LAPACK  3.6.1
LAPACK: Linear Algebra PACKage
zdrvhe.f
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1 *> \brief \b ZDRVHE
2 *
3 * =========== DOCUMENTATION ===========
4 *
5 * Online html documentation available at
6 * http://www.netlib.org/lapack/explore-html/
7 *
8 * Definition:
9 * ===========
10 *
11 * SUBROUTINE ZDRVHE( DOTYPE, NN, NVAL, NRHS, THRESH, TSTERR, NMAX,
12 * A, AFAC, AINV, B, X, XACT, WORK, RWORK, IWORK,
13 * NOUT )
14 *
15 * .. Scalar Arguments ..
16 * LOGICAL TSTERR
17 * INTEGER NMAX, NN, NOUT, NRHS
18 * DOUBLE PRECISION THRESH
19 * ..
20 * .. Array Arguments ..
21 * LOGICAL DOTYPE( * )
22 * INTEGER IWORK( * ), NVAL( * )
23 * DOUBLE PRECISION RWORK( * )
24 * COMPLEX*16 A( * ), AFAC( * ), AINV( * ), B( * ),
25 * $ WORK( * ), X( * ), XACT( * )
26 * ..
27 *
28 *
29 *> \par Purpose:
30 * =============
31 *>
32 *> \verbatim
33 *>
34 *> ZDRVHE tests the driver routines ZHESV and -SVX.
35 *> \endverbatim
36 *
37 * Arguments:
38 * ==========
39 *
40 *> \param[in] DOTYPE
41 *> \verbatim
42 *> DOTYPE is LOGICAL array, dimension (NTYPES)
43 *> The matrix types to be used for testing. Matrices of type j
44 *> (for 1 <= j <= NTYPES) are used for testing if DOTYPE(j) =
45 *> .TRUE.; if DOTYPE(j) = .FALSE., then type j is not used.
46 *> \endverbatim
47 *>
48 *> \param[in] NN
49 *> \verbatim
50 *> NN is INTEGER
51 *> The number of values of N contained in the vector NVAL.
52 *> \endverbatim
53 *>
54 *> \param[in] NVAL
55 *> \verbatim
56 *> NVAL is INTEGER array, dimension (NN)
57 *> The values of the matrix dimension N.
58 *> \endverbatim
59 *>
60 *> \param[in] NRHS
61 *> \verbatim
62 *> NRHS is INTEGER
63 *> The number of right hand side vectors to be generated for
64 *> each linear system.
65 *> \endverbatim
66 *>
67 *> \param[in] THRESH
68 *> \verbatim
69 *> THRESH is DOUBLE PRECISION
70 *> The threshold value for the test ratios. A result is
71 *> included in the output file if RESULT >= THRESH. To have
72 *> every test ratio printed, use THRESH = 0.
73 *> \endverbatim
74 *>
75 *> \param[in] TSTERR
76 *> \verbatim
77 *> TSTERR is LOGICAL
78 *> Flag that indicates whether error exits are to be tested.
79 *> \endverbatim
80 *>
81 *> \param[in] NMAX
82 *> \verbatim
83 *> NMAX is INTEGER
84 *> The maximum value permitted for N, used in dimensioning the
85 *> work arrays.
86 *> \endverbatim
87 *>
88 *> \param[out] A
89 *> \verbatim
90 *> A is COMPLEX*16 array, dimension (NMAX*NMAX)
91 *> \endverbatim
92 *>
93 *> \param[out] AFAC
94 *> \verbatim
95 *> AFAC is COMPLEX*16 array, dimension (NMAX*NMAX)
96 *> \endverbatim
97 *>
98 *> \param[out] AINV
99 *> \verbatim
100 *> AINV is COMPLEX*16 array, dimension (NMAX*NMAX)
101 *> \endverbatim
102 *>
103 *> \param[out] B
104 *> \verbatim
105 *> B is COMPLEX*16 array, dimension (NMAX*NRHS)
106 *> \endverbatim
107 *>
108 *> \param[out] X
109 *> \verbatim
110 *> X is COMPLEX*16 array, dimension (NMAX*NRHS)
111 *> \endverbatim
112 *>
113 *> \param[out] XACT
114 *> \verbatim
115 *> XACT is COMPLEX*16 array, dimension (NMAX*NRHS)
116 *> \endverbatim
117 *>
118 *> \param[out] WORK
119 *> \verbatim
120 *> WORK is COMPLEX*16 array, dimension (NMAX*max(2,NRHS))
121 *> \endverbatim
122 *>
123 *> \param[out] RWORK
124 *> \verbatim
125 *> RWORK is DOUBLE PRECISION array, dimension (NMAX+2*NRHS)
126 *> \endverbatim
127 *>
128 *> \param[out] IWORK
129 *> \verbatim
130 *> IWORK is INTEGER array, dimension (NMAX)
131 *> \endverbatim
132 *>
133 *> \param[in] NOUT
134 *> \verbatim
135 *> NOUT is INTEGER
136 *> The unit number for output.
