cdrgvx()

subroutine cdrgvx	(	integer	NSIZE,
		real	THRESH,
		integer	NIN,
		integer	NOUT,
		complex, dimension( lda, * )	A,
		integer	LDA,
		complex, dimension( lda, * )	B,
		complex, dimension( lda, * )	AI,
		complex, dimension( lda, * )	BI,
		complex, dimension( * )	ALPHA,
		complex, dimension( * )	BETA,
		complex, dimension( lda, * )	VL,
		complex, dimension( lda, * )	VR,
		integer	ILO,
		integer	IHI,
		real, dimension( * )	LSCALE,
		real, dimension( * )	RSCALE,
		real, dimension( * )	S,
		real, dimension( * )	STRU,
		real, dimension( * )	DIF,
		real, dimension( * )	DIFTRU,
		complex, dimension( * )	WORK,
		integer	LWORK,
		real, dimension( * )	RWORK,
		integer, dimension( * )	IWORK,
		integer	LIWORK,
		real, dimension( 4 )	RESULT,
		logical, dimension( * )	BWORK,
		integer	INFO
	)

CDRGVX

Purpose:

 CDRGVX checks the nonsymmetric generalized eigenvalue problem
 expert driver CGGEVX.

 CGGEVX computes the generalized eigenvalues, (optionally) the left
 and/or right eigenvectors, (optionally) computes a balancing
 transformation to improve the conditioning, and (optionally)
 reciprocal condition numbers for the eigenvalues and eigenvectors.

 When CDRGVX is called with NSIZE > 0, two types of test matrix pairs
 are generated by the subroutine SLATM6 and test the driver CGGEVX.
 The test matrices have the known exact condition numbers for
 eigenvalues. For the condition numbers of the eigenvectors
 corresponding the first and last eigenvalues are also know
 ``exactly'' (see CLATM6).
 For each matrix pair, the following tests will be performed and
 compared with the threshold THRESH.

 (1) max over all left eigenvalue/-vector pairs (beta/alpha,l) of

    | l**H * (beta A - alpha B) | / ( ulp max( |beta A|, |alpha B| ) )

     where l**H is the conjugate tranpose of l.

 (2) max over all right eigenvalue/-vector pairs (beta/alpha,r) of

       | (beta A - alpha B) r | / ( ulp max( |beta A|, |alpha B| ) )

 (3) The condition number S(i) of eigenvalues computed by CGGEVX
     differs less than a factor THRESH from the exact S(i) (see
     CLATM6).

 (4) DIF(i) computed by CTGSNA differs less than a factor 10*THRESH
     from the exact value (for the 1st and 5th vectors only).

 Test Matrices
 =============

 Two kinds of test matrix pairs
          (A, B) = inverse(YH) * (Da, Db) * inverse(X)
 are used in the tests:

 1: Da = 1+a   0    0    0    0    Db = 1   0   0   0   0
          0   2+a   0    0    0         0   1   0   0   0
          0    0   3+a   0    0         0   0   1   0   0
          0    0    0   4+a   0         0   0   0   1   0
          0    0    0    0   5+a ,      0   0   0   0   1 , and

 2: Da =  1   -1    0    0    0    Db = 1   0   0   0   0
          1    1    0    0    0         0   1   0   0   0
          0    0    1    0    0         0   0   1   0   0
          0    0    0   1+a  1+b        0   0   0   1   0
          0    0    0  -1-b  1+a ,      0   0   0   0   1 .

 In both cases the same inverse(YH) and inverse(X) are used to compute
 (A, B), giving the exact eigenvectors to (A,B) as (YH, X):

 YH:  =  1    0   -y    y   -y    X =  1   0  -x  -x   x
         0    1   -y    y   -y         0   1   x  -x  -x
         0    0    1    0    0         0   0   1   0   0
         0    0    0    1    0         0   0   0   1   0
         0    0    0    0    1,        0   0   0   0   1 , where

 a, b, x and y will have all values independently of each other from
 { sqrt(sqrt(ULP)),  0.1,  1,  10,  1/sqrt(sqrt(ULP)) }.

