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OpenBLAS/lapack-netlib/TESTING/MATGEN/clatme.f

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  1. *> \brief \b CLATME

  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 CLATME( N, DIST, ISEED, D, MODE, COND, DMAX,

  12. *         RSIGN, 

  13. *                          UPPER, SIM, DS, MODES, CONDS, KL, KU, ANORM, 

  14. *         A, 

  15. *                          LDA, WORK, INFO )

  16. * 

  17. *       .. Scalar Arguments ..

  18. *       CHARACTER          DIST, RSIGN, SIM, UPPER

  19. *       INTEGER            INFO, KL, KU, LDA, MODE, MODES, N

  20. *       REAL               ANORM, COND, CONDS

  21. *       COMPLEX            DMAX

  22. *       ..

  23. *       .. Array Arguments ..

  24. *       INTEGER            ISEED( 4 )

  25. *       REAL               DS( * )

  26. *       COMPLEX            A( LDA, * ), D( * ), WORK( * )

  27. *       ..

  28. *  

  29. *

  30. *> \par Purpose:

  31. *  =============

  32. *>

  33. *> \verbatim

  34. *>

  35. *>    CLATME generates random non-symmetric square matrices with

  36. *>    specified eigenvalues for testing LAPACK programs.

  37. *>

  38. *>    CLATME operates by applying the following sequence of

  39. *>    operations:

  40. *>

  41. *>    1. Set the diagonal to D, where D may be input or

  42. *>         computed according to MODE, COND, DMAX, and RSIGN

  43. *>         as described below.

  44. *>

  45. *>    2. If UPPER='T', the upper triangle of A is set to random values

  46. *>         out of distribution DIST.

  47. *>

  48. *>    3. If SIM='T', A is multiplied on the left by a random matrix

  49. *>         X, whose singular values are specified by DS, MODES, and

  50. *>         CONDS, and on the right by X inverse.

  51. *>

  52. *>    4. If KL < N-1, the lower bandwidth is reduced to KL using

  53. *>         Householder transformations.  If KU < N-1, the upper

  54. *>         bandwidth is reduced to KU.

  55. *>

  56. *>    5. If ANORM is not negative, the matrix is scaled to have

  57. *>         maximum-element-norm ANORM.

  58. *>

  59. *>    (Note: since the matrix cannot be reduced beyond Hessenberg form,

  60. *>     no packing options are available.)

  61. *> \endverbatim

  62. *

  63. *  Arguments:

  64. *  ==========

  65. *

  66. *> \param[in] N

  67. *> \verbatim

  68. *>          N is INTEGER

  69. *>           The number of columns (or rows) of A. Not modified.

  70. *> \endverbatim

  71. *>

  72. *> \param[in] DIST

  73. *> \verbatim

  74. *>          DIST is CHARACTER*1

  75. *>           On entry, DIST specifies the type of distribution to be used

  76. *>           to generate the random eigen-/singular values, and on the

  77. *>           upper triangle (see UPPER).

  78. *>           'U' => UNIFORM( 0, 1 )  ( 'U' for uniform )

  79. *>           'S' => UNIFORM( -1, 1 ) ( 'S' for symmetric )

  80. *>           'N' => NORMAL( 0, 1 )   ( 'N' for normal )

  81. *>           'D' => uniform on the complex disc |z| < 1.

  82. *>           Not modified.

  83. *> \endverbatim

  84. *>

  85. *> \param[in,out] ISEED

  86. *> \verbatim

  87. *>          ISEED is INTEGER array, dimension ( 4 )

  88. *>           On entry ISEED specifies the seed of the random number

  89. *>           generator. They should lie between 0 and 4095 inclusive,

  90. *>           and ISEED(4) should be odd. The random number generator

  91. *>           uses a linear congruential sequence limited to small

  92. *>           integers, and so should produce machine independent

  93. *>           random numbers. The values of ISEED are changed on

  94. *>           exit, and can be used in the next call to CLATME

  95. *>           to continue the same random number sequence.

  96. *>           Changed on exit.

