Annotation of rpl/lapack/lapack/ztfttp.f, revision 1.1
1.1 ! bertrand 1: SUBROUTINE ZTFTTP( TRANSR, UPLO, N, ARF, AP, INFO )
! 2: *
! 3: * -- LAPACK routine (version 3.2.1) --
! 4: *
! 5: * -- Contributed by Fred Gustavson of the IBM Watson Research Center --
! 6: * -- April 2009 --
! 7: *
! 8: * -- LAPACK is a software package provided by Univ. of Tennessee, --
! 9: * -- Univ. of California Berkeley, Univ. of Colorado Denver and NAG Ltd..--
! 10: *
! 11: * .. Scalar Arguments ..
! 12: CHARACTER TRANSR, UPLO
! 13: INTEGER INFO, N
! 14: * ..
! 15: * .. Array Arguments ..
! 16: COMPLEX*16 AP( 0: * ), ARF( 0: * )
! 17: * ..
! 18: *
! 19: * Purpose
! 20: * =======
! 21: *
! 22: * ZTFTTP copies a triangular matrix A from rectangular full packed
! 23: * format (TF) to standard packed format (TP).
! 24: *
! 25: * Arguments
! 26: * =========
! 27: *
! 28: * TRANSR (input) CHARACTER
! 29: * = 'N': ARF is in Normal format;
! 30: * = 'C': ARF is in Conjugate-transpose format;
! 31: *
! 32: * UPLO (input) CHARACTER
! 33: * = 'U': A is upper triangular;
! 34: * = 'L': A is lower triangular.
! 35: *
! 36: * N (input) INTEGER
! 37: * The order of the matrix A. N >= 0.
! 38: *
! 39: * ARF (input) COMPLEX*16 array, dimension ( N*(N+1)/2 ),
! 40: * On entry, the upper or lower triangular matrix A stored in
! 41: * RFP format. For a further discussion see Notes below.
! 42: *
! 43: * AP (output) COMPLEX*16 array, dimension ( N*(N+1)/2 ),
! 44: * On exit, the upper or lower triangular matrix A, packed
! 45: * columnwise in a linear array. The j-th column of A is stored
! 46: * in the array AP as follows:
! 47: * if UPLO = 'U', AP(i + (j-1)*j/2) = A(i,j) for 1<=i<=j;
! 48: * if UPLO = 'L', AP(i + (j-1)*(2n-j)/2) = A(i,j) for j<=i<=n.
! 49: *
! 50: * INFO (output) INTEGER
! 51: * = 0: successful exit
! 52: * < 0: if INFO = -i, the i-th argument had an illegal value
! 53: *
! 54: * Further Details
! 55: * ===============
! 56: *
! 57: * We first consider Standard Packed Format when N is even.
! 58: * We give an example where N = 6.
! 59: *
! 60: * AP is Upper AP is Lower
! 61: *
! 62: * 00 01 02 03 04 05 00
! 63: * 11 12 13 14 15 10 11
! 64: * 22 23 24 25 20 21 22
! 65: * 33 34 35 30 31 32 33
! 66: * 44 45 40 41 42 43 44
! 67: * 55 50 51 52 53 54 55
! 68: *
! 69: *
! 70: * Let TRANSR = 'N'. RFP holds AP as follows:
! 71: * For UPLO = 'U' the upper trapezoid A(0:5,0:2) consists of the last
! 72: * three columns of AP upper. The lower triangle A(4:6,0:2) consists of
! 73: * conjugate-transpose of the first three columns of AP upper.
! 74: * For UPLO = 'L' the lower trapezoid A(1:6,0:2) consists of the first
! 75: * three columns of AP lower. The upper triangle A(0:2,0:2) consists of
! 76: * conjugate-transpose of the last three columns of AP lower.
! 77: * To denote conjugate we place -- above the element. This covers the
! 78: * case N even and TRANSR = 'N'.