Parameters

[in]	NSIZE	NSIZE is INTEGER The number of sizes of matrices to use. NSIZE must be at least zero. If it is zero, no randomly generated matrices are tested, but any test matrices read from NIN will be tested. If it is not zero, then N = 5.
[in]	THRESH	THRESH is REAL A test will count as "failed" if the "error", computed as described above, exceeds THRESH. Note that the error is scaled to be O(1), so THRESH should be a reasonably small multiple of 1, e.g., 10 or 100. In particular, it should not depend on the precision (single vs. double) or the size of the matrix. It must be at least zero.
[in]	NIN	NIN is INTEGER The FORTRAN unit number for reading in the data file of problems to solve.
[in]	NOUT	NOUT is INTEGER The FORTRAN unit number for printing out error messages (e.g., if a routine returns IINFO not equal to 0.)
[out]	A	A is COMPLEX array, dimension (LDA, NSIZE) Used to hold the matrix whose eigenvalues are to be computed. On exit, A contains the last matrix actually used.
[in]	LDA	LDA is INTEGER The leading dimension of A, B, AI, BI, Ao, and Bo. It must be at least 1 and at least NSIZE.
[out]	B	B is COMPLEX array, dimension (LDA, NSIZE) Used to hold the matrix whose eigenvalues are to be computed. On exit, B contains the last matrix actually used.
[out]	AI	AI is COMPLEX array, dimension (LDA, NSIZE) Copy of A, modified by CGGEVX.
[out]	BI	BI is COMPLEX array, dimension (LDA, NSIZE) Copy of B, modified by CGGEVX.
[out]	ALPHA	ALPHA is COMPLEX array, dimension (NSIZE)
[out]	BETA	BETA is COMPLEX array, dimension (NSIZE) On exit, ALPHA/BETA are the eigenvalues.
[out]	VL	VL is COMPLEX array, dimension (LDA, NSIZE) VL holds the left eigenvectors computed by CGGEVX.
[out]	VR	VR is COMPLEX array, dimension (LDA, NSIZE) VR holds the right eigenvectors computed by CGGEVX.
[out]	ILO	ILO is INTEGER
[out]	IHI	IHI is INTEGER
[out]	LSCALE	LSCALE is REAL array, dimension (N)
[out]	RSCALE	RSCALE is REAL array, dimension (N)
[out]	S	S is REAL array, dimension (N)
[out]	STRU	STRU is REAL array, dimension (N)
[out]	DIF	DIF is REAL array, dimension (N)
[out]	DIFTRU	DIFTRU is REAL array, dimension (N)
[out]	WORK	WORK is COMPLEX array, dimension (LWORK)
[in]	LWORK	LWORK is INTEGER Leading dimension of WORK. LWORK >= 2*N*N + 2*N
[out]	RWORK	RWORK is REAL array, dimension (6*N)
[out]	IWORK	IWORK is INTEGER array, dimension (LIWORK)
[in]	LIWORK	LIWORK is INTEGER Leading dimension of IWORK. LIWORK >= N+2.
[out]	RESULT	RESULT is REAL array, dimension (4)
[out]	BWORK	BWORK is LOGICAL array, dimension (N)
[out]	INFO	INFO is INTEGER = 0: successful exit < 0: if INFO = -i, the i-th argument had an illegal value. > 0: A routine returned an error code.

Author

Univ. of Tennessee

Univ. of California Berkeley

Univ. of Colorado Denver

NAG Ltd.

Date

June 2016

Definition at line 300 of file cdrgvx.f.

