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OpenBLAS/lapack-netlib/TESTING/EIG/cgrqts.f

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  1. *> \brief \b CGRQTS

  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 CGRQTS( M, P, N, A, AF, Q, R, LDA, TAUA, B, BF, Z, T,

  12. *                          BWK, LDB, TAUB, WORK, LWORK, RWORK, RESULT )

  13. * 

  14. *       .. Scalar Arguments ..

  15. *       INTEGER            LDA, LDB, LWORK, M, P, N

  16. *       ..

  17. *       .. Array Arguments ..

  18. *       REAL               RESULT( 4 ), RWORK( * )

  19. *       COMPLEX            A( LDA, * ), AF( LDA, * ), R( LDA, * ),

  20. *      $                   Q( LDA, * ), B( LDB, * ), BF( LDB, * ),

  21. *      $                   T( LDB, * ),  Z( LDB, * ), BWK( LDB, * ),

  22. *      $                   TAUA( * ), TAUB( * ), WORK( LWORK )

  23. *       ..

  24. *  

  25. *

  26. *> \par Purpose:

  27. *  =============

  28. *>

  29. *> \verbatim

  30. *>

  31. *> CGRQTS tests CGGRQF, which computes the GRQ factorization of an

  32. *> M-by-N matrix A and a P-by-N matrix B: A = R*Q and B = Z*T*Q.

  33. *> \endverbatim

  34. *

  35. *  Arguments:

  36. *  ==========

  37. *

  38. *> \param[in] M

  39. *> \verbatim

  40. *>          M is INTEGER

  41. *>          The number of rows of the matrix A.  M >= 0.

  42. *> \endverbatim

  43. *>

  44. *> \param[in] P

  45. *> \verbatim

  46. *>          P is INTEGER

  47. *>          The number of rows of the matrix B.  P >= 0.

  48. *> \endverbatim

  49. *>

  50. *> \param[in] N

  51. *> \verbatim

  52. *>          N is INTEGER

  53. *>          The number of columns of the matrices A and B.  N >= 0.

  54. *> \endverbatim

  55. *>

  56. *> \param[in] A

  57. *> \verbatim

  58. *>          A is COMPLEX array, dimension (LDA,N)

  59. *>          The M-by-N matrix A.

  60. *> \endverbatim

  61. *>

  62. *> \param[out] AF

  63. *> \verbatim

  64. *>          AF is COMPLEX array, dimension (LDA,N)

  65. *>          Details of the GRQ factorization of A and B, as returned

  66. *>          by CGGRQF, see CGGRQF for further details.

  67. *> \endverbatim

  68. *>

  69. *> \param[out] Q

  70. *> \verbatim

  71. *>          Q is COMPLEX array, dimension (LDA,N)

  72. *>          The N-by-N unitary matrix Q.

  73. *> \endverbatim

  74. *>

  75. *> \param[out] R

  76. *> \verbatim

  77. *>          R is COMPLEX array, dimension (LDA,MAX(M,N))

  78. *> \endverbatim

  79. *>

  80. *> \param[in] LDA

  81. *> \verbatim

  82. *>          LDA is INTEGER

  83. *>          The leading dimension of the arrays A, AF, R and Q.

  84. *>          LDA >= max(M,N).

  85. *> \endverbatim

  86. *>

  87. *> \param[out] TAUA

  88. *> \verbatim

  89. *>          TAUA is COMPLEX array, dimension (min(M,N))

  90. *>          The scalar factors of the elementary reflectors, as returned

  91. *>          by SGGQRC.

  92. *> \endverbatim

  93. *>

  94. *> \param[in] B

  95. *> \verbatim

  96. *>          B is COMPLEX array, dimension (LDB,N)

  97. *>          On entry, the P-by-N matrix A.

  98. *> \endverbatim

  99. *>

  100. *> \param[out] BF

  101. *> \verbatim

  102. *>          BF is COMPLEX array, dimension (LDB,N)

  103. *>          Details of the GQR factorization of A and B, as returned

  104. *>          by CGGRQF, see CGGRQF for further details.