  97. *> \endverbatim

  98. *>

  99. *> \param[in,out] D

  100. *> \verbatim

  101. *>          D is COMPLEX array, dimension ( N )

  102. *>           This array is used to specify the eigenvalues of A.  If

  103. *>           MODE=0, then D is assumed to contain the eigenvalues

  104. *>           otherwise they will be computed according to MODE, COND,

  105. *>           DMAX, and RSIGN and placed in D.

  106. *>           Modified if MODE is nonzero.

  107. *> \endverbatim

  108. *>

  109. *> \param[in] MODE

  110. *> \verbatim

  111. *>          MODE is INTEGER

  112. *>           On entry this describes how the eigenvalues are to

  113. *>           be specified:

  114. *>           MODE = 0 means use D as input

  115. *>           MODE = 1 sets D(1)=1 and D(2:N)=1.0/COND

  116. *>           MODE = 2 sets D(1:N-1)=1 and D(N)=1.0/COND

  117. *>           MODE = 3 sets D(I)=COND**(-(I-1)/(N-1))

  118. *>           MODE = 4 sets D(i)=1 - (i-1)/(N-1)*(1 - 1/COND)

  119. *>           MODE = 5 sets D to random numbers in the range

  120. *>                    ( 1/COND , 1 ) such that their logarithms

  121. *>                    are uniformly distributed.

  122. *>           MODE = 6 set D to random numbers from same distribution

  123. *>                    as the rest of the matrix.

  124. *>           MODE < 0 has the same meaning as ABS(MODE), except that

  125. *>              the order of the elements of D is reversed.

  126. *>           Thus if MODE is between 1 and 4, D has entries ranging

  127. *>              from 1 to 1/COND, if between -1 and -4, D has entries

  128. *>              ranging from 1/COND to 1,

  129. *>           Not modified.

  130. *> \endverbatim

  131. *>

  132. *> \param[in] COND

  133. *> \verbatim

  134. *>          COND is REAL

  135. *>           On entry, this is used as described under MODE above.

  136. *>           If used, it must be >= 1. Not modified.

  137. *> \endverbatim

  138. *>

  139. *> \param[in] DMAX

  140. *> \verbatim

  141. *>          DMAX is COMPLEX

  142. *>           If MODE is neither -6, 0 nor 6, the contents of D, as

  143. *>           computed according to MODE and COND, will be scaled by

  144. *>           DMAX / max(abs(D(i))).  Note that DMAX need not be

  145. *>           positive or real: if DMAX is negative or complex (or zero),

  146. *>           D will be scaled by a negative or complex number (or zero).

  147. *>           If RSIGN='F' then the largest (absolute) eigenvalue will be

  148. *>           equal to DMAX.

  149. *>           Not modified.

  150. *> \endverbatim

  151. *>

  152. *> \param[in] RSIGN

  153. *> \verbatim

  154. *>          RSIGN is CHARACTER*1

  155. *>           If MODE is not 0, 6, or -6, and RSIGN='T', then the

  156. *>           elements of D, as computed according to MODE and COND, will

  157. *>           be multiplied by a random complex number from the unit

  158. *>           circle |z| = 1.  If RSIGN='F', they will not be.  RSIGN may

  159. *>           only have the values 'T' or 'F'.

  160. *>           Not modified.

  161. *> \endverbatim

  162. *>

  163. *> \param[in] UPPER

  164. *> \verbatim

  165. *>          UPPER is CHARACTER*1

  166. *>           If UPPER='T', then the elements of A above the diagonal

  167. *>           will be set to random numbers out of DIST.  If UPPER='F',

  168. *>           they will not.  UPPER may only have the values 'T' or 'F'.

  169. *>           Not modified.

  170. *> \endverbatim

  171. *>

  172. *> \param[in] SIM

  173. *> \verbatim

  174. *>          SIM is CHARACTER*1

  175. *>           If SIM='T', then A will be operated on by a "similarity

  176. *>           transform", i.e., multiplied on the left by a matrix X and

  177. *>           on the right by X inverse.  X = U S V, where U and V are

  178. *>           random unitary matrices and S is a (diagonal) matrix of

  179. *>           singular values specified by DS, MODES, and CONDS.  If

  180. *>           SIM='F', then A will not be transformed.

