROOTEPS = SQRT( EPS )
- ROOTSFMIN = SQRT( SFMIN )
- SMALL = SFMIN / EPS
- BIG = ONE / SFMIN
- ROOTBIG = ONE / ROOTSFMIN
- * LARGE = BIG / SQRT( DBLE( M*N ) )
- BIGTHETA = ONE / ROOTEPS
- ROOTTOL = SQRT( TOL )
- *
- * .. Initialize the right singular vector matrix ..
- *
- * RSVEC = LSAME( JOBV, 'Y' )
- *
- EMPTSW = N1*( N-N1 )
- NOTROT = 0
- *
- * .. Row-cyclic pivot strategy with de Rijk's pivoting ..
- *
- KBL = MIN( 8, N )
- NBLR = N1 / KBL
- IF( ( NBLR*KBL ).NE.N1 )NBLR = NBLR + 1
-
- * .. the tiling is nblr-by-nblc [tiles]
-
- NBLC = ( N-N1 ) / KBL
- IF( ( NBLC*KBL ).NE.( N-N1 ) )NBLC = NBLC + 1
- BLSKIP = ( KBL**2 ) + 1
- *[TP] BLKSKIP is a tuning parameter that depends on SWBAND and KBL.
-
- ROWSKIP = MIN( 5, KBL )
- *[TP] ROWSKIP is a tuning parameter.
- SWBAND = 0
- *[TP] SWBAND is a tuning parameter. It is meaningful and effective
- * if ZGESVJ is used as a computational routine in the preconditioned
- * Jacobi SVD algorithm ZGEJSV.
- *
- *
- * | * * * [x] [x] [x]|
- * | * * * [x] [x] [x]| Row-cycling in the nblr-by-nblc [x] blocks.
- * | * * * [x] [x] [x]| Row-cyclic pivoting inside each [x] block.
- * |[x] [x] [x] * * * |
- * |[x] [x] [x] * * * |
- * |[x] [x] [x] * * * |
- *
- *
- DO 1993 i = 1, NSWEEP
- *
- * .. go go go ...
- *
- MXAAPQ = ZERO
- MXSINJ = ZERO
- ISWROT = 0
- *
- NOTROT = 0
- PSKIPPED = 0
- *
- * Each sweep is unrolled using KBL-by-KBL tiles over the pivot pairs
- * 1 <= p < q <= N. This is the first step toward a blocked implementation
- * of the rotations. New implementation, based on block transformations,
- * is under development.
- *
- DO 2000 ibr = 1, NBLR
- *
- igl = ( ibr-1 )*KBL + 1
- *
-
- *
- * ... go to the off diagonal blocks
- *
- igl = ( ibr-1 )*KBL + 1
- *
- * DO 2010 jbc = ibr + 1, NBL
- DO 2010 jbc = 1, NBLC
- *
- jgl = ( jbc-1 )*KBL + N1 + 1
- *
- * doing the block at ( ibr, jbc )
- *
- IJBLSK = 0
- DO 2100 p = igl, MIN( igl+KBL-1, N1 )
- *
- AAPP = SVA( p )
- IF( AAPP.GT.ZERO ) THEN
- *
- PSKIPPED = 0
- *
- DO 2200 q = jgl, MIN( jgl+KBL-1, N )
- *
- AAQQ = SVA( q )
- IF( AAQQ.GT.ZERO ) THEN
- AAPP0 = AAPP
- *
- * .. M x 2 Jacobi SVD ..
- *
- * Safe Gram matrix computation
- *
- IF( AAQQ.GE.ONE ) THEN
- IF( AAPP.GE.AAQQ ) THEN
- ROTOK = ( SMALL*AAPP ).LE.AAQQ
- ELSE
- ROTOK = ( SMALL*AAQQ ).LE.AAPP
- END IF
- IF( AAPP.LT.( BIG / AAQQ ) ) THEN
- AAPQ = ( ZDOTC( M, A( 1, p ), 1,
- $ A( 1, q ), 1 ) / AAQQ ) / AAPP
- ELSE
- CALL ZCOPY( M, A( 1, p ), 1,
- $ WORK, 1 )
- CALL ZLASCL( 'G', 0, 0, AAPP,
- $ ONE, M, 1,
- $ WORK, LDA, IERR )
- AAPQ = ZDOTC( M, WORK, 1,
- $ A( 1, q ), 1 ) / AAQQ
- END IF
- ELSE
- IF( AAPP.GE.AAQQ ) THEN
- ROTOK = AAPP.LE.( AAQQ / SMALL )
- ELSE
- ROTOK = AAQQ.LE.( AAPP / SMALL )
- END IF
- IF( AAPP.GT.( SMALL / AAQQ ) ) THEN
- AAPQ = ( ZDOTC( M, A( 1, p ), 1,
- $ A( 1, q ), 1 ) / MAX(AAQQ,AAPP) )
- $ / MIN(AAQQ,AAPP)
- ELSE
- CALL ZCOPY( M, A( 1, q ), 1,
- $ WORK, 1 )
- CALL ZLASCL( 'G', 0, 0, AAQQ,
- $ ONE, M, 1,
- $ WORK, LDA, IERR )
- AAPQ = ZDOTC( M, A( 1, p ), 1,
- $ WORK, 1 ) / AAPP
- END IF
- END IF
- *
- * AAPQ = AAPQ * CONJG(CWORK(p))*CWORK(q)
- AAPQ1 = -ABS(AAPQ)
- MXAAPQ = MAX( MXAAPQ, -AAPQ1 )
- *
- * TO rotate or NOT to rotate, THAT is the question ...
