LAPACK  3.8.0
LAPACK: Linear Algebra PACKage
clavsy.f
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1 *> \brief \b CLAVSY
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 CLAVSY( UPLO, TRANS, DIAG, N, NRHS, A, LDA, IPIV, B,
12 * LDB, INFO )
13 *
14 * .. Scalar Arguments ..
15 * CHARACTER DIAG, TRANS, UPLO
16 * INTEGER INFO, LDA, LDB, N, NRHS
17 * ..
18 * .. Array Arguments ..
19 * INTEGER IPIV( * )
20 * COMPLEX A( LDA, * ), B( LDB, * )
21 * ..
22 *
23 *
24 *> \par Purpose:
25 * =============
26 *>
27 *> \verbatim
28 *>
29 *> CLAVSY performs one of the matrix-vector operations
30 *> x := A*x or x := A'*x,
31 *> where x is an N element vector and A is one of the factors
32 *> from the block U*D*U' or L*D*L' factorization computed by CSYTRF.
33 *>
34 *> If TRANS = 'N', multiplies by U or U * D (or L or L * D)
35 *> If TRANS = 'T', multiplies by U' or D * U' (or L' or D * L')
36 *> \endverbatim
37 *
38 * Arguments:
39 * ==========
40 *
41 *> \param[in] UPLO
42 *> \verbatim
43 *> UPLO is CHARACTER*1
44 *> Specifies whether the factor stored in A is upper or lower
45 *> triangular.
46 *> = 'U': Upper triangular
47 *> = 'L': Lower triangular
48 *> \endverbatim
49 *>
50 *> \param[in] TRANS
51 *> \verbatim
52 *> TRANS is CHARACTER*1
53 *> Specifies the operation to be performed:
54 *> = 'N': x := A*x
55 *> = 'T': x := A'*x
56 *> \endverbatim
57 *>
58 *> \param[in] DIAG
59 *> \verbatim
60 *> DIAG is CHARACTER*1
61 *> Specifies whether or not the diagonal blocks are unit
62 *> matrices. If the diagonal blocks are assumed to be unit,
63 *> then A = U or A = L, otherwise A = U*D or A = L*D.
64 *> = 'U': Diagonal blocks are assumed to be unit matrices.
65 *> = 'N': Diagonal blocks are assumed to be non-unit matrices.
66 *> \endverbatim
67 *>
68 *> \param[in] N
69 *> \verbatim
70 *> N is INTEGER
71 *> The number of rows and columns of the matrix A. N >= 0.
72 *> \endverbatim
73 *>
74 *> \param[in] NRHS
75 *> \verbatim
76 *> NRHS is INTEGER
77 *> The number of right hand sides, i.e., the number of vectors
78 *> x to be multiplied by A. NRHS >= 0.
79 *> \endverbatim
80 *>
81 *> \param[in] A
82 *> \verbatim
83 *> A is COMPLEX array, dimension (LDA,N)
84 *> The block diagonal matrix D and the multipliers used to
85 *> obtain the factor U or L as computed by CSYTRF.
86 *> Stored as a 2-D triangular matrix.
87 *> \endverbatim
88 *>
89 *> \param[in] LDA
90 *> \verbatim
91 *> LDA is INTEGER
92 *> The leading dimension of the array A. LDA >= max(1,N).
93 *> \endverbatim
94 *>
95 *> \param[in] IPIV
96 *> \verbatim
97 *> IPIV is INTEGER array, dimension (N)
98 *> Details of the interchanges and the block structure of D,
99 *> as determined by CSYTRF.
100 *>
101 *> If UPLO = 'U':
102 *> If IPIV(k) > 0, then rows and columns k and IPIV(k)
103 *> were interchanged and D(k,k) is a 1-by-1 diagonal block.
104 *> (If IPIV( k ) = k, no interchange was done).
105 *>
106 *> If IPIV(k) = IPIV(k-1) < 0, then rows and
107 *> columns k-1 and -IPIV(k) were interchanged,
108 *> D(k-1:k,k-1:k) is a 2-by-2 diagonal block.