! 79: *
! 80: * RFP A RFP A
! 81: *
! 82: * -- -- --
! 83: * 03 04 05 33 43 53
! 84: * -- --
! 85: * 13 14 15 00 44 54
! 86: * --
! 87: * 23 24 25 10 11 55
! 88: *
! 89: * 33 34 35 20 21 22
! 90: * --
! 91: * 00 44 45 30 31 32
! 92: * -- --
! 93: * 01 11 55 40 41 42
! 94: * -- -- --
! 95: * 02 12 22 50 51 52
! 96: *
! 97: * Now let TRANSR = 'C'. RFP A in both UPLO cases is just the conjugate-
! 98: * transpose of RFP A above. One therefore gets:
! 99: *
! 100: *
! 101: * RFP A RFP A
! 102: *
! 103: * -- -- -- -- -- -- -- -- -- --
! 104: * 03 13 23 33 00 01 02 33 00 10 20 30 40 50
! 105: * -- -- -- -- -- -- -- -- -- --
! 106: * 04 14 24 34 44 11 12 43 44 11 21 31 41 51
! 107: * -- -- -- -- -- -- -- -- -- --
! 108: * 05 15 25 35 45 55 22 53 54 55 22 32 42 52
! 109: *
! 110: *
! 111: * We next consider Standard Packed Format when N is odd.
! 112: * We give an example where N = 5.
! 113: *
! 114: * AP is Upper AP is Lower
! 115: *
! 116: * 00 01 02 03 04 00
! 117: * 11 12 13 14 10 11
! 118: * 22 23 24 20 21 22
! 119: * 33 34 30 31 32 33
! 120: * 44 40 41 42 43 44
! 121: *
! 122: *
! 123: * Let TRANSR = 'N'. RFP holds AP as follows:
! 124: * For UPLO = 'U' the upper trapezoid A(0:4,0:2) consists of the last
! 125: * three columns of AP upper. The lower triangle A(3:4,0:1) consists of
! 126: * conjugate-transpose of the first two columns of AP upper.
! 127: * For UPLO = 'L' the lower trapezoid A(0:4,0:2) consists of the first
! 128: * three columns of AP lower. The upper triangle A(0:1,1:2) consists of
! 129: * conjugate-transpose of the last two columns of AP lower.
! 130: * To denote conjugate we place -- above the element. This covers the
! 131: * case N odd and TRANSR = 'N'.
! 132: *
! 133: * RFP A RFP A
! 134: *
! 135: * -- --
! 136: * 02 03 04 00 33 43
! 137: * --
! 138: * 12 13 14 10 11 44
! 139: *
! 140: * 22 23 24 20 21 22
! 141: * --
! 142: * 00 33 34 30 31 32
! 143: * -- --
! 144: * 01 11 44 40 41 42
! 145: *
! 146: * Now let TRANSR = 'C'. RFP A in both UPLO cases is just the conjugate-
! 147: * transpose of RFP A above. One therefore gets:
! 148: *
! 149: *
! 150: * RFP A RFP A
! 151: *
! 152: * -- -- -- -- -- -- -- -- --
! 153: * 02 12 22 00 01 00 10 20 30 40 50
! 154: * -- -- -- -- -- -- -- -- --
! 155: * 03 13 23 33 11 33 11 21 31 41 51
! 156: * -- -- -- -- -- -- -- -- --
! 157: * 04 14 24 34 44 43 44 22 32 42 52
! 158: *
! 159: * =====================================================================
! 160: *
! 161: * .. Parameters ..
! 162: * ..
! 163: * .. Local Scalars ..
! 164: LOGICAL LOWER, NISODD, NORMALTRANSR
! 165: INTEGER N1, N2, K, NT
! 166: INTEGER I, J, IJ
! 167: INTEGER IJP, JP, LDA, JS
! 168: * ..
! 169: * .. External Functions ..
! 170: LOGICAL LSAME
! 171: EXTERNAL LSAME
! 172: * ..
! 173: * .. External Subroutines ..