- *
- IF( ABS( AAPQ1 ).GT.TOL ) THEN
- OMPQ = AAPQ / ABS(AAPQ)
- NOTROT = 0
- *[RTD] ROTATED = ROTATED + 1
- PSKIPPED = 0
- ISWROT = ISWROT + 1
- *
- IF( ROTOK ) THEN
- *
- AQOAP = AAQQ / AAPP
- APOAQ = AAPP / AAQQ
- THETA = -HALF*ABS( AQOAP-APOAQ )/ AAPQ1
- IF( AAQQ.GT.AAPP0 )THETA = -THETA
- *
- IF( ABS( THETA ).GT.BIGTHETA ) THEN
- T = HALF / THETA
- CS = ONE
- CALL ZROT( M, A(1,p), 1, A(1,q), 1,
- $ CS, CONJG(OMPQ)*T )
- IF( RSVEC ) THEN
- CALL ZROT( MVL, V(1,p), 1,
- $ V(1,q), 1, CS, CONJG(OMPQ)*T )
- END IF
- SVA( q ) = AAQQ*SQRT( MAX( ZERO,
- $ ONE+T*APOAQ*AAPQ1 ) )
- AAPP = AAPP*SQRT( MAX( ZERO,
- $ ONE-T*AQOAP*AAPQ1 ) )
- MXSINJ = MAX( MXSINJ, ABS( T ) )
- ELSE
- *
- * .. choose correct signum for THETA and rotate
- *
- THSIGN = -SIGN( ONE, AAPQ1 )
- IF( AAQQ.GT.AAPP0 )THSIGN = -THSIGN
- T = ONE / ( THETA+THSIGN*
- $ SQRT( ONE+THETA*THETA ) )
- CS = SQRT( ONE / ( ONE+T*T ) )
- SN = T*CS
- MXSINJ = MAX( MXSINJ, ABS( SN ) )
- SVA( q ) = AAQQ*SQRT( MAX( ZERO,
- $ ONE+T*APOAQ*AAPQ1 ) )
- AAPP = AAPP*SQRT( MAX( ZERO,
- $ ONE-T*AQOAP*AAPQ1 ) )
- *
- CALL ZROT( M, A(1,p), 1, A(1,q), 1,
- $ CS, CONJG(OMPQ)*SN )
- IF( RSVEC ) THEN
- CALL ZROT( MVL, V(1,p), 1,
- $ V(1,q), 1, CS, CONJG(OMPQ)*SN )
- END IF
- END IF
- D(p) = -D(q) * OMPQ
- *
- ELSE
- * .. have to use modified Gram-Schmidt like transformation
- IF( AAPP.GT.AAQQ ) THEN
- CALL ZCOPY( M, A( 1, p ), 1,
- $ WORK, 1 )
- CALL ZLASCL( 'G', 0, 0, AAPP, ONE,
- $ M, 1, WORK,LDA,
- $ IERR )
- CALL ZLASCL( 'G', 0, 0, AAQQ, ONE,
- $ M, 1, A( 1, q ), LDA,
- $ IERR )
- CALL ZAXPY( M, -AAPQ, WORK,
- $ 1, A( 1, q ), 1 )
- CALL ZLASCL( 'G', 0, 0, ONE, AAQQ,
- $ M, 1, A( 1, q ), LDA,
- $ IERR )
- SVA( q ) = AAQQ*SQRT( MAX( ZERO,
- $ ONE-AAPQ1*AAPQ1 ) )
- MXSINJ = MAX( MXSINJ, SFMIN )
- ELSE
- CALL ZCOPY( M, A( 1, q ), 1,
- $ WORK, 1 )
- CALL ZLASCL( 'G', 0, 0, AAQQ, ONE,
- $ M, 1, WORK,LDA,
- $ IERR )
- CALL ZLASCL( 'G', 0, 0, AAPP, ONE,
- $ M, 1, A( 1, p ), LDA,
- $ IERR )
- CALL ZAXPY( M, -CONJG(AAPQ),
- $ WORK, 1, A( 1, p ), 1 )
- CALL ZLASCL( 'G', 0, 0, ONE, AAPP,
- $ M, 1, A( 1, p ), LDA,
- $ IERR )
- SVA( p ) = AAPP*SQRT( MAX( ZERO,
- $ ONE-AAPQ1*AAPQ1 ) )
- MXSINJ = MAX( MXSINJ, SFMIN )
- END IF
- END IF
- * END IF ROTOK THEN ... ELSE
- *
- * In the case of cancellation in updating SVA(q), SVA(p)
- * .. recompute SVA(q), SVA(p)
- IF( ( SVA( q ) / AAQQ )**2.LE.ROOTEPS )
- $ THEN
- IF( ( AAQQ.LT.ROOTBIG ) .AND.