109 *>
110 *> If UPLO = 'L':
111 *> If IPIV(k) > 0, then rows and columns k and IPIV(k)
112 *> were interchanged and D(k,k) is a 1-by-1 diagonal block.
113 *> (If IPIV( k ) = k, no interchange was done).
114 *>
115 *> If IPIV(k) = IPIV(k+1) < 0, then rows and
116 *> columns k+1 and -IPIV(k) were interchanged,
117 *> D(k:k+1,k:k+1) is a 2-by-2 diagonal block.
118 *> \endverbatim
119 *>
120 *> \param[in,out] B
121 *> \verbatim
122 *> B is COMPLEX array, dimension (LDB,NRHS)
123 *> On entry, B contains NRHS vectors of length N.
124 *> On exit, B is overwritten with the product A * B.
125 *> \endverbatim
126 *>
127 *> \param[in] LDB
128 *> \verbatim
129 *> LDB is INTEGER
130 *> The leading dimension of the array B. LDB >= max(1,N).
131 *> \endverbatim
132 *>
133 *> \param[out] INFO
134 *> \verbatim
135 *> INFO is INTEGER
136 *> = 0: successful exit
137 *> < 0: if INFO = -k, the k-th argument had an illegal value
138 *> \endverbatim
139 *
140 * Authors:
141 * ========
142 *
143 *> \author Univ. of Tennessee
144 *> \author Univ. of California Berkeley
145 *> \author Univ. of Colorado Denver
146 *> \author NAG Ltd.
147 *
148 *> \date November 2013
149 *
150 *> \ingroup complex_lin
151 *
152 * =====================================================================
153  SUBROUTINE clavsy( UPLO, TRANS, DIAG, N, NRHS, A, LDA, IPIV, B,
154  $ LDB, INFO )
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  CHARACTER DIAG, TRANS, UPLO
163  INTEGER INFO, LDA, LDB, N, NRHS
164 * ..
165 * .. Array Arguments ..
166  INTEGER IPIV( * )
167  COMPLEX A( lda, * ), B( ldb, * )
168 * ..
169 *
170 * =====================================================================
171 *
172 * .. Parameters ..
173  COMPLEX CONE
174  parameter( cone = ( 1.0e+0, 0.0e+0 ) )
175 * ..
176 * .. Local Scalars ..
177  LOGICAL NOUNIT
178  INTEGER J, K, KP
179  COMPLEX D11, D12, D21, D22, T1, T2
180 * ..
181 * .. External Functions ..
182  LOGICAL LSAME
183  EXTERNAL lsame
184 * ..
185 * .. External Subroutines ..
186  EXTERNAL cgemv, cgeru, cscal, cswap, xerbla
187 * ..
188 * .. Intrinsic Functions ..
189  INTRINSIC abs, max
190 * ..
191 * .. Executable Statements ..
192 *
193 * Test the input parameters.
194 *
195  info = 0
196  IF( .NOT.lsame( uplo, 'U' ) .AND. .NOT.lsame( uplo, 'L' ) ) THEN
197  info = -1
198  ELSE IF( .NOT.lsame( trans, 'N' ) .AND. .NOT.lsame( trans, 'T' ) )
199  $ THEN
200  info = -2
201  ELSE IF( .NOT.lsame( diag, 'U' ) .AND. .NOT.lsame( diag, 'N' ) )
202  $ THEN
203  info = -3
204  ELSE IF( n.LT.0 ) THEN
205  info = -4
206  ELSE IF( lda.LT.max( 1, n ) ) THEN
207  info = -6
208  ELSE IF( ldb.LT.max( 1, n ) ) THEN
209  info = -9
210  END IF
211  IF( info.NE.0 ) THEN
212  CALL xerbla( 'CLAVSY ', -info )
213  RETURN
214  END IF
215 *
216 * Quick return if possible.
217 *
218  IF( n.EQ.0 )
219  $ RETURN
220 *
221  nounit = lsame( diag, 'N' )
222 *------------------------------------------
223 *
224 * Compute B := A * B (No transpose)
225 *
226 *------------------------------------------
227  IF( lsame( trans, 'N' ) ) THEN
228 *
229 * Compute B := U*B
230 * where U = P(m)*inv(U(m))* ... *P(1)*inv(U(1))
231 *
232  IF( lsame( uplo, 'U' ) ) THEN
233 *
234 * Loop forward applying the transformations.