  105. *> \endverbatim

  106. *>

  107. *> \param[out] Z

  108. *> \verbatim

  109. *>          Z is REAL array, dimension (LDB,P)

  110. *>          The P-by-P unitary matrix Z.

  111. *> \endverbatim

  112. *>

  113. *> \param[out] T

  114. *> \verbatim

  115. *>          T is COMPLEX array, dimension (LDB,max(P,N))

  116. *> \endverbatim

  117. *>

  118. *> \param[out] BWK

  119. *> \verbatim

  120. *>          BWK is COMPLEX array, dimension (LDB,N)

  121. *> \endverbatim

  122. *>

  123. *> \param[in] LDB

  124. *> \verbatim

  125. *>          LDB is INTEGER

  126. *>          The leading dimension of the arrays B, BF, Z and T.

  127. *>          LDB >= max(P,N).

  128. *> \endverbatim

  129. *>

  130. *> \param[out] TAUB

  131. *> \verbatim

  132. *>          TAUB is COMPLEX array, dimension (min(P,N))

  133. *>          The scalar factors of the elementary reflectors, as returned

  134. *>          by SGGRQF.

  135. *> \endverbatim

  136. *>

  137. *> \param[out] WORK

  138. *> \verbatim

  139. *>          WORK is COMPLEX array, dimension (LWORK)

  140. *> \endverbatim

  141. *>

  142. *> \param[in] LWORK

  143. *> \verbatim

  144. *>          LWORK is INTEGER

  145. *>          The dimension of the array WORK, LWORK >= max(M,P,N)**2.

  146. *> \endverbatim

  147. *>

  148. *> \param[out] RWORK

  149. *> \verbatim

  150. *>          RWORK is REAL array, dimension (M)

  151. *> \endverbatim

  152. *>

  153. *> \param[out] RESULT

  154. *> \verbatim

  155. *>          RESULT is REAL array, dimension (4)

  156. *>          The test ratios:

  157. *>            RESULT(1) = norm( R - A*Q' ) / ( MAX(M,N)*norm(A)*ULP)

  158. *>            RESULT(2) = norm( T*Q - Z'*B ) / (MAX(P,N)*norm(B)*ULP)

  159. *>            RESULT(3) = norm( I - Q'*Q ) / ( N*ULP )

  160. *>            RESULT(4) = norm( I - Z'*Z ) / ( P*ULP )

  161. *> \endverbatim

  162. *

  163. *  Authors:

  164. *  ========

  165. *

  166. *> \author Univ. of Tennessee 

  167. *> \author Univ. of California Berkeley 

  168. *> \author Univ. of Colorado Denver 

  169. *> \author NAG Ltd. 

  170. *

  171. *> \date November 2011

  172. *

  173. *> \ingroup complex_eig

  174. *

  175. *  =====================================================================

  176.       SUBROUTINE CGRQTS( M, P, N, A, AF, Q, R, LDA, TAUA, B, BF, Z, T,

  177.      $                   BWK, LDB, TAUB, WORK, LWORK, RWORK, RESULT )

  178. *

  179. *  -- LAPACK test routine (version 3.4.0) --

  180. *  -- LAPACK is a software package provided by Univ. of Tennessee,    --

  181. *  -- Univ. of California Berkeley, Univ. of Colorado Denver and NAG Ltd..--

  182. *     November 2011

  183. *

  184. *     .. Scalar Arguments ..

  185.       INTEGER            LDA, LDB, LWORK, M, P, N

  186. *     ..

  187. *     .. Array Arguments ..

  188.       REAL               RESULT( 4 ), RWORK( * )

  189.       COMPLEX            A( LDA, * ), AF( LDA, * ), R( LDA, * ),

  190.      $                   Q( LDA, * ), B( LDB, * ), BF( LDB, * ),

  191.      $                   T( LDB, * ),  Z( LDB, * ), BWK( LDB, * ),

  192.      $                   TAUA( * ), TAUB( * ), WORK( LWORK )

  193. *     ..