- $ ( AAQQ.GT.ROOTSFMIN ) ) THEN
- SVA( q ) = DZNRM2( M, A( 1, q ), 1)
- ELSE
- T = ZERO
- AAQQ = ONE
- CALL ZLASSQ( M, A( 1, q ), 1, T,
- $ AAQQ )
- SVA( q ) = T*SQRT( AAQQ )
- END IF
- END IF
- IF( ( AAPP / AAPP0 )**2.LE.ROOTEPS ) THEN
- IF( ( AAPP.LT.ROOTBIG ) .AND.
- $ ( AAPP.GT.ROOTSFMIN ) ) THEN
- AAPP = DZNRM2( M, A( 1, p ), 1 )
- ELSE
- T = ZERO
- AAPP = ONE
- CALL ZLASSQ( M, A( 1, p ), 1, T,
- $ AAPP )
- AAPP = T*SQRT( AAPP )
- END IF
- SVA( p ) = AAPP
- END IF
- * end of OK rotation
- ELSE
- NOTROT = NOTROT + 1
- *[RTD] SKIPPED = SKIPPED + 1
- PSKIPPED = PSKIPPED + 1
- IJBLSK = IJBLSK + 1
- END IF
- ELSE
- NOTROT = NOTROT + 1
- PSKIPPED = PSKIPPED + 1
- IJBLSK = IJBLSK + 1
- END IF
- *
- IF( ( i.LE.SWBAND ) .AND. ( IJBLSK.GE.BLSKIP ) )
- $ THEN
- SVA( p ) = AAPP
- NOTROT = 0
- GO TO 2011
- END IF
- IF( ( i.LE.SWBAND ) .AND.
- $ ( PSKIPPED.GT.ROWSKIP ) ) THEN
- AAPP = -AAPP
- NOTROT = 0
- GO TO 2203
- END IF
- *
- 2200 CONTINUE
- * end of the q-loop
- 2203 CONTINUE
- *
- SVA( p ) = AAPP
- *
- ELSE
- *
- IF( AAPP.EQ.ZERO )NOTROT = NOTROT +
- $ MIN( jgl+KBL-1, N ) - jgl + 1
- IF( AAPP.LT.ZERO )NOTROT = 0
- *
- END IF
- *
- 2100 CONTINUE
- * end of the p-loop
- 2010 CONTINUE
- * end of the jbc-loop
- 2011 CONTINUE
- *2011 bailed out of the jbc-loop
- DO 2012 p = igl, MIN( igl+KBL-1, N )
- SVA( p ) = ABS( SVA( p ) )
- 2012 CONTINUE
- ***
- 2000 CONTINUE
- *2000 :: end of the ibr-loop
- *
- * .. update SVA(N)
- IF( ( SVA( N ).LT.ROOTBIG ) .AND. ( SVA( N ).GT.ROOTSFMIN ) )
- $ THEN
- SVA( N ) = DZNRM2( M, A( 1, N ), 1 )
- ELSE
- T = ZERO
- AAPP = ONE
- CALL ZLASSQ( M, A( 1, N ), 1, T, AAPP )
- SVA( N ) = T*SQRT( AAPP )
- END IF
- *
- * Additional steering devices
- *
- IF( ( i.LT.SWBAND ) .AND. ( ( MXAAPQ.LE.ROOTTOL ) .OR.
- $ ( ISWROT.LE.N ) ) )SWBAND = i
- *
- IF( ( i.GT.SWBAND+1 ) .AND. ( MXAAPQ.LT.SQRT( DBLE( N ) )*
- $ TOL ) .AND. ( DBLE( N )*MXAAPQ*MXSINJ.LT.TOL ) ) THEN
- GO TO 1994
- END IF
- *
- IF( NOTROT.GE.EMPTSW )GO TO 1994
- *
- 1993 CONTINUE
- * end i=1:NSWEEP loop
- *
- * #:( Reaching this point means that the procedure has not converged.
- INFO = NSWEEP - 1
- GO TO 1995
- *
- 1994 CONTINUE
- * #:) Reaching this point means numerical convergence after the i-th
- * sweep.
- *
- INFO = 0
- * #:) INFO = 0 confirms successful iterations.
- 1995 CONTINUE
- *
- * Sort the vector SVA() of column norms.
- DO 5991 p = 1, N - 1
- q = IDAMAX( N-p+1, SVA( p ), 1 ) + p - 1
- IF( p.NE.q ) THEN
- TEMP1 = SVA( p )
- SVA( p ) = SVA( q )
- SVA( q ) = TEMP1
- AAPQ = D( p )
- D( p ) = D( q )
- D( q ) = AAPQ
- CALL ZSWAP( M, A( 1, p ), 1, A( 1, q ), 1 )
- IF( RSVEC )CALL ZSWAP( MVL, V( 1, p ), 1, V( 1, q ), 1 )
- END IF
- 5991 CONTINUE
- *
- *
- RETURN
- * ..
- * .. END OF ZGSVJ1
- * ..
- END
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