235 *
236  k = 1
237  10 CONTINUE
238  IF( k.GT.n )
239  $ GO TO 30
240  IF( ipiv( k ).GT.0 ) THEN
241 *
242 * 1 x 1 pivot block
243 *
244 * Multiply by the diagonal element if forming U * D.
245 *
246  IF( nounit )
247  $ CALL cscal( nrhs, a( k, k ), b( k, 1 ), ldb )
248 *
249 * Multiply by P(K) * inv(U(K)) if K > 1.
250 *
251  IF( k.GT.1 ) THEN
252 *
253 * Apply the transformation.
254 *
255  CALL cgeru( k-1, nrhs, cone, a( 1, k ), 1, b( k, 1 ),
256  $ ldb, b( 1, 1 ), ldb )
257 *
258 * Interchange if P(K) != I.
259 *
260  kp = ipiv( k )
261  IF( kp.NE.k )
262  $ CALL cswap( nrhs, b( k, 1 ), ldb, b( kp, 1 ), ldb )
263  END IF
264  k = k + 1
265  ELSE
266 *
267 * 2 x 2 pivot block
268 *
269 * Multiply by the diagonal block if forming U * D.
270 *
271  IF( nounit ) THEN
272  d11 = a( k, k )
273  d22 = a( k+1, k+1 )
274  d12 = a( k, k+1 )
275  d21 = d12
276  DO 20 j = 1, nrhs
277  t1 = b( k, j )
278  t2 = b( k+1, j )
279  b( k, j ) = d11*t1 + d12*t2
280  b( k+1, j ) = d21*t1 + d22*t2
281  20 CONTINUE
282  END IF
283 *
284 * Multiply by P(K) * inv(U(K)) if K > 1.
285 *
286  IF( k.GT.1 ) THEN
287 *
288 * Apply the transformations.
289 *
290  CALL cgeru( k-1, nrhs, cone, a( 1, k ), 1, b( k, 1 ),
291  $ ldb, b( 1, 1 ), ldb )
292  CALL cgeru( k-1, nrhs, cone, a( 1, k+1 ), 1,
293  $ b( k+1, 1 ), ldb, b( 1, 1 ), ldb )
294 *
295 * Interchange if P(K) != I.
296 *
297  kp = abs( ipiv( k ) )
298  IF( kp.NE.k )
299  $ CALL cswap( nrhs, b( k, 1 ), ldb, b( kp, 1 ), ldb )
300  END IF
301  k = k + 2
302  END IF
303  GO TO 10
304  30 CONTINUE
305 *
306 * Compute B := L*B
307 * where L = P(1)*inv(L(1))* ... *P(m)*inv(L(m)) .
308 *
309  ELSE
310 *
311 * Loop backward applying the transformations to B.
312 *
313  k = n
314  40 CONTINUE
315  IF( k.LT.1 )
316  $ GO TO 60
317 *
318 * Test the pivot index. If greater than zero, a 1 x 1
319 * pivot was used, otherwise a 2 x 2 pivot was used.
320 *
321  IF( ipiv( k ).GT.0 ) THEN
322 *
323 * 1 x 1 pivot block:
324 *
325 * Multiply by the diagonal element if forming L * D.
326 *
327  IF( nounit )
328  $ CALL cscal( nrhs, a( k, k ), b( k, 1 ), ldb )
329 *
330 * Multiply by P(K) * inv(L(K)) if K < N.
331 *
332  IF( k.NE.n ) THEN
333  kp = ipiv( k )
334 *
335 * Apply the transformation.
336 *
337  CALL cgeru( n-k, nrhs, cone, a( k+1, k ), 1,
338  $ b( k, 1 ), ldb, b( k+1, 1 ), ldb )
339 *
340 * Interchange if a permutation was applied at the
341 * K-th step of the factorization.