  181. *>           Not modified.

  182. *> \endverbatim

  183. *>

  184. *> \param[in,out] DS

  185. *> \verbatim

  186. *>          DS is REAL array, dimension ( N )

  187. *>           This array is used to specify the singular values of X,

  188. *>           in the same way that D specifies the eigenvalues of A.

  189. *>           If MODE=0, the DS contains the singular values, which

  190. *>           may not be zero.

  191. *>           Modified if MODE is nonzero.

  192. *> \endverbatim

  193. *>

  194. *> \param[in] MODES

  195. *> \verbatim

  196. *>          MODES is INTEGER

  197. *> \endverbatim

  198. *>

  199. *> \param[in] CONDS

  200. *> \verbatim

  201. *>          CONDS is REAL

  202. *>           Similar to MODE and COND, but for specifying the diagonal

  203. *>           of S.  MODES=-6 and +6 are not allowed (since they would

  204. *>           result in randomly ill-conditioned eigenvalues.)

  205. *> \endverbatim

  206. *>

  207. *> \param[in] KL

  208. *> \verbatim

  209. *>          KL is INTEGER

  210. *>           This specifies the lower bandwidth of the  matrix.  KL=1

  211. *>           specifies upper Hessenberg form.  If KL is at least N-1,

  212. *>           then A will have full lower bandwidth.

  213. *>           Not modified.

  214. *> \endverbatim

  215. *>

  216. *> \param[in] KU

  217. *> \verbatim

  218. *>          KU is INTEGER

  219. *>           This specifies the upper bandwidth of the  matrix.  KU=1

  220. *>           specifies lower Hessenberg form.  If KU is at least N-1,

  221. *>           then A will have full upper bandwidth; if KU and KL

  222. *>           are both at least N-1, then A will be dense.  Only one of

  223. *>           KU and KL may be less than N-1.

  224. *>           Not modified.

  225. *> \endverbatim

  226. *>

  227. *> \param[in] ANORM

  228. *> \verbatim

  229. *>          ANORM is REAL

  230. *>           If ANORM is not negative, then A will be scaled by a non-

  231. *>           negative real number to make the maximum-element-norm of A

  232. *>           to be ANORM.

  233. *>           Not modified.

  234. *> \endverbatim

  235. *>

  236. *> \param[out] A

  237. *> \verbatim

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

  239. *>           On exit A is the desired test matrix.

  240. *>           Modified.

  241. *> \endverbatim

  242. *>

  243. *> \param[in] LDA

  244. *> \verbatim

  245. *>          LDA is INTEGER

  246. *>           LDA specifies the first dimension of A as declared in the

  247. *>           calling program.  LDA must be at least M.

  248. *>           Not modified.

  249. *> \endverbatim

  250. *>

  251. *> \param[out] WORK

  252. *> \verbatim

  253. *>          WORK is COMPLEX array, dimension ( 3*N )

  254. *>           Workspace.

  255. *>           Modified.

  256. *> \endverbatim

  257. *>

  258. *> \param[out] INFO

  259. *> \verbatim

  260. *>          INFO is INTEGER

  261. *>           Error code.  On exit, INFO will be set to one of the

  262. *>           following values:

  263. *>             0 => normal return

  264. *>            -1 => N negative

  265. *>            -2 => DIST illegal string

  266. *>            -5 => MODE not in range -6 to 6

  267. *>            -6 => COND less than 1.0, and MODE neither -6, 0 nor 6

  268. *>            -9 => RSIGN is not 'T' or 'F'

  269. *>           -10 => UPPER is not 'T' or 'F'

  270. *>           -11 => SIM   is not 'T' or 'F'

  271. *>           -12 => MODES=0 and DS has a zero singular value.

  272. *>           -13 => MODES is not in the range -5 to 5.

  273. *>           -14 => MODES is nonzero and CONDS is less than 1.

  274. *>           -15 => KL is less than 1.

  275. *>           -16 => KU is less than 1, or KL and KU are both less than

  276. *>                  N-1.

  277. *>           -19 => LDA is less than M.

