CXML
CGEGV (3lapack)
compute for a pair of N-by-N complex nonsymmetric matrices A and B,
the generalized eigenvalues (alpha, beta), and optionally,
SYNOPSIS
SUBROUTINE CGEGV( JOBVL, JOBVR, N, A, LDA, B, LDB, ALPHA, BETA, VL, LDVL,
VR, LDVR, WORK, LWORK, RWORK, INFO )
CHARACTER JOBVL, JOBVR
INTEGER INFO, LDA, LDB, LDVL, LDVR, LWORK, N
REAL RWORK( * )
COMPLEX A( LDA, * ), ALPHA( * ), B( LDB, * ), BETA( * ), VL(
LDVL, * ), VR( LDVR, * ), WORK( * )
PURPOSE
CGEGV computes for a pair of N-by-N complex nonsymmetric matrices A and B,
the generalized eigenvalues (alpha, beta), and optionally, the left and/or
right generalized eigenvectors (VL and VR).
A generalized eigenvalue for a pair of matrices (A,B) is, roughly speaking,
a scalar w or a ratio alpha/beta = w, such that A - w*B is singular. It
is usually represented as the pair (alpha,beta), as there is a reasonable
interpretation for beta=0, and even for both being zero. A good beginning
reference is the book, "Matrix Computations", by G. Golub & C. van Loan
(Johns Hopkins U. Press)
A right generalized eigenvector corresponding to a generalized eigenvalue
w for a pair of matrices (A,B) is a vector r such that (A - w B) r = 0
. A left generalized eigenvector is a vector l such that l**H * (A - w B)
= 0, where l**H is the
conjugate-transpose of l.
Note: this routine performs "full balancing" on A and B -- see "Further
Details", below.
ARGUMENTS
JOBVL (input) CHARACTER*1
= 'N': do not compute the left generalized eigenvectors;
= 'V': compute the left generalized eigenvectors.
JOBVR (input) CHARACTER*1
= 'N': do not compute the right generalized eigenvectors;
= 'V': compute the right generalized eigenvectors.
N (input) INTEGER
The order of the matrices A, B, VL, and VR. N >= 0.
A (input/output) COMPLEX array, dimension (LDA, N)
On entry, the first of the pair of matrices whose generalized
eigenvalues and (optionally) generalized eigenvectors are to be
computed. On exit, the contents will have been destroyed. (For a
description of the contents of A on exit, see "Further Details",
below.)
LDA (input) INTEGER
The leading dimension of A. LDA >= max(1,N).
B (input/output) COMPLEX array, dimension (LDB, N)
On entry, the second of the pair of matrices whose generalized
eigenvalues and (optionally) generalized eigenvectors are to be
computed. On exit, the contents will have been destroyed. (For a
description of the contents of B on exit, see "Further Details",
below.)
LDB (input) INTEGER
The leading dimension of B. LDB >= max(1,N).
ALPHA (output) COMPLEX array, dimension (N)
BETA (output) COMPLEX array, dimension (N) On exit,
ALPHA(j)/BETA(j), j=1,...,N, will be the generalized eigenvalues.
Note: the quotients ALPHA(j)/BETA(j) may easily over- or underflow,
and BETA(j) may even be zero. Thus, the user should avoid naively
computing the ratio alpha/beta. However, ALPHA will be always less
than and usually comparable with norm(A) in magnitude, and BETA
always less than and usually comparable with norm(B).
VL (output) COMPLEX array, dimension (LDVL,N)
If JOBVL = 'V', the left generalized eigenvectors. (See "Purpose",
above.) Each eigenvector will be scaled so the largest component
will have abs(real part) + abs(imag. part) = 1, *except* that for
eigenvalues with alpha=beta=0, a zero vector will be returned as
the corresponding eigenvector. Not referenced if JOBVL = 'N'.
LDVL (input) INTEGER
The leading dimension of the matrix VL. LDVL >= 1, and if JOBVL =
'V', LDVL >= N.
VR (output) COMPLEX array, dimension (LDVR,N)
If JOBVL = 'V', the right generalized eigenvectors. (See
"Purpose", above.) Each eigenvector will be scaled so the largest
component will have abs(real part) + abs(imag. part) = 1, *except*
that for eigenvalues with alpha=beta=0, a zero vector will be
returned as the corresponding eigenvector. Not referenced if JOBVR
= 'N'.
LDVR (input) INTEGER
The leading dimension of the matrix VR. LDVR >= 1, and if JOBVR =
'V', LDVR >= N.
WORK (workspace/output) COMPLEX array, dimension (LWORK)
On exit, if INFO = 0, WORK(1) returns the optimal LWORK.
LWORK (input) INTEGER
The dimension of the array WORK. LWORK >= max(1,2*N). For good
performance, LWORK must generally be larger. To compute the
optimal value of LWORK, call ILAENV to get blocksizes (for CGEQRF,
CUNMQR, and CUNGQR.) Then compute: NB -- MAX of the blocksizes
for CGEQRF, CUNMQR, and CUNGQR; The optimal LWORK is MAX( 2*N,
N*(NB+1) ).
RWORK (workspace/output) REAL array, dimension (8*N)
INFO (output) INTEGER
= 0: successful exit
< 0: if INFO = -i, the i-th argument had an illegal value.
=1,...,N: The QZ iteration failed. No eigenvectors have been
calculated, but ALPHA(j) and BETA(j) should be correct for
j=INFO+1,...,N. > N: errors that usually indicate LAPACK
problems:
=N+1: error return from CGGBAL
=N+2: error return from CGEQRF
=N+3: error return from CUNMQR
=N+4: error return from CUNGQR
=N+5: error return from CGGHRD
=N+6: error return from CHGEQZ (other than failed iteration) =N+7:
error return from CTGEVC
=N+8: error return from CGGBAK (computing VL)
=N+9: error return from CGGBAK (computing VR)
=N+10: error return from CLASCL (various calls)
FURTHER DETAILS
Balancing
---------
This driver calls CGGBAL to both permute and scale rows and columns of A
and B. The permutations PL and PR are chosen so that PL*A*PR and PL*B*R
will be upper triangular except for the diagonal blocks A(i:j,i:j) and
B(i:j,i:j), with i and j as close together as possible. The diagonal
scaling matrices DL and DR are chosen so that the pair DL*PL*A*PR*DR,
DL*PL*B*PR*DR have elements close to one (except for the elements that
start out zero.)
After the eigenvalues and eigenvectors of the balanced matrices have been
computed, CGGBAK transforms the eigenvectors back to what they would have
been (in perfect arithmetic) if they had not been balanced.
Contents of A and B on Exit
-------- -- - --- - -- ----
If any eigenvectors are computed (either JOBVL='V' or JOBVR='V' or both),
then on exit the arrays A and B will contain the complex Schur form[*] of
the "balanced" versions of A and B. If no eigenvectors are computed, then
only the diagonal blocks will be correct.
[*] In other words, upper triangular form.
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