! 174: EXTERNAL XERBLA
! 175: * ..
! 176: * .. Intrinsic Functions ..
! 177: INTRINSIC DCONJG
! 178: * ..
! 179: * .. Intrinsic Functions ..
! 180: * ..
! 181: * .. Executable Statements ..
! 182: *
! 183: * Test the input parameters.
! 184: *
! 185: INFO = 0
! 186: NORMALTRANSR = LSAME( TRANSR, 'N' )
! 187: LOWER = LSAME( UPLO, 'L' )
! 188: IF( .NOT.NORMALTRANSR .AND. .NOT.LSAME( TRANSR, 'C' ) ) THEN
! 189: INFO = -1
! 190: ELSE IF( .NOT.LOWER .AND. .NOT.LSAME( UPLO, 'U' ) ) THEN
! 191: INFO = -2
! 192: ELSE IF( N.LT.0 ) THEN
! 193: INFO = -3
! 194: END IF
! 195: IF( INFO.NE.0 ) THEN
! 196: CALL XERBLA( 'ZTFTTP', -INFO )
! 197: RETURN
! 198: END IF
! 199: *
! 200: * Quick return if possible
! 201: *
! 202: IF( N.EQ.0 )
! 203: + RETURN
! 204: *
! 205: IF( N.EQ.1 ) THEN
! 206: IF( NORMALTRANSR ) THEN
! 207: AP( 0 ) = ARF( 0 )
! 208: ELSE
! 209: AP( 0 ) = DCONJG( ARF( 0 ) )
! 210: END IF
! 211: RETURN
! 212: END IF
! 213: *
! 214: * Size of array ARF(0:NT-1)
! 215: *
! 216: NT = N*( N+1 ) / 2
! 217: *
! 218: * Set N1 and N2 depending on LOWER
! 219: *
! 220: IF( LOWER ) THEN
! 221: N2 = N / 2
! 222: N1 = N - N2
! 223: ELSE
! 224: N1 = N / 2
! 225: N2 = N - N1
! 226: END IF
! 227: *
! 228: * If N is odd, set NISODD = .TRUE.
! 229: * If N is even, set K = N/2 and NISODD = .FALSE.
! 230: *
! 231: * set lda of ARF^C; ARF^C is (0:(N+1)/2-1,0:N-noe)
! 232: * where noe = 0 if n is even, noe = 1 if n is odd
! 233: *
! 234: IF( MOD( N, 2 ).EQ.0 ) THEN
! 235: K = N / 2
! 236: NISODD = .FALSE.
! 237: LDA = N + 1
! 238: ELSE
! 239: NISODD = .TRUE.
! 240: LDA = N
! 241: END IF
! 242: *
! 243: * ARF^C has lda rows and n+1-noe cols
! 244: *
! 245: IF( .NOT.NORMALTRANSR )
! 246: + LDA = ( N+1 ) / 2
! 247: *
! 248: * start execution: there are eight cases
! 249: *
! 250: IF( NISODD ) THEN
! 251: *
! 252: * N is odd
! 253: *
! 254: IF( NORMALTRANSR ) THEN
! 255: *
! 256: * N is odd and TRANSR = 'N'
! 257: *
! 258: IF( LOWER ) THEN
! 259: *
! 260: * SRPA for LOWER, NORMAL and N is odd ( a(0:n-1,0:n1-1) )
! 261: * T1 -> a(0,0), T2 -> a(0,1), S -> a(n1,0)
! 262: * T1 -> a(0), T2 -> a(n), S -> a(n1); lda = n
! 263: *
! 264: IJP = 0
! 265: JP = 0
! 266: DO J = 0, N2
! 267: DO I = J, N - 1
! 268: IJ = I + JP
! 269: AP( IJP ) = ARF( IJ )
! 270: IJP = IJP + 1
! 271: END DO
! 272: JP = JP + LDA
! 273: END DO