  278. *>            1  => Error return from CLATM1 (computing D)

  279. *>            2  => Cannot scale to DMAX (max. eigenvalue is 0)

  280. *>            3  => Error return from SLATM1 (computing DS)

  281. *>            4  => Error return from CLARGE

  282. *>            5  => Zero singular value from SLATM1.

  283. *> \endverbatim

  284. *

  285. *  Authors:

  286. *  ========

  287. *

  288. *> \author Univ. of Tennessee 

  289. *> \author Univ. of California Berkeley 

  290. *> \author Univ. of Colorado Denver 

  291. *> \author NAG Ltd. 

  292. *

  293. *> \date November 2011

  294. *

  295. *> \ingroup complex_matgen

  296. *

  297. *  =====================================================================

  298.       SUBROUTINE CLATME( N, DIST, ISEED, D, MODE, COND, DMAX,

  299.      $  RSIGN, 

  300.      $                   UPPER, SIM, DS, MODES, CONDS, KL, KU, ANORM, 

  301.      $  A, 

  302.      $                   LDA, WORK, INFO )

  303. *

  304. *  -- LAPACK computational routine (version 3.4.0) --

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

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

  307. *     November 2011

  308. *

  309. *     .. Scalar Arguments ..

  310.       CHARACTER          DIST, RSIGN, SIM, UPPER

  311.       INTEGER            INFO, KL, KU, LDA, MODE, MODES, N

  312.       REAL               ANORM, COND, CONDS

  313.       COMPLEX            DMAX

  314. *     ..

  315. *     .. Array Arguments ..

  316.       INTEGER            ISEED( 4 )

  317.       REAL               DS( * )

  318.       COMPLEX            A( LDA, * ), D( * ), WORK( * )

  319. *     ..

  320. *

  321. *  =====================================================================

  322. *

  323. *     .. Parameters ..

  324.       REAL               ZERO

  325.       PARAMETER          ( ZERO = 0.0E+0 )

  326.       REAL               ONE

  327.       PARAMETER          ( ONE = 1.0E+0 )

  328.       COMPLEX            CZERO

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

  330.       COMPLEX            CONE

  331.       PARAMETER          ( CONE = ( 1.0E+0, 0.0E+0 ) )

  332. *     ..

  333. *     .. Local Scalars ..

  334.       LOGICAL            BADS

  335.       INTEGER            I, IC, ICOLS, IDIST, IINFO, IR, IROWS, IRSIGN,

  336.      $                   ISIM, IUPPER, J, JC, JCR

  337.       REAL               RALPHA, TEMP

  338.       COMPLEX            ALPHA, TAU, XNORMS

  339. *     ..

  340. *     .. Local Arrays ..

  341.       REAL               TEMPA( 1 )

  342. *     ..

  343. *     .. External Functions ..

  344.       LOGICAL            LSAME

  345.       REAL               CLANGE

  346.       COMPLEX            CLARND

  347.       EXTERNAL           LSAME, CLANGE, CLARND

  348. *     ..

  349. *     .. External Subroutines ..

  350.       EXTERNAL           CCOPY, CGEMV, CGERC, CLACGV, CLARFG, CLARGE,

  351.      $                   CLARNV, CLATM1, CLASET, CSCAL, CSSCAL, SLATM1,

  352.      $                   XERBLA

  353. *     ..

  354. *     .. Intrinsic Functions ..

  355.       INTRINSIC          ABS, CONJG, MAX, MOD

  356. *     ..

  357. *     .. Executable Statements ..

  358. *

  359. *     1)      Decode and Test the input parameters.

  360. *             Initialize flags & seed.

