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- *> \brief \b DLAEXC swaps adjacent diagonal blocks of a real upper quasi-triangular matrix in Schur canonical form, by an orthogonal similarity transformation.
- *
- * =========== DOCUMENTATION ===========
- *
- * Online html documentation available at
- * http://www.netlib.org/lapack/explore-html/
- *
- *> \htmlonly
- *> Download DLAEXC + dependencies
- *> <a href="http://www.netlib.org/cgi-bin/netlibfiles.tgz?format=tgz&filename=/lapack/lapack_routine/dlaexc.f">
- *> [TGZ]</a>
- *> <a href="http://www.netlib.org/cgi-bin/netlibfiles.zip?format=zip&filename=/lapack/lapack_routine/dlaexc.f">
- *> [ZIP]</a>
- *> <a href="http://www.netlib.org/cgi-bin/netlibfiles.txt?format=txt&filename=/lapack/lapack_routine/dlaexc.f">
- *> [TXT]</a>
- *> \endhtmlonly
- *
- * Definition:
- * ===========
- *
- * SUBROUTINE DLAEXC( WANTQ, N, T, LDT, Q, LDQ, J1, N1, N2, WORK,
- * INFO )
- *
- * .. Scalar Arguments ..
- * LOGICAL WANTQ
- * INTEGER INFO, J1, LDQ, LDT, N, N1, N2
- * ..
- * .. Array Arguments ..
- * DOUBLE PRECISION Q( LDQ, * ), T( LDT, * ), WORK( * )
- * ..
- *
- *
- *> \par Purpose:
- * =============
- *>
- *> \verbatim
- *>
- *> DLAEXC swaps adjacent diagonal blocks T11 and T22 of order 1 or 2 in
- *> an upper quasi-triangular matrix T by an orthogonal similarity
- *> transformation.
- *>
- *> T must be in Schur canonical form, that is, block upper triangular
- *> with 1-by-1 and 2-by-2 diagonal blocks; each 2-by-2 diagonal block
- *> has its diagonal elemnts equal and its off-diagonal elements of
- *> opposite sign.
- *> \endverbatim
- *
- * Arguments:
- * ==========
- *
- *> \param[in] WANTQ
- *> \verbatim
- *> WANTQ is LOGICAL
- *> = .TRUE. : accumulate the transformation in the matrix Q;
- *> = .FALSE.: do not accumulate the transformation.
- *> \endverbatim
- *>
- *> \param[in] N
- *> \verbatim
- *> N is INTEGER
- *> The order of the matrix T. N >= 0.
- *> \endverbatim
- *>
- *> \param[in,out] T
- *> \verbatim
- *> T is DOUBLE PRECISION array, dimension (LDT,N)
- *> On entry, the upper quasi-triangular matrix T, in Schur
- *> canonical form.
- *> On exit, the updated matrix T, again in Schur canonical form.
- *> \endverbatim
- *>
- *> \param[in] LDT
- *> \verbatim
- *> LDT is INTEGER
- *> The leading dimension of the array T. LDT >= max(1,N).
- *> \endverbatim
- *>
- *> \param[in,out] Q
- *> \verbatim
- *> Q is DOUBLE PRECISION array, dimension (LDQ,N)
- *> On entry, if WANTQ is .TRUE., the orthogonal matrix Q.
- *> On exit, if WANTQ is .TRUE., the updated matrix Q.
- *> If WANTQ is .FALSE., Q is not referenced.
- *> \endverbatim
- *>
- *> \param[in] LDQ
- *> \verbatim
- *> LDQ is INTEGER
- *> The leading dimension of the array Q.
- *> LDQ >= 1; and if WANTQ is .TRUE., LDQ >= N.
- *> \endverbatim
- *>
- *> \param[in] J1
- *> \verbatim
- *> J1 is INTEGER
- *> The index of the first row of the first block T11.
- *> \endverbatim
- *>
- *> \param[in] N1
- *> \verbatim
- *> N1 is INTEGER
- *> The order of the first block T11. N1 = 0, 1 or 2.
- *> \endverbatim
- *>
- *> \param[in] N2
- *> \verbatim
- *> N2 is INTEGER
- *> The order of the second block T22. N2 = 0, 1 or 2.
- *> \endverbatim
- *>
- *> \param[out] WORK
- *> \verbatim
- *> WORK is DOUBLE PRECISION array, dimension (N)
- *> \endverbatim
- *>
- *> \param[out] INFO
- *> \verbatim
- *> INFO is INTEGER
- *> = 0: successful exit
- *> = 1: the transformed matrix T would be too far from Schur
- *> form; the blocks are not swapped and T and Q are
- *> unchanged.