342 *
343  IF( kp.NE.k )
344  $ CALL cswap( nrhs, b( k, 1 ), ldb, b( kp, 1 ), ldb )
345  END IF
346  k = k - 1
347 *
348  ELSE
349 *
350 * 2 x 2 pivot block:
351 *
352 * Multiply by the diagonal block if forming L * D.
353 *
354  IF( nounit ) THEN
355  d11 = a( k-1, k-1 )
356  d22 = a( k, k )
357  d21 = a( k, k-1 )
358  d12 = d21
359  DO 50 j = 1, nrhs
360  t1 = b( k-1, j )
361  t2 = b( k, j )
362  b( k-1, j ) = d11*t1 + d12*t2
363  b( k, j ) = d21*t1 + d22*t2
364  50 CONTINUE
365  END IF
366 *
367 * Multiply by P(K) * inv(L(K)) if K < N.
368 *
369  IF( k.NE.n ) THEN
370 *
371 * Apply the transformation.
372 *
373  CALL cgeru( n-k, nrhs, cone, a( k+1, k ), 1,
374  $ b( k, 1 ), ldb, b( k+1, 1 ), ldb )
375  CALL cgeru( n-k, nrhs, cone, a( k+1, k-1 ), 1,
376  $ b( k-1, 1 ), ldb, b( k+1, 1 ), ldb )
377 *
378 * Interchange if a permutation was applied at the
379 * K-th step of the factorization.
380 *
381  kp = abs( ipiv( k ) )
382  IF( kp.NE.k )
383  $ CALL cswap( nrhs, b( k, 1 ), ldb, b( kp, 1 ), ldb )
384  END IF
385  k = k - 2
386  END IF
387  GO TO 40
388  60 CONTINUE
389  END IF
390 *----------------------------------------
391 *
392 * Compute B := A' * B (transpose)
393 *
394 *----------------------------------------
395  ELSE IF( lsame( trans, 'T' ) ) THEN
396 *
397 * Form B := U'*B
398 * where U = P(m)*inv(U(m))* ... *P(1)*inv(U(1))
399 * and U' = inv(U'(1))*P(1)* ... *inv(U'(m))*P(m)
400 *
401  IF( lsame( uplo, 'U' ) ) THEN
402 *
403 * Loop backward applying the transformations.
404 *
405  k = n
406  70 IF( k.LT.1 )
407  $ GO TO 90
408 *
409 * 1 x 1 pivot block.
410 *
411  IF( ipiv( k ).GT.0 ) THEN
412  IF( k.GT.1 ) THEN
413 *
414 * Interchange if P(K) != I.
415 *
416  kp = ipiv( k )
417  IF( kp.NE.k )
418  $ CALL cswap( nrhs, b( k, 1 ), ldb, b( kp, 1 ), ldb )
419 *
420 * Apply the transformation
421 *
422  CALL cgemv( 'Transpose', k-1, nrhs, cone, b, ldb,
423  $ a( 1, k ), 1, cone, b( k, 1 ), ldb )
424  END IF
425  IF( nounit )
426  $ CALL cscal( nrhs, a( k, k ), b( k, 1 ), ldb )
427  k = k - 1
428 *
429 * 2 x 2 pivot block.
430 *
431  ELSE
432  IF( k.GT.2 ) THEN
433 *
434 * Interchange if P(K) != I.
435 *
436  kp = abs( ipiv( k ) )
437  IF( kp.NE.k-1 )
438  $ CALL cswap( nrhs, b( k-1, 1 ), ldb, b( kp, 1 ),
439  $ ldb )
440 *
441 * Apply the transformations
442 *
443  CALL cgemv( 'Transpose', k-2, nrhs, cone, b, ldb,
444  $ a( 1, k ), 1, cone, b( k, 1 ), ldb )
445  CALL cgemv( 'Transpose', k-2, nrhs, cone, b, ldb,
446  $ a( 1, k-1 ), 1, cone, b( k-1, 1 ), ldb )
447  END IF
448 *
449 * Multiply by the diagonal block if non-unit.