  361. *

  362.       INFO = 0

  363. *

  364. *     Quick return if possible

  365. *

  366.       IF( N.EQ.0 )

  367.      $   RETURN

  368. *

  369. *     Decode DIST

  370. *

  371.       IF( LSAME( DIST, 'U' ) ) THEN

  372.          IDIST = 1

  373.       ELSE IF( LSAME( DIST, 'S' ) ) THEN

  374.          IDIST = 2

  375.       ELSE IF( LSAME( DIST, 'N' ) ) THEN

  376.          IDIST = 3

  377.       ELSE IF( LSAME( DIST, 'D' ) ) THEN

  378.          IDIST = 4

  379.       ELSE

  380.          IDIST = -1

  381.       END IF

  382. *

  383. *     Decode RSIGN

  384. *

  385.       IF( LSAME( RSIGN, 'T' ) ) THEN

  386.          IRSIGN = 1

  387.       ELSE IF( LSAME( RSIGN, 'F' ) ) THEN

  388.          IRSIGN = 0

  389.       ELSE

  390.          IRSIGN = -1

  391.       END IF

  392. *

  393. *     Decode UPPER

  394. *

  395.       IF( LSAME( UPPER, 'T' ) ) THEN

  396.          IUPPER = 1

  397.       ELSE IF( LSAME( UPPER, 'F' ) ) THEN

  398.          IUPPER = 0

  399.       ELSE

  400.          IUPPER = -1

  401.       END IF

  402. *

  403. *     Decode SIM

  404. *

  405.       IF( LSAME( SIM, 'T' ) ) THEN

  406.          ISIM = 1

  407.       ELSE IF( LSAME( SIM, 'F' ) ) THEN

  408.          ISIM = 0

  409.       ELSE

  410.          ISIM = -1

  411.       END IF

  412. *

  413. *     Check DS, if MODES=0 and ISIM=1

  414. *

  415.       BADS = .FALSE.

  416.       IF( MODES.EQ.0 .AND. ISIM.EQ.1 ) THEN

  417.          DO 10 J = 1, N

  418.             IF( DS( J ).EQ.ZERO )

  419.      $         BADS = .TRUE.