137 *> \endverbatim
138 *
139 * Authors:
140 * ========
141 *
142 *> \author Univ. of Tennessee
143 *> \author Univ. of California Berkeley
144 *> \author Univ. of Colorado Denver
145 *> \author NAG Ltd.
146 *
147 *> \date November 2013
148 *
149 *> \ingroup complex16_lin
150 *
151 * =====================================================================
152  SUBROUTINE zdrvhe( DOTYPE, NN, NVAL, NRHS, THRESH, TSTERR, NMAX,
153  $ a, afac, ainv, b, x, xact, work, rwork, iwork,
154  $ nout )
155 *
156 * -- LAPACK test routine (version 3.5.0) --
157 * -- LAPACK is a software package provided by Univ. of Tennessee, --
158 * -- Univ. of California Berkeley, Univ. of Colorado Denver and NAG Ltd..--
159 * November 2013
160 *
161 * .. Scalar Arguments ..
162  LOGICAL TSTERR
163  INTEGER NMAX, NN, NOUT, NRHS
164  DOUBLE PRECISION THRESH
165 * ..
166 * .. Array Arguments ..
167  LOGICAL DOTYPE( * )
168  INTEGER IWORK( * ), NVAL( * )
169  DOUBLE PRECISION RWORK( * )
170  COMPLEX*16 A( * ), AFAC( * ), AINV( * ), B( * ),
171  $ work( * ), x( * ), xact( * )
172 * ..
173 *
174 * =====================================================================
175 *
176 * .. Parameters ..
177  DOUBLE PRECISION ONE, ZERO
178  parameter ( one = 1.0d+0, zero = 0.0d+0 )
179  INTEGER NTYPES, NTESTS
180  parameter ( ntypes = 10, ntests = 6 )
181  INTEGER NFACT
182  parameter ( nfact = 2 )
183 * ..
184 * .. Local Scalars ..
185  LOGICAL ZEROT
186  CHARACTER DIST, FACT, TYPE, UPLO, XTYPE
187  CHARACTER*3 PATH
188  INTEGER I, I1, I2, IFACT, IMAT, IN, INFO, IOFF, IUPLO,
189  $ izero, j, k, k1, kl, ku, lda, lwork, mode, n,
190  $ nb, nbmin, nerrs, nfail, nimat, nrun, nt
191  DOUBLE PRECISION AINVNM, ANORM, CNDNUM, RCOND, RCONDC
192 * ..
193 * .. Local Arrays ..
194  CHARACTER FACTS( nfact ), UPLOS( 2 )
195  INTEGER ISEED( 4 ), ISEEDY( 4 )
196  DOUBLE PRECISION RESULT( ntests )
197 * ..
198 * .. External Functions ..
199  DOUBLE PRECISION DGET06, ZLANHE
200  EXTERNAL dget06, zlanhe
201 * ..
202 * .. External Subroutines ..
203  EXTERNAL aladhd, alaerh, alasvm, xlaenv, zerrvx, zget04,
204  $ zhesv, zhesvx, zhet01, zhetrf, zhetri2, zlacpy,
205  $ zlaipd, zlarhs, zlaset, zlatb4, zlatms, zpot02,
206  $ zpot05
207 * ..
208 * .. Scalars in Common ..
209  LOGICAL LERR, OK
210  CHARACTER*32 SRNAMT
211  INTEGER INFOT, NUNIT
212 * ..
213 * .. Common blocks ..
214  COMMON / infoc / infot, nunit, ok, lerr
215  COMMON / srnamc / srnamt
216 * ..
217 * .. Intrinsic Functions ..
218  INTRINSIC dcmplx, max, min
219 * ..
220 * .. Data statements ..
221  DATA iseedy / 1988, 1989, 1990, 1991 /
222  DATA uplos / 'U', 'L' / , facts / 'F', 'N' /
223 * ..