*
*  -- LAPACK test 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
*
*     .. Scalar Arguments ..
      INTEGER            IHI, ILO, INFO, LDA, LIWORK, LWORK, NIN, NOUT,
     $                   NSIZE
      REAL               THRESH
*     ..
*     .. Array Arguments ..
      LOGICAL            BWORK( * )
      INTEGER            IWORK( * )
      REAL               DIF( * ), DIFTRU( * ), LSCALE( * ),
     $                   RESULT( 4 ), RSCALE( * ), RWORK( * ), S( * ),
     $                   STRU( * )
      COMPLEX            A( LDA, * ), AI( LDA, * ), ALPHA( * ),
     $                   B( LDA, * ), BETA( * ), BI( LDA, * ),
     $                   VL( LDA, * ), VR( LDA, * ), WORK( * )
*     ..
*
*  =====================================================================
*
*     .. Parameters ..
      REAL               ZERO, ONE, TEN, TNTH, HALF
      parameter( zero = 0.0e+0, one = 1.0e+0, ten = 1.0e+1,
     $                   tnth = 1.0e-1, half = 0.5e+0 )
*     ..
*     .. Local Scalars ..
      INTEGER            I, IPTYPE, IWA, IWB, IWX, IWY, J, LINFO,
     $                   MAXWRK, MINWRK, N, NERRS, NMAX, NPTKNT, NTESTT
      REAL               ABNORM, ANORM, BNORM, RATIO1, RATIO2, THRSH2,
     $                   ULP, ULPINV
*     ..
*     .. Local Arrays ..
      COMPLEX            WEIGHT( 5 )
*     ..
*     .. External Functions ..
      INTEGER            ILAENV
      REAL               CLANGE, SLAMCH
      EXTERNAL           ilaenv, clange, slamch
*     ..
*     .. External Subroutines ..
      EXTERNAL           alasvm, cget52, cggevx, clacpy, clatm6, xerbla
*     ..
*     .. Intrinsic Functions ..
      INTRINSIC          abs, cmplx, max, sqrt
*     ..
*     .. Executable Statements ..
*
*     Check for errors
*
      info = 0
*
      nmax = 5
*
      IF( nsize.LT.0 ) THEN
         info = -1
      ELSE IF( thresh.LT.zero ) THEN
         info = -2
      ELSE IF( nin.LE.0 ) THEN
         info = -3
      ELSE IF( nout.LE.0 ) THEN
         info = -4
      ELSE IF( lda.LT.1 .OR. lda.LT.nmax ) THEN
         info = -6
      ELSE IF( liwork.LT.nmax+2 ) THEN
         info = -26
      END IF
*
*     Compute workspace
*      (Note: Comments in the code beginning "Workspace:" describe the
*       minimal amount of workspace needed at that point in the code,
*       as well as the preferred amount for good performance.
*       NB refers to the optimal block size for the immediately
*       following subroutine, as returned by ILAENV.)
*
      minwrk = 1
      IF( info.EQ.0 .AND. lwork.GE.1 ) THEN
         minwrk = 2*nmax*( nmax+1 )
         maxwrk = nmax*( 1+ilaenv( 1, 'CGEQRF', ' ', nmax, 1, nmax,
     $            0 ) )
         maxwrk = max( maxwrk, 2*nmax*( nmax+1 ) )
         work( 1 ) = maxwrk
      END IF
*
      IF( lwork.LT.minwrk )
     $   info = -23
*
      IF( info.NE.0 ) THEN
         CALL xerbla( 'CDRGVX', -info )
         RETURN
      END IF
*
      n = 5
      ulp = slamch( 'P' )
      ulpinv = one / ulp
      thrsh2 = ten*thresh
      nerrs = 0
      nptknt = 0
      ntestt = 0
*
      IF( nsize.EQ.0 )
     $   GO TO 90
*
*     Parameters used for generating test matrices.
*
      weight( 1 ) = cmplx( tnth, zero )
      weight( 2 ) = cmplx( half, zero )
      weight( 3 ) = one
      weight( 4 ) = one / weight( 2 )
      weight( 5 ) = one / weight( 1 )
*
      DO 80 iptype = 1, 2
         DO 70 iwa = 1, 5
            DO 60 iwb = 1, 5
               DO 50 iwx = 1, 5
                  DO 40 iwy = 1, 5
*
*                    generated a pair of test matrix
*
                     CALL clatm6( iptype, 5, a, lda, b, vr, lda, vl,
     $                            lda, weight( iwa ), weight( iwb ),
     $                            weight( iwx ), weight( iwy ), stru,
     $                            diftru )
*
*                    Compute eigenvalues/eigenvectors of (A, B).
*                    Compute eigenvalue/eigenvector condition numbers
*                    using computed eigenvectors.