  194. *

  195. *  =====================================================================

  196. *

  197. *     .. Parameters ..

  198.       REAL               ZERO, ONE

  199.       PARAMETER          ( ZERO = 0.0E+0, ONE = 1.0E+0 )

  200.       COMPLEX            CZERO, CONE

  201.       PARAMETER          ( CZERO = ( 0.0E+0, 0.0E+0 ),

  202.      $                   CONE = ( 1.0E+0, 0.0E+0 ) )

  203.       COMPLEX            CROGUE

  204.       PARAMETER          ( CROGUE = ( -1.0E+10, 0.0E+0 ) )

  205. *     ..

  206. *     .. Local Scalars ..

  207.       INTEGER            INFO

  208.       REAL               ANORM, BNORM, ULP, UNFL, RESID

  209. *     ..

  210. *     .. External Functions ..

  211.       REAL               SLAMCH, CLANGE, CLANHE

  212.       EXTERNAL           SLAMCH, CLANGE, CLANHE

  213. *     ..

  214. *     .. External Subroutines ..

  215.       EXTERNAL           CGEMM, CGGRQF, CLACPY, CLASET, CUNGQR,

  216.      $                   CUNGRQ, CHERK

  217. *     ..

  218. *     .. Intrinsic Functions ..

  219.       INTRINSIC          MAX, MIN, REAL

  220. *     ..

  221. *     .. Executable Statements ..

  222. *

  223.       ULP = SLAMCH( 'Precision' )

  224.       UNFL = SLAMCH( 'Safe minimum' )

  225. *

  226. *     Copy the matrix A to the array AF.

  227. *

  228.       CALL CLACPY( 'Full', M, N, A, LDA, AF, LDA )

  229.       CALL CLACPY( 'Full', P, N, B, LDB, BF, LDB )

  230. *

  231.       ANORM = MAX( CLANGE( '1', M, N, A, LDA, RWORK ), UNFL )

  232.       BNORM = MAX( CLANGE( '1', P, N, B, LDB, RWORK ), UNFL )

  233. *

  234. *     Factorize the matrices A and B in the arrays AF and BF.

  235. *

  236.       CALL CGGRQF( M, P, N, AF, LDA, TAUA, BF, LDB, TAUB, WORK,

  237.      $             LWORK, INFO )

  238. *

  239. *     Generate the N-by-N matrix Q

  240. *

  241.       CALL CLASET( 'Full', N, N, CROGUE, CROGUE, Q, LDA )

  242.       IF( M.LE.N ) THEN

  243.          IF( M.GT.0 .AND. M.LT.N )

  244.      $      CALL CLACPY( 'Full', M, N-M, AF, LDA, Q( N-M+1, 1 ), LDA )

  245.          IF( M.GT.1 )

  246.      $      CALL CLACPY( 'Lower', M-1, M-1, AF( 2, N-M+1 ), LDA,

  247.      $                   Q( N-M+2, N-M+1 ), LDA )

  248.       ELSE

  249.          IF( N.GT.1 )

  250.      $      CALL CLACPY( 'Lower', N-1, N-1, AF( M-N+2, 1 ), LDA,

  251.      $                   Q( 2, 1 ), LDA )

  252.       END IF

  253.       CALL CUNGRQ( N, N, MIN( M, N ), Q, LDA, TAUA, WORK, LWORK, INFO )

  254. *

  255. *     Generate the P-by-P matrix Z

  256. *

  257.       CALL CLASET( 'Full', P, P, CROGUE, CROGUE, Z, LDB )

  258.       IF( P.GT.1 )

  259.      $   CALL CLACPY( 'Lower', P-1, N, BF( 2,1 ), LDB, Z( 2,1 ), LDB )