224 * .. Executable Statements ..
225 *
226 * Initialize constants and the random number seed.
227 *
228  path( 1: 1 ) = 'Zomplex precision'
229  path( 2: 3 ) = 'HE'
230  nrun = 0
231  nfail = 0
232  nerrs = 0
233  DO 10 i = 1, 4
234  iseed( i ) = iseedy( i )
235  10 CONTINUE
236  lwork = max( 2*nmax, nmax*nrhs )
237 *
238 * Test the error exits
239 *
240  IF( tsterr )
241  $ CALL zerrvx( path, nout )
242  infot = 0
243 *
244 * Set the block size and minimum block size for testing.
245 *
246  nb = 1
247  nbmin = 2
248  CALL xlaenv( 1, nb )
249  CALL xlaenv( 2, nbmin )
250 *
251 * Do for each value of N in NVAL
252 *
253  DO 180 in = 1, nn
254  n = nval( in )
255  lda = max( n, 1 )
256  xtype = 'N'
257  nimat = ntypes
258  IF( n.LE.0 )
259  $ nimat = 1
260 *
261  DO 170 imat = 1, nimat
262 *
263 * Do the tests only if DOTYPE( IMAT ) is true.
264 *
265  IF( .NOT.dotype( imat ) )
266  $ GO TO 170
267 *
268 * Skip types 3, 4, 5, or 6 if the matrix size is too small.
269 *
270  zerot = imat.GE.3 .AND. imat.LE.6
271  IF( zerot .AND. n.LT.imat-2 )
272  $ GO TO 170
273 *
274 * Do first for UPLO = 'U', then for UPLO = 'L'
275 *
276  DO 160 iuplo = 1, 2
277  uplo = uplos( iuplo )
278 *
279 * Set up parameters with ZLATB4 and generate a test matrix
280 * with ZLATMS.
281 *
282  CALL zlatb4( path, imat, n, n, TYPE, KL, KU, ANORM, MODE,
283  $ cndnum, dist )
284 *
285  srnamt = 'ZLATMS'
286  CALL zlatms( n, n, dist, iseed, TYPE, RWORK, MODE,
287  $ cndnum, anorm, kl, ku, uplo, a, lda, work,
288  $ info )
289 *
290 * Check error code from ZLATMS.
291 *
292  IF( info.NE.0 ) THEN
293  CALL alaerh( path, 'ZLATMS', info, 0, uplo, n, n, -1,
294  $ -1, -1, imat, nfail, nerrs, nout )
295  GO TO 160
296  END IF
297 *
298 * For types 3-6, zero one or more rows and columns of the
299 * matrix to test that INFO is returned correctly.
300 *
301  IF( zerot ) THEN
302  IF( imat.EQ.3 ) THEN
303  izero = 1
304  ELSE IF( imat.EQ.4 ) THEN
305  izero = n
306  ELSE
307  izero = n / 2 + 1
308  END IF
309 *
310  IF( imat.LT.6 ) THEN
311 *
312 * Set row and column IZERO to zero.
313 *
314  IF( iuplo.EQ.1 ) THEN
315  ioff = ( izero-1 )*lda
316  DO 20 i = 1, izero - 1
317  a( ioff+i ) = zero
318  20 CONTINUE
319  ioff = ioff + izero
320  DO 30 i = izero, n
321  a( ioff ) = zero
322  ioff = ioff + lda
323  30 CONTINUE
324  ELSE
325  ioff = izero
326  DO 40 i = 1, izero - 1
327  a( ioff ) = zero
328  ioff = ioff + lda
329  40 CONTINUE
330  ioff = ioff - izero
331  DO 50 i = izero, n
332  a( ioff+i ) = zero
333  50 CONTINUE
334  END IF
335  ELSE
336  ioff = 0
337  IF( iuplo.EQ.1 ) THEN
338 *
339 * Set the first IZERO rows and columns to zero.
340 *
341  DO 70 j = 1, n
342  i2 = min( j, izero )
343  DO 60 i = 1, i2
344  a( ioff+i ) = zero
345  60 CONTINUE
346  ioff = ioff + lda
347  70 CONTINUE
348  ELSE
349 *
350 * Set the last IZERO rows and columns to zero.