- *> \endverbatim
- *
- * Authors:
- * ========
- *
- *> \author Univ. of Tennessee
- *> \author Univ. of California Berkeley
- *> \author Univ. of Colorado Denver
- *> \author NAG Ltd.
- *
- *> \date December 2016
- *
- *> \ingroup doubleOTHERauxiliary
- *
- * =====================================================================
- SUBROUTINE DLAEXC( WANTQ, N, T, LDT, Q, LDQ, J1, N1, N2, WORK,
- $ INFO )
- *
- * -- LAPACK auxiliary 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..--
- * December 2016
- *
- * .. Scalar Arguments ..
- LOGICAL WANTQ
- INTEGER INFO, J1, LDQ, LDT, N, N1, N2
- * ..
- * .. Array Arguments ..
- DOUBLE PRECISION Q( LDQ, * ), T( LDT, * ), WORK( * )
- * ..
- *
- * =====================================================================
- *
- * .. Parameters ..
- DOUBLE PRECISION ZERO, ONE
- PARAMETER ( ZERO = 0.0D+0, ONE = 1.0D+0 )
- DOUBLE PRECISION TEN
- PARAMETER ( TEN = 1.0D+1 )
- INTEGER LDD, LDX
- PARAMETER ( LDD = 4, LDX = 2 )
- * ..
- * .. Local Scalars ..
- INTEGER IERR, J2, J3, J4, K, ND
- DOUBLE PRECISION CS, DNORM, EPS, SCALE, SMLNUM, SN, T11, T22,
- $ T33, TAU, TAU1, TAU2, TEMP, THRESH, WI1, WI2,
- $ WR1, WR2, XNORM
- * ..
- * .. Local Arrays ..
- DOUBLE PRECISION D( LDD, 4 ), U( 3 ), U1( 3 ), U2( 3 ),
- $ X( LDX, 2 )
- * ..
- * .. External Functions ..
- DOUBLE PRECISION DLAMCH, DLANGE
- EXTERNAL DLAMCH, DLANGE
- * ..
- * .. External Subroutines ..
- EXTERNAL DLACPY, DLANV2, DLARFG, DLARFX, DLARTG, DLASY2,
- $ DROT
- * ..
- * .. Intrinsic Functions ..
- INTRINSIC ABS, MAX
- * ..
- * .. Executable Statements ..
- *
- INFO = 0
- *
- * Quick return if possible
- *
- IF( N.EQ.0 .OR. N1.EQ.0 .OR. N2.EQ.0 )
- $ RETURN
- IF( J1+N1.GT.N )
- $ RETURN
- *
- J2 = J1 + 1
- J3 = J1 + 2
- J4 = J1 + 3
- *
- IF( N1.EQ.1 .AND. N2.EQ.1 ) THEN
- *
- * Swap two 1-by-1 blocks.
- *
- T11 = T( J1, J1 )
- T22 = T( J2, J2 )
- *
- * Determine the transformation to perform the interchange.
- *
- CALL DLARTG( T( J1, J2 ), T22-T11, CS, SN, TEMP )
- *
- * Apply transformation to the matrix T.
- *
- IF( J3.LE.N )
- $ CALL DROT( N-J1-1, T( J1, J3 ), LDT, T( J2, J3 ), LDT, CS,
- $ SN )
- CALL DROT( J1-1, T( 1, J1 ), 1, T( 1, J2 ), 1, CS, SN )
- *
- T( J1, J1 ) = T22
- T( J2, J2 ) = T11
- *
- IF( WANTQ ) THEN
- *
- * Accumulate transformation in the matrix Q.
- *
- CALL DROT( N, Q( 1, J1 ), 1, Q( 1, J2 ), 1, CS, SN )
- END IF
- *
- ELSE
- *
- * Swapping involves at least one 2-by-2 block.
- *
- * Copy the diagonal block of order N1+N2 to the local array D
- * and compute its norm.
- *
- ND = N1 + N2
- CALL DLACPY( 'Full', ND, ND, T( J1, J1 ), LDT, D, LDD )
- DNORM = DLANGE( 'Max', ND, ND, D, LDD, WORK )
- *
- * Compute machine-dependent threshold for test for accepting
- * swap.