! 274: DO I = 0, N2 - 1
! 275: DO J = 1 + I, N2
! 276: IJ = I + J*LDA
! 277: AP( IJP ) = DCONJG( ARF( IJ ) )
! 278: IJP = IJP + 1
! 279: END DO
! 280: END DO
! 281: *
! 282: ELSE
! 283: *
! 284: * SRPA for UPPER, NORMAL and N is odd ( a(0:n-1,0:n2-1)
! 285: * T1 -> a(n1+1,0), T2 -> a(n1,0), S -> a(0,0)
! 286: * T1 -> a(n2), T2 -> a(n1), S -> a(0)
! 287: *
! 288: IJP = 0
! 289: DO J = 0, N1 - 1
! 290: IJ = N2 + J
! 291: DO I = 0, J
! 292: AP( IJP ) = DCONJG( ARF( IJ ) )
! 293: IJP = IJP + 1
! 294: IJ = IJ + LDA
! 295: END DO
! 296: END DO
! 297: JS = 0
! 298: DO J = N1, N - 1
! 299: IJ = JS
! 300: DO IJ = JS, JS + J
! 301: AP( IJP ) = ARF( IJ )
! 302: IJP = IJP + 1
! 303: END DO
! 304: JS = JS + LDA
! 305: END DO
! 306: *
! 307: END IF
! 308: *
! 309: ELSE
! 310: *
! 311: * N is odd and TRANSR = 'C'
! 312: *
! 313: IF( LOWER ) THEN
! 314: *
! 315: * SRPA for LOWER, TRANSPOSE and N is odd
! 316: * T1 -> A(0,0) , T2 -> A(1,0) , S -> A(0,n1)
! 317: * T1 -> a(0+0) , T2 -> a(1+0) , S -> a(0+n1*n1); lda=n1
! 318: *
! 319: IJP = 0
! 320: DO I = 0, N2
! 321: DO IJ = I*( LDA+1 ), N*LDA - 1, LDA
! 322: AP( IJP ) = DCONJG( ARF( IJ ) )
! 323: IJP = IJP + 1
! 324: END DO
! 325: END DO
! 326: JS = 1
! 327: DO J = 0, N2 - 1
! 328: DO IJ = JS, JS + N2 - J - 1
! 329: AP( IJP ) = ARF( IJ )
! 330: IJP = IJP + 1
! 331: END DO
! 332: JS = JS + LDA + 1
! 333: END DO
! 334: *
! 335: ELSE
! 336: *
! 337: * SRPA for UPPER, TRANSPOSE and N is odd
! 338: * T1 -> A(0,n1+1), T2 -> A(0,n1), S -> A(0,0)
! 339: * T1 -> a(n2*n2), T2 -> a(n1*n2), S -> a(0); lda = n2
! 340: *
! 341: IJP = 0
! 342: JS = N2*LDA
! 343: DO J = 0, N1 - 1
! 344: DO IJ = JS, JS + J
! 345: AP( IJP ) = ARF( IJ )
! 346: IJP = IJP + 1
! 347: END DO
! 348: JS = JS + LDA
! 349: END DO
! 350: DO I = 0, N1
! 351: DO IJ = I, I + ( N1+I )*LDA, LDA
! 352: AP( IJP ) = DCONJG( ARF( IJ ) )
! 353: IJP = IJP + 1
! 354: END DO
! 355: END DO
! 356: *
! 357: END IF
! 358: *
! 359: END IF
! 360: *
! 361: ELSE
! 362: *
! 363: * N is even
! 364: *
! 365: IF( NORMALTRANSR ) THEN
! 366: *
! 367: * N is even and TRANSR = 'N'
! 368: *
! 369: IF( LOWER ) THEN
! 370: *
! 371: * SRPA for LOWER, NORMAL, and N is even ( a(0:n,0:k-1) )
! 372: * T1 -> a(1,0), T2 -> a(0,0), S -> a(k+1,0)
! 373: * T1 -> a(1), T2 -> a(0), S -> a(k+1)
! 374: *
! 375: IJP = 0