351 *
352  DO 90 j = 1, n
353  i1 = max( j, izero )
354  DO 80 i = i1, n
355  a( ioff+i ) = zero
356  80 CONTINUE
357  ioff = ioff + lda
358  90 CONTINUE
359  END IF
360  END IF
361  ELSE
362  izero = 0
363  END IF
364 *
365 * Set the imaginary part of the diagonals.
366 *
367  CALL zlaipd( n, a, lda+1, 0 )
368 *
369  DO 150 ifact = 1, nfact
370 *
371 * Do first for FACT = 'F', then for other values.
372 *
373  fact = facts( ifact )
374 *
375 * Compute the condition number for comparison with
376 * the value returned by ZHESVX.
377 *
378  IF( zerot ) THEN
379  IF( ifact.EQ.1 )
380  $ GO TO 150
381  rcondc = zero
382 *
383  ELSE IF( ifact.EQ.1 ) THEN
384 *
385 * Compute the 1-norm of A.
386 *
387  anorm = zlanhe( '1', uplo, n, a, lda, rwork )
388 *
389 * Factor the matrix A.
390 *
391  CALL zlacpy( uplo, n, n, a, lda, afac, lda )
392  CALL zhetrf( uplo, n, afac, lda, iwork, work,
393  $ lwork, info )
394 *
395 * Compute inv(A) and take its norm.
396 *
397  CALL zlacpy( uplo, n, n, afac, lda, ainv, lda )
398  lwork = (n+nb+1)*(nb+3)
399  CALL zhetri2( uplo, n, ainv, lda, iwork, work,
400  $ lwork, info )
401  ainvnm = zlanhe( '1', uplo, n, ainv, lda, rwork )
402 *
403 * Compute the 1-norm condition number of A.
404 *
405  IF( anorm.LE.zero .OR. ainvnm.LE.zero ) THEN
406  rcondc = one
407  ELSE
408  rcondc = ( one / anorm ) / ainvnm
409  END IF
410  END IF
411 *
412 * Form an exact solution and set the right hand side.
413 *
414  srnamt = 'ZLARHS'
415  CALL zlarhs( path, xtype, uplo, ' ', n, n, kl, ku,
416  $ nrhs, a, lda, xact, lda, b, lda, iseed,
417  $ info )
418  xtype = 'C'
419 *
420 * --- Test ZHESV ---
421 *
422  IF( ifact.EQ.2 ) THEN
423  CALL zlacpy( uplo, n, n, a, lda, afac, lda )
424  CALL zlacpy( 'Full', n, nrhs, b, lda, x, lda )
425 *
426 * Factor the matrix and solve the system using ZHESV.
427 *
428  srnamt = 'ZHESV '
429  CALL zhesv( uplo, n, nrhs, afac, lda, iwork, x,
430  $ lda, work, lwork, info )
431 *
432 * Adjust the expected value of INFO to account for
433 * pivoting.
434 *
435  k = izero
436  IF( k.GT.0 ) THEN
437  100 CONTINUE
438  IF( iwork( k ).LT.0 ) THEN
439  IF( iwork( k ).NE.-k ) THEN
440  k = -iwork( k )
441  GO TO 100
442  END IF
443  ELSE IF( iwork( k ).NE.k ) THEN
444  k = iwork( k )
445  GO TO 100
446  END IF
447  END IF
448 *
449 * Check error code from ZHESV .
450 *
451  IF( info.NE.k ) THEN
452  CALL alaerh( path, 'ZHESV ', info, k, uplo, n,
453  $ n, -1, -1, nrhs, imat, nfail,
454  $ nerrs, nout )
455  GO TO 120
456  ELSE IF( info.NE.0 ) THEN
457  GO TO 120
458  END IF
459 *
460 * Reconstruct matrix from factors and compute
461 * residual.
462 *
463  CALL zhet01( uplo, n, a, lda, afac, lda, iwork,
464  $ ainv, lda, rwork, result( 1 ) )
465 *
466 * Compute residual of the computed solution.
467 *
468  CALL zlacpy( 'Full', n, nrhs, b, lda, work, lda )
469  CALL zpot02( uplo, n, nrhs, a, lda, x, lda, work,
470  $ lda, rwork, result( 2 ) )
471 *
472 * Check solution from generated exact solution.
473 *
474  CALL zget04( n, nrhs, x, lda, xact, lda, rcondc,
475  $ result( 3 ) )
476  nt = 3
477 *
478 * Print information about the tests that did not pass
479 * the threshold.