*
                     CALL clacpy( 'F', n, n, a, lda, ai, lda )
                     CALL clacpy( 'F', n, n, b, lda, bi, lda )
*
                     CALL cggevx( 'N', 'V', 'V', 'B', n, ai, lda, bi,
     $                            lda, alpha, beta, vl, lda, vr, lda,
     $                            ilo, ihi, lscale, rscale, anorm,
     $                            bnorm, s, dif, work, lwork, rwork,
     $                            iwork, bwork, linfo )
                     IF( linfo.NE.0 ) THEN
                        WRITE( nout, fmt = 9999 )'CGGEVX', linfo, n,
     $                     iptype, iwa, iwb, iwx, iwy
                        GO TO 30
                     END IF
*
*                    Compute the norm(A, B)
*
                     CALL clacpy( 'Full', n, n, ai, lda, work, n )
                     CALL clacpy( 'Full', n, n, bi, lda, work( n*n+1 ),
     $                            n )
                     abnorm = clange( 'Fro', n, 2*n, work, n, rwork )
*
*                    Tests (1) and (2)
*
                     result( 1 ) = zero
                     CALL cget52( .true., n, a, lda, b, lda, vl, lda,
     $                            alpha, beta, work, rwork,
     $                            result( 1 ) )
                     IF( result( 2 ).GT.thresh ) THEN
                        WRITE( nout, fmt = 9998 )'Left', 'CGGEVX',
     $                     result( 2 ), n, iptype, iwa, iwb, iwx, iwy
                     END IF
*
                     result( 2 ) = zero
                     CALL cget52( .false., n, a, lda, b, lda, vr, lda,
     $                            alpha, beta, work, rwork,
     $                            result( 2 ) )
                     IF( result( 3 ).GT.thresh ) THEN
                        WRITE( nout, fmt = 9998 )'Right', 'CGGEVX',
     $                     result( 3 ), n, iptype, iwa, iwb, iwx, iwy
                     END IF
*
*                    Test (3)
*
                     result( 3 ) = zero
                     DO 10 i = 1, n
                        IF( s( i ).EQ.zero ) THEN
                           IF( stru( i ).GT.abnorm*ulp )
     $                        result( 3 ) = ulpinv
                        ELSE IF( stru( i ).EQ.zero ) THEN
                           IF( s( i ).GT.abnorm*ulp )
     $                        result( 3 ) = ulpinv
                        ELSE
                           rwork( i ) = max( abs( stru( i ) / s( i ) ),
     $                                  abs( s( i ) / stru( i ) ) )
                           result( 3 ) = max( result( 3 ), rwork( i ) )
                        END IF
   10                CONTINUE
*
*                    Test (4)
*
                     result( 4 ) = zero
                     IF( dif( 1 ).EQ.zero ) THEN
                        IF( diftru( 1 ).GT.abnorm*ulp )
     $                     result( 4 ) = ulpinv
                     ELSE IF( diftru( 1 ).EQ.zero ) THEN
                        IF( dif( 1 ).GT.abnorm*ulp )
     $                     result( 4 ) = ulpinv
                     ELSE IF( dif( 5 ).EQ.zero ) THEN
                        IF( diftru( 5 ).GT.abnorm*ulp )
     $                     result( 4 ) = ulpinv
                     ELSE IF( diftru( 5 ).EQ.zero ) THEN
                        IF( dif( 5 ).GT.abnorm*ulp )
     $                     result( 4 ) = ulpinv
                     ELSE
                        ratio1 = max( abs( diftru( 1 ) / dif( 1 ) ),
     $                           abs( dif( 1 ) / diftru( 1 ) ) )
                        ratio2 = max( abs( diftru( 5 ) / dif( 5 ) ),
     $                           abs( dif( 5 ) / diftru( 5 ) ) )
                        result( 4 ) = max( ratio1, ratio2 )
                     END IF
*
                     ntestt = ntestt + 4
*
*                    Print out tests which fail.
*
                     DO 20 j = 1, 4
                        IF( ( result( j ).GE.thrsh2 .AND. j.GE.4 ) .OR.