  420.    10    CONTINUE

  421.       END IF

  422. *

  423. *     Set INFO if an error

  424. *

  425.       IF( N.LT.0 ) THEN

  426.          INFO = -1

  427.       ELSE IF( IDIST.EQ.-1 ) THEN

  428.          INFO = -2

  429.       ELSE IF( ABS( MODE ).GT.6 ) THEN

  430.          INFO = -5

  431.       ELSE IF( ( MODE.NE.0 .AND. ABS( MODE ).NE.6 ) .AND. COND.LT.ONE )

  432.      $          THEN

  433.          INFO = -6

  434.       ELSE IF( IRSIGN.EQ.-1 ) THEN

  435.          INFO = -9

  436.       ELSE IF( IUPPER.EQ.-1 ) THEN

  437.          INFO = -10

  438.       ELSE IF( ISIM.EQ.-1 ) THEN

  439.          INFO = -11

  440.       ELSE IF( BADS ) THEN

  441.          INFO = -12

  442.       ELSE IF( ISIM.EQ.1 .AND. ABS( MODES ).GT.5 ) THEN

  443.          INFO = -13

  444.       ELSE IF( ISIM.EQ.1 .AND. MODES.NE.0 .AND. CONDS.LT.ONE ) THEN

  445.          INFO = -14

  446.       ELSE IF( KL.LT.1 ) THEN

  447.          INFO = -15

  448.       ELSE IF( KU.LT.1 .OR. ( KU.LT.N-1 .AND. KL.LT.N-1 ) ) THEN

  449.          INFO = -16

  450.       ELSE IF( LDA.LT.MAX( 1, N ) ) THEN

  451.          INFO = -19

  452.       END IF

  453. *

  454.       IF( INFO.NE.0 ) THEN

  455.          CALL XERBLA( 'CLATME', -INFO )

  456.          RETURN

  457.       END IF

  458. *

  459. *     Initialize random number generator

  460. *

  461.       DO 20 I = 1, 4

  462.          ISEED( I ) = MOD( ABS( ISEED( I ) ), 4096 )

  463.    20 CONTINUE

  464. *

  465.       IF( MOD( ISEED( 4 ), 2 ).NE.1 )

  466.      $   ISEED( 4 ) = ISEED( 4 ) + 1

  467. *

  468. *     2)      Set up diagonal of A

  469. *

  470. *             Compute D according to COND and MODE

  471. *

  472.       CALL CLATM1( MODE, COND, IRSIGN, IDIST, ISEED, D, N, IINFO )

  473.       IF( IINFO.NE.0 ) THEN

  474.          INFO = 1

  475.          RETURN

  476.       END IF

  477.       IF( MODE.NE.0 .AND. ABS( MODE ).NE.6 ) THEN

  478. *

  479. *        Scale by DMAX

  480. *

  481.          TEMP = ABS( D( 1 ) )

  482.          DO 30 I = 2, N

  483.             TEMP = MAX( TEMP, ABS( D( I ) ) )

  484.    30    CONTINUE

  485. *

  486.          IF( TEMP.GT.ZERO ) THEN

  487.             ALPHA = DMAX / TEMP

  488.          ELSE

  489.             INFO = 2

  490.             RETURN

  491.          END IF

  492. *

  493.          CALL CSCAL( N, ALPHA, D, 1 )

  494. *

  495.       END IF

  496. *

  497.       CALL CLASET( 'Full', N, N, CZERO, CZERO, A, LDA )

  498.       CALL CCOPY( N, D, 1, A, LDA+1 )

  499. *

  500. *     3)      If UPPER='T', set upper triangle of A to random numbers.

  501. *

  502.       IF( IUPPER.NE.0 ) THEN

  503.          DO 40 JC = 2, N

  504.             CALL CLARNV( IDIST, ISEED, JC-1, A( 1, JC ) )

  505.    40    CONTINUE

  506.       END IF

  507. *

  508. *     4)      If SIM='T', apply similarity transformation.

  509. *

  510. *                                -1

  511. *             Transform is  X A X  , where X = U S V, thus

  512. *

  513. *             it is  U S V A V' (1/S) U'

  514. *

  515.       IF( ISIM.NE.0 ) THEN

  516. *

  517. *        Compute S (singular values of the eigenvector matrix)

  518. *        according to CONDS and MODES

  519. *

  520.          CALL SLATM1( MODES, CONDS, 0, 0, ISEED, DS, N, IINFO )

  521.          IF( IINFO.NE.0 ) THEN

  522.             INFO = 3

  523.             RETURN

  524.          END IF

  525. *

  526. *        Multiply by V and V'

  527. *

  528.          CALL CLARGE( N, A, LDA, ISEED, WORK, IINFO )

  529.          IF( IINFO.NE.0 ) THEN

  530.             INFO = 4

  531.             RETURN

  532.          END IF

  533. *

  534. *        Multiply by S and (1/S)

  535. *

  536.          DO 50 J = 1, N

  537.             CALL CSSCAL( N, DS( J ), A( J, 1 ), LDA )

  538.             IF( DS( J ).NE.ZERO ) THEN

  539.                CALL CSSCAL( N, ONE / DS( J ), A( 1, J ), 1 )

  540.             ELSE

  541.                INFO = 5

  542.                RETURN

  543.             END IF

  544.    50    CONTINUE

  545. *

  546. *        Multiply by U and U'

  547. *

  548.          CALL CLARGE( N, A, LDA, ISEED, WORK, IINFO )

  549.          IF( IINFO.NE.0 ) THEN

  550.             INFO = 4

  551.             RETURN

  552.          END IF

  553.       END IF

  554. *

  555. *     5)      Reduce the bandwidth.

  556. *

  557.       IF( KL.LT.N-1 ) THEN

  558. *

  559. *        Reduce bandwidth -- kill column

  560. *

  561.          DO 60 JCR = KL + 1, N - 1

  562.             IC = JCR - KL

  563.             IROWS = N + 1 - JCR

  564.             ICOLS = N + KL - JCR

  565. *

  566.             CALL CCOPY( IROWS, A( JCR, IC ), 1, WORK, 1 )

  567.             XNORMS = WORK( 1 )

  568.             CALL CLARFG( IROWS, XNORMS, WORK( 2 ), 1, TAU )

  569.             TAU = CONJG( TAU )

  570.             WORK( 1 ) = CONE

  571.             ALPHA = CLARND( 5, ISEED )

  572. *

  573.             CALL CGEMV( 'C', IROWS, ICOLS, CONE, A( JCR, IC+1 ), LDA,

  574.      $                  WORK, 1, CZERO, WORK( IROWS+1 ), 1 )

