zlarot.c

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/* zlarot.f -- translated by f2c (version 20061008).
   You must link the resulting object file with libf2c:
        on Microsoft Windows system, link with libf2c.lib;
        on Linux or Unix systems, link with .../path/to/libf2c.a -lm
        or, if you install libf2c.a in a standard place, with -lf2c -lm
        -- in that order, at the end of the command line, as in
                cc *.o -lf2c -lm
        Source for libf2c is in /netlib/f2c/libf2c.zip, e.g.,

                http://www.netlib.org/f2c/libf2c.zip
*/

#include "f2c.h"
#include "blaswrap.h"

/* Table of constant values */

static integer c__4 = 4;
static integer c__8 = 8;

/* Subroutine */ int zlarot_(logical *lrows, logical *lleft, logical *lright, 
        integer *nl, doublecomplex *c__, doublecomplex *s, doublecomplex *a, 
        integer *lda, doublecomplex *xleft, doublecomplex *xright)
{
    /* System generated locals */
    integer i__1, i__2, i__3, i__4;
    doublecomplex z__1, z__2, z__3, z__4, z__5, z__6;

    /* Builtin functions */
    void d_cnjg(doublecomplex *, doublecomplex *);

    /* Local variables */
    integer j, ix, iy, nt;
    doublecomplex xt[2], yt[2];
    integer iyt, iinc, inext;
    doublecomplex tempx;
    extern /* Subroutine */ int xerbla_(char *, integer *);


/*  -- LAPACK auxiliary test routine (version 3.1) -- */
/*     Univ. of Tennessee, Univ. of California Berkeley and NAG Ltd.. */
/*     November 2006 */

/*     .. Scalar Arguments .. */
/*     .. */
/*     .. Array Arguments .. */
/*     .. */

/*  Purpose */
/*  ======= */

/*     ZLAROT applies a (Givens) rotation to two adjacent rows or */
/*     columns, where one element of the first and/or last column/row */
/*     for use on matrices stored in some format other than GE, so */
/*     that elements of the matrix may be used or modified for which */
/*     no array element is provided. */

/*     One example is a symmetric matrix in SB format (bandwidth=4), for */
/*     which UPLO='L':  Two adjacent rows will have the format: */

/*     row j:     *  *  *  *  *  .  .  .  . */
/*     row j+1:      *  *  *  *  *  .  .  .  . */

/*     '*' indicates elements for which storage is provided, */
/*     '.' indicates elements for which no storage is provided, but */
/*     are not necessarily zero; their values are determined by */
/*     symmetry.  ' ' indicates elements which are necessarily zero, */
/*      and have no storage provided. */

/*     Those columns which have two '*'s can be handled by DROT. */
/*     Those columns which have no '*'s can be ignored, since as long */
/*     as the Givens rotations are carefully applied to preserve */
/*     symmetry, their values are determined. */
/*     Those columns which have one '*' have to be handled separately, */
/*     by using separate variables "p" and "q": */

/*     row j:     *  *  *  *  *  p  .  .  . */
/*     row j+1:   q  *  *  *  *  *  .  .  .  . */

/*     The element p would have to be set correctly, then that column */
/*     is rotated, setting p to its new value.  The next call to */
/*     ZLAROT would rotate columns j and j+1, using p, and restore */
/*     symmetry.  The element q would start out being zero, and be */
/*     made non-zero by the rotation.  Later, rotations would presumably */
/*     be chosen to zero q out. */

/*     Typical Calling Sequences: rotating the i-th and (i+1)-st rows. */
/*     ------- ------- --------- */

/*       General dense matrix: */

/*               CALL ZLAROT(.TRUE.,.FALSE.,.FALSE., N, C,S, */
/*                       A(i,1),LDA, DUMMY, DUMMY) */

/*       General banded matrix in GB format: */

/*               j = MAX(1, i-KL ) */
/*               NL = MIN( N, i+KU+1 ) + 1-j */
/*               CALL ZLAROT( .TRUE., i-KL.GE.1, i+KU.LT.N, NL, C,S, */
/*                       A(KU+i+1-j,j),LDA-1, XLEFT, XRIGHT ) */

/*               [ note that i+1-j is just MIN(i,KL+1) ] */

/*       Symmetric banded matrix in SY format, bandwidth K, */
/*       lower triangle only: */

/*               j = MAX(1, i-K ) */
/*               NL = MIN( K+1, i ) + 1 */
/*               CALL ZLAROT( .TRUE., i-K.GE.1, .TRUE., NL, C,S, */
/*                       A(i,j), LDA, XLEFT, XRIGHT ) */