     $                      ( result( j ).GE.thresh .AND. j.LE.3 ) )
     $                       THEN
*
*                       If this is the first test to fail,
*                       print a header to the data file.
*
                           IF( nerrs.EQ.0 ) THEN
                              WRITE( nout, fmt = 9997 )'CXV'
*
*                          Print out messages for built-in examples
*
*                          Matrix types
*
                              WRITE( nout, fmt = 9995 )
                              WRITE( nout, fmt = 9994 )
                              WRITE( nout, fmt = 9993 )
*
*                          Tests performed
*
                              WRITE( nout, fmt = 9992 )'''',
     $                           'transpose', ''''
*
                           END IF
                           nerrs = nerrs + 1
                           IF( result( j ).LT.10000.0 ) THEN
                              WRITE( nout, fmt = 9991 )iptype, iwa,
     $                           iwb, iwx, iwy, j, result( j )
                           ELSE
                              WRITE( nout, fmt = 9990 )iptype, iwa,
     $                           iwb, iwx, iwy, j, result( j )
                           END IF
                        END IF
   20                CONTINUE
*
   30                CONTINUE
*
   40             CONTINUE
   50          CONTINUE
   60       CONTINUE
   70    CONTINUE
   80 CONTINUE
*
      GO TO 150
*
   90 CONTINUE
*
*     Read in data from file to check accuracy of condition estimation
*     Read input data until N=0
*
      READ( nin, fmt = *, END = 150 )n
      IF( n.EQ.0 )
     $   GO TO 150
      DO 100 i = 1, n
         READ( nin, fmt = * )( a( i, j ), j = 1, n )
  100 CONTINUE
      DO 110 i = 1, n
         READ( nin, fmt = * )( b( i, j ), j = 1, n )
  110 CONTINUE
      READ( nin, fmt = * )( stru( i ), i = 1, n )
      READ( nin, fmt = * )( diftru( i ), i = 1, n )
*
      nptknt = nptknt + 1
*
*     Compute eigenvalues/eigenvectors of (A, B).
*     Compute eigenvalue/eigenvector condition numbers
*     using computed eigenvectors.
*
      CALL clacpy( 'F', n, n, a, lda, ai, lda )
      CALL clacpy( 'F', n, n, b, lda, bi, lda )
*
      CALL cggevx( 'N', 'V', 'V', 'B', n, ai, lda, bi, lda, alpha, beta,
     $             vl, lda, vr, lda, ilo, ihi, lscale, rscale, anorm,
     $             bnorm, s, dif, work, lwork, rwork, iwork, bwork,
     $             linfo )
*
      IF( linfo.NE.0 ) THEN
         WRITE( nout, fmt = 9987 )'CGGEVX', linfo, n, nptknt
         GO TO 140
      END IF
*
*     Compute the norm(A, B)
*
      CALL clacpy( 'Full', n, n, ai, lda, work, n )
      CALL clacpy( 'Full', n, n, bi, lda, work( n*n+1 ), n )
      abnorm = clange( 'Fro', n, 2*n, work, n, rwork )
*
*     Tests (1) and (2)
*
      result( 1 ) = zero
      CALL cget52( .true., n, a, lda, b, lda, vl, lda, alpha, beta,
     $             work, rwork, result( 1 ) )
      IF( result( 2 ).GT.thresh ) THEN
         WRITE( nout, fmt = 9986 )'Left', 'CGGEVX', result( 2 ), n,
     $      nptknt
      END IF
*
      result( 2 ) = zero
      CALL cget52( .false., n, a, lda, b, lda, vr, lda, alpha, beta,
     $             work, rwork, result( 2 ) )
      IF( result( 3 ).GT.thresh ) THEN
         WRITE( nout, fmt = 9986 )'Right', 'CGGEVX', result( 3 ), n,
     $      nptknt
      END IF
*
*     Test (3)
*
      result( 3 ) = zero
      DO 120 i = 1, n
         IF( s( i ).EQ.zero ) THEN
            IF( stru( i ).GT.abnorm*ulp )
     $         result( 3 ) = ulpinv
         ELSE IF( stru( i ).EQ.zero ) THEN
            IF( s( i ).GT.abnorm*ulp )
     $         result( 3 ) = ulpinv
         ELSE
            rwork( i ) = max( abs( stru( i ) / s( i ) ),
     $                   abs( s( i ) / stru( i ) ) )
            result( 3 ) = max( result( 3 ), rwork( i ) )
         END IF
  120 CONTINUE
*
*     Test (4)
*
      result( 4 ) = zero
      IF( dif( 1 ).EQ.zero ) THEN
         IF( diftru( 1 ).GT.abnorm*ulp )