480 *
481  DO 110 k = 1, nt
482  IF( result( k ).GE.thresh ) THEN
483  IF( nfail.EQ.0 .AND. nerrs.EQ.0 )
484  $ CALL aladhd( nout, path )
485  WRITE( nout, fmt = 9999 )'ZHESV ', uplo, n,
486  $ imat, k, result( k )
487  nfail = nfail + 1
488  END IF
489  110 CONTINUE
490  nrun = nrun + nt
491  120 CONTINUE
492  END IF
493 *
494 * --- Test ZHESVX ---
495 *
496  IF( ifact.EQ.2 )
497  $ CALL zlaset( uplo, n, n, dcmplx( zero ),
498  $ dcmplx( zero ), afac, lda )
499  CALL zlaset( 'Full', n, nrhs, dcmplx( zero ),
500  $ dcmplx( zero ), x, lda )
501 *
502 * Solve the system and compute the condition number and
503 * error bounds using ZHESVX.
504 *
505  srnamt = 'ZHESVX'
506  CALL zhesvx( fact, uplo, n, nrhs, a, lda, afac, lda,
507  $ iwork, b, lda, x, lda, rcond, rwork,
508  $ rwork( nrhs+1 ), work, lwork,
509  $ rwork( 2*nrhs+1 ), info )
510 *
511 * Adjust the expected value of INFO to account for
512 * pivoting.
513 *
514  k = izero
515  IF( k.GT.0 ) THEN
516  130 CONTINUE
517  IF( iwork( k ).LT.0 ) THEN
518  IF( iwork( k ).NE.-k ) THEN
519  k = -iwork( k )
520  GO TO 130
521  END IF
522  ELSE IF( iwork( k ).NE.k ) THEN
523  k = iwork( k )
524  GO TO 130
525  END IF
526  END IF
527 *
528 * Check the error code from ZHESVX.
529 *
530  IF( info.NE.k ) THEN
531  CALL alaerh( path, 'ZHESVX', info, k, fact // uplo,
532  $ n, n, -1, -1, nrhs, imat, nfail,
533  $ nerrs, nout )
534  GO TO 150
535  END IF
536 *
537  IF( info.EQ.0 ) THEN
538  IF( ifact.GE.2 ) THEN
539 *
540 * Reconstruct matrix from factors and compute
541 * residual.
542 *
543  CALL zhet01( uplo, n, a, lda, afac, lda, iwork,
544  $ ainv, lda, rwork( 2*nrhs+1 ),
545  $ result( 1 ) )
546  k1 = 1
547  ELSE
548  k1 = 2
549  END IF
550 *
551 * Compute residual of the computed solution.
552 *
553  CALL zlacpy( 'Full', n, nrhs, b, lda, work, lda )
554  CALL zpot02( uplo, n, nrhs, a, lda, x, lda, work,
555  $ lda, rwork( 2*nrhs+1 ), result( 2 ) )
556 *
557 * Check solution from generated exact solution.
558 *
559  CALL zget04( n, nrhs, x, lda, xact, lda, rcondc,
560  $ result( 3 ) )
561 *
562 * Check the error bounds from iterative refinement.
563 *
564  CALL zpot05( uplo, n, nrhs, a, lda, b, lda, x, lda,
565  $ xact, lda, rwork, rwork( nrhs+1 ),
566  $ result( 4 ) )
567  ELSE
568  k1 = 6
569  END IF
570 *
571 * Compare RCOND from ZHESVX with the computed value
572 * in RCONDC.
573 *
574  result( 6 ) = dget06( rcond, rcondc )
575 *
576 * Print information about the tests that did not pass
577 * the threshold.
578 *
579  DO 140 k = k1, 6
580  IF( result( k ).GE.thresh ) THEN
581  IF( nfail.EQ.0 .AND. nerrs.EQ.0 )
582  $ CALL aladhd( nout, path )
583  WRITE( nout, fmt = 9998 )'ZHESVX', fact, uplo,
584  $ n, imat, k, result( k )
585  nfail = nfail + 1
586  END IF
587  140 CONTINUE
588  nrun = nrun + 7 - k1
589 *
590  150 CONTINUE
591 *
592  160 CONTINUE
593  170 CONTINUE
594  180 CONTINUE
595 *
596 * Print a summary of the results.