- *
- EPS = DLAMCH( 'P' )
- SMLNUM = DLAMCH( 'S' ) / EPS
- THRESH = MAX( TEN*EPS*DNORM, SMLNUM )
- *
- * Solve T11*X - X*T22 = scale*T12 for X.
- *
- CALL DLASY2( .FALSE., .FALSE., -1, N1, N2, D, LDD,
- $ D( N1+1, N1+1 ), LDD, D( 1, N1+1 ), LDD, SCALE, X,
- $ LDX, XNORM, IERR )
- *
- * Swap the adjacent diagonal blocks.
- *
- K = N1 + N1 + N2 - 3
- GO TO ( 10, 20, 30 )K
- *
- 10 CONTINUE
- *
- * N1 = 1, N2 = 2: generate elementary reflector H so that:
- *
- * ( scale, X11, X12 ) H = ( 0, 0, * )
- *
- U( 1 ) = SCALE
- U( 2 ) = X( 1, 1 )
- U( 3 ) = X( 1, 2 )
- CALL DLARFG( 3, U( 3 ), U, 1, TAU )
- U( 3 ) = ONE
- T11 = T( J1, J1 )
- *
- * Perform swap provisionally on diagonal block in D.
- *
- CALL DLARFX( 'L', 3, 3, U, TAU, D, LDD, WORK )
- CALL DLARFX( 'R', 3, 3, U, TAU, D, LDD, WORK )
- *
- * Test whether to reject swap.
- *
- IF( MAX( ABS( D( 3, 1 ) ), ABS( D( 3, 2 ) ), ABS( D( 3,
- $ 3 )-T11 ) ).GT.THRESH )GO TO 50
- *
- * Accept swap: apply transformation to the entire matrix T.
- *
- CALL DLARFX( 'L', 3, N-J1+1, U, TAU, T( J1, J1 ), LDT, WORK )
- CALL DLARFX( 'R', J2, 3, U, TAU, T( 1, J1 ), LDT, WORK )
- *
- T( J3, J1 ) = ZERO
- T( J3, J2 ) = ZERO
- T( J3, J3 ) = T11
- *
- IF( WANTQ ) THEN
- *
- * Accumulate transformation in the matrix Q.
- *
- CALL DLARFX( 'R', N, 3, U, TAU, Q( 1, J1 ), LDQ, WORK )
- END IF
- GO TO 40
- *
- 20 CONTINUE
- *
- * N1 = 2, N2 = 1: generate elementary reflector H so that:
- *
- * H ( -X11 ) = ( * )
- * ( -X21 ) = ( 0 )
- * ( scale ) = ( 0 )
- *
- U( 1 ) = -X( 1, 1 )
- U( 2 ) = -X( 2, 1 )
- U( 3 ) = SCALE
- CALL DLARFG( 3, U( 1 ), U( 2 ), 1, TAU )
- U( 1 ) = ONE
- T33 = T( J3, J3 )
- *
- * Perform swap provisionally on diagonal block in D.
- *
- CALL DLARFX( 'L', 3, 3, U, TAU, D, LDD, WORK )
- CALL DLARFX( 'R', 3, 3, U, TAU, D, LDD, WORK )
- *
- * Test whether to reject swap.
- *
- IF( MAX( ABS( D( 2, 1 ) ), ABS( D( 3, 1 ) ), ABS( D( 1,
- $ 1 )-T33 ) ).GT.THRESH )GO TO 50
- *
- * Accept swap: apply transformation to the entire matrix T.
- *
- CALL DLARFX( 'R', J3, 3, U, TAU, T( 1, J1 ), LDT, WORK )
- CALL DLARFX( 'L', 3, N-J1, U, TAU, T( J1, J2 ), LDT, WORK )
- *
- T( J1, J1 ) = T33
- T( J2, J1 ) = ZERO
- T( J3, J1 ) = ZERO
- *
- IF( WANTQ ) THEN
- *
- * Accumulate transformation in the matrix Q.