     $      result( 4 ) = ulpinv
      ELSE IF( diftru( 1 ).EQ.zero ) THEN
         IF( dif( 1 ).GT.abnorm*ulp )
     $      result( 4 ) = ulpinv
      ELSE IF( dif( 5 ).EQ.zero ) THEN
         IF( diftru( 5 ).GT.abnorm*ulp )
     $      result( 4 ) = ulpinv
      ELSE IF( diftru( 5 ).EQ.zero ) THEN
         IF( dif( 5 ).GT.abnorm*ulp )
     $      result( 4 ) = ulpinv
      ELSE
         ratio1 = max( abs( diftru( 1 ) / dif( 1 ) ),
     $            abs( dif( 1 ) / diftru( 1 ) ) )
         ratio2 = max( abs( diftru( 5 ) / dif( 5 ) ),
     $            abs( dif( 5 ) / diftru( 5 ) ) )
         result( 4 ) = max( ratio1, ratio2 )
      END IF
*
      ntestt = ntestt + 4
*
*     Print out tests which fail.
*
      DO 130 j = 1, 4
         IF( result( j ).GE.thrsh2 ) THEN
*
*           If this is the first test to fail,
*           print a header to the data file.
*
            IF( nerrs.EQ.0 ) THEN
               WRITE( nout, fmt = 9997 )'CXV'
*
*              Print out messages for built-in examples
*
*              Matrix types
*
               WRITE( nout, fmt = 9996 )
*
*              Tests performed
*
               WRITE( nout, fmt = 9992 )'''', 'transpose', ''''
*
            END IF
            nerrs = nerrs + 1
            IF( result( j ).LT.10000.0 ) THEN
               WRITE( nout, fmt = 9989 )nptknt, n, j, result( j )
            ELSE
               WRITE( nout, fmt = 9988 )nptknt, n, j, result( j )
            END IF
         END IF
  130 CONTINUE
*
  140 CONTINUE
*
      GO TO 90
  150 CONTINUE
*
*     Summary
*
      CALL alasvm( 'CXV', nout, nerrs, ntestt, 0 )
*
      work( 1 ) = maxwrk
*
      RETURN
*
 9999 FORMAT( ' CDRGVX: ', a, ' returned INFO=', i6, '.', / 9x, 'N=',
     $      i6, ', JTYPE=', i6, ')' )
*
 9998 FORMAT( ' CDRGVX: ', a, ' Eigenvectors from ', a, ' incorrectly ',
     $      'normalized.', / ' Bits of error=', 0p, g10.3, ',', 9x,
     $      'N=', i6, ', JTYPE=', i6, ', IWA=', i5, ', IWB=', i5,
     $      ', IWX=', i5, ', IWY=', i5 )
*
 9997 FORMAT( / 1x, a3, ' -- Complex Expert Eigenvalue/vector',
     $      ' problem driver' )
*
 9996 FORMAT( 'Input Example' )
*
 9995 FORMAT( ' Matrix types: ', / )
*
 9994 FORMAT( ' TYPE 1: Da is diagonal, Db is identity, ',
     $      / '     A = Y^(-H) Da X^(-1), B = Y^(-H) Db X^(-1) ',
     $      / '     YH and X are left and right eigenvectors. ', / )
*
 9993 FORMAT( ' TYPE 2: Da is quasi-diagonal, Db is identity, ',
     $      / '     A = Y^(-H) Da X^(-1), B = Y^(-H) Db X^(-1) ',
     $      / '     YH and X are left and right eigenvectors. ', / )
*
 9992 FORMAT( / ' Tests performed:  ', / 4x,
     $      ' a is alpha, b is beta, l is a left eigenvector, ', / 4x,
     $      ' r is a right eigenvector and ', a, ' means ', a, '.',
     $      / ' 1 = max | ( b A - a B )', a, ' l | / const.',
     $      / ' 2 = max | ( b A - a B ) r | / const.',
     $      / ' 3 = max ( Sest/Stru, Stru/Sest ) ',
     $      ' over all eigenvalues', /
     $      ' 4 = max( DIFest/DIFtru, DIFtru/DIFest ) ',
     $      ' over the 1st and 5th eigenvectors', / )
*
 9991 FORMAT( ' Type=', i2, ',', ' IWA=', i2, ', IWB=', i2, ', IWX=',
     $      i2, ', IWY=', i2, ', result ', i2, ' is', 0p, f8.2 )
*
 9990 FORMAT( ' Type=', i2, ',', ' IWA=', i2, ', IWB=', i2, ', IWX=',
     $      i2, ', IWY=', i2, ', result ', i2, ' is', 1p, e10.3 )
*
 9989 FORMAT( ' Input example #', i2, ', matrix order=', i4, ',',
     $      ' result ', i2, ' is', 0p, f8.2 )
*
 9988 FORMAT( ' Input example #', i2, ', matrix order=', i4, ',',
     $      ' result ', i2, ' is', 1p, e10.3 )
*
 9987 FORMAT( ' CDRGVX: ', a, ' returned INFO=', i6, '.', / 9x, 'N=',
     $      i6, ', Input example #', i2, ')' )
*
 9986 FORMAT( ' CDRGVX: ', a, ' Eigenvectors from ', a, ' incorrectly ',
     $      'normalized.', / ' Bits of error=', 0p, g10.3, ',', 9x,
     $      'N=', i6, ', Input Example #', i2, ')' )
*
*     End of CDRGVX
*

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