450 *
451  IF( nounit ) THEN
452  d11 = a( k-1, k-1 )
453  d22 = a( k, k )
454  d12 = a( k-1, k )
455  d21 = d12
456  DO 80 j = 1, nrhs
457  t1 = b( k-1, j )
458  t2 = b( k, j )
459  b( k-1, j ) = d11*t1 + d12*t2
460  b( k, j ) = d21*t1 + d22*t2
461  80 CONTINUE
462  END IF
463  k = k - 2
464  END IF
465  GO TO 70
466  90 CONTINUE
467 *
468 * Form B := L'*B
469 * where L = P(1)*inv(L(1))* ... *P(m)*inv(L(m))
470 * and L' = inv(L'(m))*P(m)* ... *inv(L'(1))*P(1)
471 *
472  ELSE
473 *
474 * Loop forward applying the L-transformations.
475 *
476  k = 1
477  100 CONTINUE
478  IF( k.GT.n )
479  $ GO TO 120
480 *
481 * 1 x 1 pivot block
482 *
483  IF( ipiv( k ).GT.0 ) THEN
484  IF( k.LT.n ) THEN
485 *
486 * Interchange if P(K) != I.
487 *
488  kp = ipiv( k )
489  IF( kp.NE.k )
490  $ CALL cswap( nrhs, b( k, 1 ), ldb, b( kp, 1 ), ldb )
491 *
492 * Apply the transformation
493 *
494  CALL cgemv( 'Transpose', n-k, nrhs, cone, b( k+1, 1 ),
495  $ ldb, a( k+1, k ), 1, cone, b( k, 1 ), ldb )
496  END IF
497  IF( nounit )
498  $ CALL cscal( nrhs, a( k, k ), b( k, 1 ), ldb )
499  k = k + 1
500 *
501 * 2 x 2 pivot block.
502 *
503  ELSE
504  IF( k.LT.n-1 ) THEN
505 *
506 * Interchange if P(K) != I.
507 *
508  kp = abs( ipiv( k ) )
509  IF( kp.NE.k+1 )
510  $ CALL cswap( nrhs, b( k+1, 1 ), ldb, b( kp, 1 ),
511  $ ldb )
512 *
513 * Apply the transformation
514 *
515  CALL cgemv( 'Transpose', n-k-1, nrhs, cone,
516  $ b( k+2, 1 ), ldb, a( k+2, k+1 ), 1, cone,
517  $ b( k+1, 1 ), ldb )
518  CALL cgemv( 'Transpose', n-k-1, nrhs, cone,
519  $ b( k+2, 1 ), ldb, a( k+2, k ), 1, cone,
520  $ b( k, 1 ), ldb )
521  END IF
522 *
523 * Multiply by the diagonal block if non-unit.
524 *
525  IF( nounit ) THEN
526  d11 = a( k, k )
527  d22 = a( k+1, k+1 )
528  d21 = a( k+1, k )
529  d12 = d21
530  DO 110 j = 1, nrhs
531  t1 = b( k, j )
532  t2 = b( k+1, j )
533  b( k, j ) = d11*t1 + d12*t2
534  b( k+1, j ) = d21*t1 + d22*t2
535  110 CONTINUE
536  END IF
537  k = k + 2
538  END IF
539  GO TO 100
540  120 CONTINUE
541  END IF
542  END IF
543  RETURN
544 *
545 * End of CLAVSY
546 *
547  END
subroutine clavsy(UPLO, TRANS, DIAG, N, NRHS, A, LDA, IPIV, B, LDB, INFO)
CLAVSY
Definition: clavsy.f:155
subroutine cgemv(TRANS, M, N, ALPHA, A, LDA, X, INCX, BETA, Y, INCY)
CGEMV
Definition: cgemv.f:160
subroutine cscal(N, CA, CX, INCX)
CSCAL
Definition: cscal.f:80
subroutine cgeru(M, N, ALPHA, X, INCX, Y, INCY, A, LDA)
CGERU
Definition: cgeru.f:132
subroutine xerbla(SRNAME, INFO)
XERBLA
Definition: xerbla.f:62
subroutine cswap(N, CX, INCX, CY, INCY)
CSWAP
Definition: cswap.f:83