- *
- CALL DLARFX( 'R', N, 3, U, TAU, Q( 1, J1 ), LDQ, WORK )
- END IF
- GO TO 40
- *
- 30 CONTINUE
- *
- * N1 = 2, N2 = 2: generate elementary reflectors H(1) and H(2) so
- * that:
- *
- * H(2) H(1) ( -X11 -X12 ) = ( * * )
- * ( -X21 -X22 ) ( 0 * )
- * ( scale 0 ) ( 0 0 )
- * ( 0 scale ) ( 0 0 )
- *
- U1( 1 ) = -X( 1, 1 )
- U1( 2 ) = -X( 2, 1 )
- U1( 3 ) = SCALE
- CALL DLARFG( 3, U1( 1 ), U1( 2 ), 1, TAU1 )
- U1( 1 ) = ONE
- *
- TEMP = -TAU1*( X( 1, 2 )+U1( 2 )*X( 2, 2 ) )
- U2( 1 ) = -TEMP*U1( 2 ) - X( 2, 2 )
- U2( 2 ) = -TEMP*U1( 3 )
- U2( 3 ) = SCALE
- CALL DLARFG( 3, U2( 1 ), U2( 2 ), 1, TAU2 )
- U2( 1 ) = ONE
- *
- * Perform swap provisionally on diagonal block in D.
- *
- CALL DLARFX( 'L', 3, 4, U1, TAU1, D, LDD, WORK )
- CALL DLARFX( 'R', 4, 3, U1, TAU1, D, LDD, WORK )
- CALL DLARFX( 'L', 3, 4, U2, TAU2, D( 2, 1 ), LDD, WORK )
- CALL DLARFX( 'R', 4, 3, U2, TAU2, D( 1, 2 ), LDD, WORK )
- *
- * Test whether to reject swap.
- *
- IF( MAX( ABS( D( 3, 1 ) ), ABS( D( 3, 2 ) ), ABS( D( 4, 1 ) ),
- $ ABS( D( 4, 2 ) ) ).GT.THRESH )GO TO 50
- *
- * Accept swap: apply transformation to the entire matrix T.
- *
- CALL DLARFX( 'L', 3, N-J1+1, U1, TAU1, T( J1, J1 ), LDT, WORK )
- CALL DLARFX( 'R', J4, 3, U1, TAU1, T( 1, J1 ), LDT, WORK )
- CALL DLARFX( 'L', 3, N-J1+1, U2, TAU2, T( J2, J1 ), LDT, WORK )
- CALL DLARFX( 'R', J4, 3, U2, TAU2, T( 1, J2 ), LDT, WORK )
- *
- T( J3, J1 ) = ZERO
- T( J3, J2 ) = ZERO
- T( J4, J1 ) = ZERO
- T( J4, J2 ) = ZERO
- *
- IF( WANTQ ) THEN
- *
- * Accumulate transformation in the matrix Q.
- *
- CALL DLARFX( 'R', N, 3, U1, TAU1, Q( 1, J1 ), LDQ, WORK )
- CALL DLARFX( 'R', N, 3, U2, TAU2, Q( 1, J2 ), LDQ, WORK )
- END IF
- *
- 40 CONTINUE
- *
- IF( N2.EQ.2 ) THEN
- *
- * Standardize new 2-by-2 block T11
- *
- CALL DLANV2( T( J1, J1 ), T( J1, J2 ), T( J2, J1 ),
- $ T( J2, J2 ), WR1, WI1, WR2, WI2, CS, SN )
- CALL DROT( N-J1-1, T( J1, J1+2 ), LDT, T( J2, J1+2 ), LDT,
- $ CS, SN )
- CALL DROT( J1-1, T( 1, J1 ), 1, T( 1, J2 ), 1, CS, SN )
- IF( WANTQ )
- $ CALL DROT( N, Q( 1, J1 ), 1, Q( 1, J2 ), 1, CS, SN )
- END IF
- *
- IF( N1.EQ.2 ) THEN
- *
- * Standardize new 2-by-2 block T22
- *
- J3 = J1 + N2
- J4 = J3 + 1
- CALL DLANV2( T( J3, J3 ), T( J3, J4 ), T( J4, J3 ),
- $ T( J4, J4 ), WR1, WI1, WR2, WI2, CS, SN )
- IF( J3+2.LE.N )
- $ CALL DROT( N-J3-1, T( J3, J3+2 ), LDT, T( J4, J3+2 ),
- $ LDT, CS, SN )
- CALL DROT( J3-1, T( 1, J3 ), 1, T( 1, J4 ), 1, CS, SN )
- IF( WANTQ )
- $ CALL DROT( N, Q( 1, J3 ), 1, Q( 1, J4 ), 1, CS, SN )
- END IF
- *
- END IF
- RETURN
- *
- * Exit with INFO = 1 if swap was rejected.
- *
- 50 CONTINUE
- INFO = 1
- RETURN
- *
- * End of DLAEXC
- *
- END
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