! 376: JP = 0
! 377: DO J = 0, K - 1
! 378: DO I = J, N - 1
! 379: IJ = 1 + I + JP
! 380: AP( IJP ) = ARF( IJ )
! 381: IJP = IJP + 1
! 382: END DO
! 383: JP = JP + LDA
! 384: END DO
! 385: DO I = 0, K - 1
! 386: DO J = I, K - 1
! 387: IJ = I + J*LDA
! 388: AP( IJP ) = DCONJG( ARF( IJ ) )
! 389: IJP = IJP + 1
! 390: END DO
! 391: END DO
! 392: *
! 393: ELSE
! 394: *
! 395: * SRPA for UPPER, NORMAL, and N is even ( a(0:n,0:k-1) )
! 396: * T1 -> a(k+1,0) , T2 -> a(k,0), S -> a(0,0)
! 397: * T1 -> a(k+1), T2 -> a(k), S -> a(0)
! 398: *
! 399: IJP = 0
! 400: DO J = 0, K - 1
! 401: IJ = K + 1 + J
! 402: DO I = 0, J
! 403: AP( IJP ) = DCONJG( ARF( IJ ) )
! 404: IJP = IJP + 1
! 405: IJ = IJ + LDA
! 406: END DO
! 407: END DO
! 408: JS = 0
! 409: DO J = K, N - 1
! 410: IJ = JS
! 411: DO IJ = JS, JS + J
! 412: AP( IJP ) = ARF( IJ )
! 413: IJP = IJP + 1
! 414: END DO
! 415: JS = JS + LDA
! 416: END DO
! 417: *
! 418: END IF
! 419: *
! 420: ELSE
! 421: *
! 422: * N is even and TRANSR = 'C'
! 423: *
! 424: IF( LOWER ) THEN
! 425: *
! 426: * SRPA for LOWER, TRANSPOSE and N is even (see paper)
! 427: * T1 -> B(0,1), T2 -> B(0,0), S -> B(0,k+1)
! 428: * T1 -> a(0+k), T2 -> a(0+0), S -> a(0+k*(k+1)); lda=k
! 429: *
! 430: IJP = 0
! 431: DO I = 0, K - 1
! 432: DO IJ = I + ( I+1 )*LDA, ( N+1 )*LDA - 1, LDA
! 433: AP( IJP ) = DCONJG( ARF( IJ ) )
! 434: IJP = IJP + 1
! 435: END DO
! 436: END DO
! 437: JS = 0
! 438: DO J = 0, K - 1
! 439: DO IJ = JS, JS + K - J - 1
! 440: AP( IJP ) = ARF( IJ )
! 441: IJP = IJP + 1
! 442: END DO
! 443: JS = JS + LDA + 1
! 444: END DO
! 445: *
! 446: ELSE
! 447: *
! 448: * SRPA for UPPER, TRANSPOSE and N is even (see paper)
! 449: * T1 -> B(0,k+1), T2 -> B(0,k), S -> B(0,0)
! 450: * T1 -> a(0+k*(k+1)), T2 -> a(0+k*k), S -> a(0+0)); lda=k
! 451: *
! 452: IJP = 0
! 453: JS = ( K+1 )*LDA
! 454: DO J = 0, K - 1
! 455: DO IJ = JS, JS + J
! 456: AP( IJP ) = ARF( IJ )
! 457: IJP = IJP + 1
! 458: END DO
! 459: JS = JS + LDA
! 460: END DO
! 461: DO I = 0, K - 1
! 462: DO IJ = I, I + ( K+I )*LDA, LDA
! 463: AP( IJP ) = DCONJG( ARF( IJ ) )
! 464: IJP = IJP + 1
! 465: END DO
! 466: END DO
! 467: *
! 468: END IF
! 469: *
! 470: END IF
! 471: *
! 472: END IF
! 473: *
! 474: RETURN
! 475: *
! 476: * End of ZTFTTP
! 477: *
! 478: END
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