  575.             CALL CGERC( IROWS, ICOLS, -TAU, WORK, 1, WORK( IROWS+1 ), 1,

  576.      $                  A( JCR, IC+1 ), LDA )

  577. *

  578.             CALL CGEMV( 'N', N, IROWS, CONE, A( 1, JCR ), LDA, WORK, 1,

  579.      $                  CZERO, WORK( IROWS+1 ), 1 )

  580.             CALL CGERC( N, IROWS, -CONJG( TAU ), WORK( IROWS+1 ), 1,

  581.      $                  WORK, 1, A( 1, JCR ), LDA )

  582. *

  583.             A( JCR, IC ) = XNORMS

  584.             CALL CLASET( 'Full', IROWS-1, 1, CZERO, CZERO,

  585.      $                   A( JCR+1, IC ), LDA )

  586. *

  587.             CALL CSCAL( ICOLS+1, ALPHA, A( JCR, IC ), LDA )

  588.             CALL CSCAL( N, CONJG( ALPHA ), A( 1, JCR ), 1 )

  589.    60    CONTINUE

  590.       ELSE IF( KU.LT.N-1 ) THEN

  591. *

  592. *        Reduce upper bandwidth -- kill a row at a time.

  593. *

  594.          DO 70 JCR = KU + 1, N - 1

  595.             IR = JCR - KU

  596.             IROWS = N + KU - JCR

  597.             ICOLS = N + 1 - JCR

  598. *

  599.             CALL CCOPY( ICOLS, A( IR, JCR ), LDA, WORK, 1 )

  600.             XNORMS = WORK( 1 )

  601.             CALL CLARFG( ICOLS, XNORMS, WORK( 2 ), 1, TAU )

  602.             TAU = CONJG( TAU )

  603.             WORK( 1 ) = CONE

  604.             CALL CLACGV( ICOLS-1, WORK( 2 ), 1 )

  605.             ALPHA = CLARND( 5, ISEED )

  606. *

  607.             CALL CGEMV( 'N', IROWS, ICOLS, CONE, A( IR+1, JCR ), LDA,

  608.      $                  WORK, 1, CZERO, WORK( ICOLS+1 ), 1 )

  609.             CALL CGERC( IROWS, ICOLS, -TAU, WORK( ICOLS+1 ), 1, WORK, 1,

  610.      $                  A( IR+1, JCR ), LDA )

  611. *

  612.             CALL CGEMV( 'C', ICOLS, N, CONE, A( JCR, 1 ), LDA, WORK, 1,

  613.      $                  CZERO, WORK( ICOLS+1 ), 1 )

  614.             CALL CGERC( ICOLS, N, -CONJG( TAU ), WORK, 1,

  615.      $                  WORK( ICOLS+1 ), 1, A( JCR, 1 ), LDA )

  616. *

  617.             A( IR, JCR ) = XNORMS

  618.             CALL CLASET( 'Full', 1, ICOLS-1, CZERO, CZERO,

  619.      $                   A( IR, JCR+1 ), LDA )

  620. *

  621.             CALL CSCAL( IROWS+1, ALPHA, A( IR, JCR ), 1 )

  622.             CALL CSCAL( N, CONJG( ALPHA ), A( JCR, 1 ), LDA )

  623.    70    CONTINUE

  624.       END IF

  625. *

  626. *     Scale the matrix to have norm ANORM

  627. *

  628.       IF( ANORM.GE.ZERO ) THEN

  629.          TEMP = CLANGE( 'M', N, N, A, LDA, TEMPA )

  630.          IF( TEMP.GT.ZERO ) THEN

  631.             RALPHA = ANORM / TEMP

  632.             DO 80 J = 1, N

  633.                CALL CSSCAL( N, RALPHA, A( 1, J ), 1 )

  634.    80       CONTINUE

  635.          END IF

  636.       END IF

  637. *

  638.       RETURN

  639. *

  640. *     End of CLATME

  641. *

  642.       END