  260.       CALL CUNGQR( P, P, MIN( P,N ), Z, LDB, TAUB, WORK, LWORK, INFO )

  261. *

  262. *     Copy R

  263. *

  264.       CALL CLASET( 'Full', M, N, CZERO, CZERO, R, LDA )

  265.       IF( M.LE.N )THEN

  266.          CALL CLACPY( 'Upper', M, M, AF( 1, N-M+1 ), LDA, R( 1, N-M+1 ),

  267.      $                LDA )

  268.       ELSE

  269.          CALL CLACPY( 'Full', M-N, N, AF, LDA, R, LDA )

  270.          CALL CLACPY( 'Upper', N, N, AF( M-N+1, 1 ), LDA, R( M-N+1, 1 ),

  271.      $                LDA )

  272.       END IF

  273. *

  274. *     Copy T

  275. *

  276.       CALL CLASET( 'Full', P, N, CZERO, CZERO, T, LDB )

  277.       CALL CLACPY( 'Upper', P, N, BF, LDB, T, LDB )

  278. *

  279. *     Compute R - A*Q'

  280. *

  281.       CALL CGEMM( 'No transpose', 'Conjugate transpose', M, N, N, -CONE,

  282.      $            A, LDA, Q, LDA, CONE, R, LDA )

  283. *

  284. *     Compute norm( R - A*Q' ) / ( MAX(M,N)*norm(A)*ULP ) .

  285. *

  286.       RESID = CLANGE( '1', M, N, R, LDA, RWORK )

  287.       IF( ANORM.GT.ZERO ) THEN

  288.          RESULT( 1 ) = ( ( RESID / REAL(MAX(1,M,N) ) ) / ANORM ) / ULP

  289.       ELSE

  290.          RESULT( 1 ) = ZERO

  291.       END IF

  292. *

  293. *     Compute T*Q - Z'*B

  294. *

  295.       CALL CGEMM( 'Conjugate transpose', 'No transpose', P, N, P, CONE,

  296.      $           Z, LDB, B, LDB, CZERO, BWK, LDB )

  297.       CALL CGEMM( 'No transpose', 'No transpose', P, N, N, CONE, T, LDB,

  298.      $            Q, LDA, -CONE, BWK, LDB )

  299. *

  300. *     Compute norm( T*Q - Z'*B ) / ( MAX(P,N)*norm(A)*ULP ) .

  301. *

  302.       RESID = CLANGE( '1', P, N, BWK, LDB, RWORK )

  303.       IF( BNORM.GT.ZERO ) THEN

  304.          RESULT( 2 ) = ( ( RESID / REAL( MAX( 1,P,M ) ) )/BNORM ) / ULP

  305.       ELSE

  306.          RESULT( 2 ) = ZERO

  307.       END IF

  308. *

  309. *     Compute I - Q*Q'

  310. *

  311.       CALL CLASET( 'Full', N, N, CZERO, CONE, R, LDA )

  312.       CALL CHERK( 'Upper', 'No Transpose', N, N, -ONE, Q, LDA, ONE, R,

  313.      $            LDA )

  314. *

  315. *     Compute norm( I - Q'*Q ) / ( N * ULP ) .

  316. *

  317.       RESID = CLANHE( '1', 'Upper', N, R, LDA, RWORK )

  318.       RESULT( 3 ) = ( RESID / REAL( MAX( 1,N ) ) ) / ULP

  319. *

  320. *     Compute I - Z'*Z

  321. *

  322.       CALL CLASET( 'Full', P, P, CZERO, CONE, T, LDB )

  323.       CALL CHERK( 'Upper', 'Conjugate transpose', P, P, -ONE, Z, LDB,

  324.      $            ONE, T, LDB )

  325. *

  326. *     Compute norm( I - Z'*Z ) / ( P*ULP ) .

  327. *

  328.       RESID = CLANHE( '1', 'Upper', P, T, LDB, RWORK )

  329.       RESULT( 4 ) = ( RESID / REAL( MAX( 1,P ) ) ) / ULP

  330. *

  331.       RETURN

  332. *

  333. *     End of CGRQTS

  334. *

  335.       END