597 *
598  CALL alasvm( path, nout, nfail, nrun, nerrs )
599 *
600  9999 FORMAT( 1x, a, ', UPLO=''', a1, ''', N =', i5, ', type ', i2,
601  $ ', test ', i2, ', ratio =', g12.5 )
602  9998 FORMAT( 1x, a, ', FACT=''', a1, ''', UPLO=''', a1, ''', N =', i5,
603  $ ', type ', i2, ', test ', i2, ', ratio =', g12.5 )
604  RETURN
605 *
606 * End of ZDRVHE
607 *
608  END
alasvm
subroutine alasvm(TYPE, NOUT, NFAIL, NRUN, NERRS)
ALASVM
Definition: alasvm.f:75
alaerh
subroutine alaerh(PATH, SUBNAM, INFO, INFOE, OPTS, M, N, KL, KU, N5, IMAT, NFAIL, NERRS, NOUT)
ALAERH
Definition: alaerh.f:149
zhetri2
subroutine zhetri2(UPLO, N, A, LDA, IPIV, WORK, LWORK, INFO)
ZHETRI2
Definition: zhetri2.f:129
zlacpy
subroutine zlacpy(UPLO, M, N, A, LDA, B, LDB)
ZLACPY copies all or part of one two-dimensional array to another.
Definition: zlacpy.f:105
zget04
subroutine zget04(N, NRHS, X, LDX, XACT, LDXACT, RCOND, RESID)
ZGET04
Definition: zget04.f:104
zpot02
subroutine zpot02(UPLO, N, NRHS, A, LDA, X, LDX, B, LDB, RWORK, RESID)
ZPOT02
Definition: zpot02.f:129
zlarhs
subroutine zlarhs(PATH, XTYPE, UPLO, TRANS, M, N, KL, KU, NRHS, A, LDA, X, LDX, B, LDB, ISEED, INFO)
ZLARHS
Definition: zlarhs.f:211
zhet01
subroutine zhet01(UPLO, N, A, LDA, AFAC, LDAFAC, IPIV, C, LDC, RWORK, RESID)
ZHET01
Definition: zhet01.f:128
zlaset
subroutine zlaset(UPLO, M, N, ALPHA, BETA, A, LDA)
ZLASET initializes the off-diagonal elements and the diagonal elements of a matrix to given values...
Definition: zlaset.f:108
xlaenv
subroutine xlaenv(ISPEC, NVALUE)
XLAENV
Definition: xlaenv.f:83
zlatb4
subroutine zlatb4(PATH, IMAT, M, N, TYPE, KL, KU, ANORM, MODE, CNDNUM, DIST)
ZLATB4
Definition: zlatb4.f:123
zhesv
subroutine zhesv(UPLO, N, NRHS, A, LDA, IPIV, B, LDB, WORK, LWORK, INFO)
ZHESV computes the solution to system of linear equations A * X = B for HE matrices ...
Definition: zhesv.f:173
zlaipd
subroutine zlaipd(N, A, INDA, VINDA)
ZLAIPD
Definition: zlaipd.f:85
aladhd
subroutine aladhd(IOUNIT, PATH)
ALADHD
Definition: aladhd.f:80
zhetrf
subroutine zhetrf(UPLO, N, A, LDA, IPIV, WORK, LWORK, INFO)
ZHETRF
Definition: zhetrf.f:179
zerrvx
subroutine zerrvx(PATH, NUNIT)
ZERRVX
Definition: zerrvx.f:57
zhesvx
subroutine zhesvx(FACT, UPLO, N, NRHS, A, LDA, AF, LDAF, IPIV, B, LDB, X, LDX, RCOND, FERR, BERR, WORK, LWORK, RWORK, INFO)
ZHESVX computes the solution to system of linear equations A * X = B for HE matrices ...
Definition: zhesvx.f:287
zdrvhe
subroutine zdrvhe(DOTYPE, NN, NVAL, NRHS, THRESH, TSTERR, NMAX, A, AFAC, AINV, B, X, XACT, WORK, RWORK, IWORK, NOUT)
ZDRVHE
Definition: zdrvhe.f:155
zlatms
subroutine zlatms(M, N, DIST, ISEED, SYM, D, MODE, COND, DMAX, KL, KU, PACK, A, LDA, WORK, INFO)
ZLATMS
Definition: zlatms.f:334
zpot05
subroutine zpot05(UPLO, N, NRHS, A, LDA, B, LDB, X, LDX, XACT, LDXACT, FERR, BERR, RESLTS)
ZPOT05
Definition: zpot05.f:167