/*       Same, but upper triangle only: */

/*               NL = MIN( K+1, N-i ) + 1 */
/*               CALL ZLAROT( .TRUE., .TRUE., i+K.LT.N, NL, C,S, */
/*                       A(i,i), LDA, XLEFT, XRIGHT ) */

/*       Symmetric banded matrix in SB format, bandwidth K, */
/*       lower triangle only: */

/*               [ same as for SY, except:] */
/*                   . . . . */
/*                       A(i+1-j,j), LDA-1, XLEFT, XRIGHT ) */

/*               [ note that i+1-j is just MIN(i,K+1) ] */

/*       Same, but upper triangle only: */
/*                   . . . */
/*                       A(K+1,i), LDA-1, XLEFT, XRIGHT ) */

/*       Rotating columns is just the transpose of rotating rows, except */
/*       for GB and SB: (rotating columns i and i+1) */

/*       GB: */
/*               j = MAX(1, i-KU ) */
/*               NL = MIN( N, i+KL+1 ) + 1-j */
/*               CALL ZLAROT( .TRUE., i-KU.GE.1, i+KL.LT.N, NL, C,S, */
/*                       A(KU+j+1-i,i),LDA-1, XTOP, XBOTTM ) */

/*               [note that KU+j+1-i is just MAX(1,KU+2-i)] */

/*       SB: (upper triangle) */

/*                    . . . . . . */
/*                       A(K+j+1-i,i),LDA-1, XTOP, XBOTTM ) */

/*       SB: (lower triangle) */

/*                    . . . . . . */
/*                       A(1,i),LDA-1, XTOP, XBOTTM ) */

/*  Arguments */
/*  ========= */

/*  LROWS  - LOGICAL */
/*           If .TRUE., then ZLAROT will rotate two rows.  If .FALSE., */
/*           then it will rotate two columns. */
/*           Not modified. */

/*  LLEFT  - LOGICAL */
/*           If .TRUE., then XLEFT will be used instead of the */
/*           corresponding element of A for the first element in the */
/*           second row (if LROWS=.FALSE.) or column (if LROWS=.TRUE.) */
/*           If .FALSE., then the corresponding element of A will be */
/*           used. */
/*           Not modified. */

/*  LRIGHT - LOGICAL */
/*           If .TRUE., then XRIGHT will be used instead of the */
/*           corresponding element of A for the last element in the */
/*           first row (if LROWS=.FALSE.) or column (if LROWS=.TRUE.) If */
/*           .FALSE., then the corresponding element of A will be used. */
/*           Not modified. */

/*  NL     - INTEGER */
/*           The length of the rows (if LROWS=.TRUE.) or columns (if */
/*           LROWS=.FALSE.) to be rotated.  If XLEFT and/or XRIGHT are */
/*           used, the columns/rows they are in should be included in */
/*           NL, e.g., if LLEFT = LRIGHT = .TRUE., then NL must be at */
/*           least 2.  The number of rows/columns to be rotated */
/*           exclusive of those involving XLEFT and/or XRIGHT may */
/*           not be negative, i.e., NL minus how many of LLEFT and */
/*           LRIGHT are .TRUE. must be at least zero; if not, XERBLA */
/*           will be called. */
/*           Not modified. */

/*  C, S   - COMPLEX*16 */
/*           Specify the Givens rotation to be applied.  If LROWS is */
/*           true, then the matrix ( c  s ) */
/*                                 ( _  _ ) */
/*                                 (-s  c )  is applied from the left; */
/*           if false, then the transpose (not conjugated) thereof is */
/*           applied from the right.  Note that in contrast to the */
/*           output of ZROTG or to most versions of ZROT, both C and S */
/*           are complex.  For a Givens rotation, |C|**2 + |S|**2 should */
/*           be 1, but this is not checked. */
/*           Not modified. */

/*  A      - COMPLEX*16 array. */
/*           The array containing the rows/columns to be rotated.  The */
/*           first element of A should be the upper left element to */
/*           be rotated. */
/*           Read and modified. */

/*  LDA    - INTEGER */
/*           The "effective" leading dimension of A.  If A contains */
/*           a matrix stored in GE, HE, or SY format, then this is just */
/*           the leading dimension of A as dimensioned in the calling */
/*           routine.  If A contains a matrix stored in band (GB, HB, or */
/*           SB) format, then this should be *one less* than the leading */
/*           dimension used in the calling routine.  Thus, if A were */
/*           dimensioned A(LDA,*) in ZLAROT, then A(1,j) would be the */
/*           j-th element in the first of the two rows to be rotated, */
/*           and A(2,j) would be the j-th in the second, regardless of */
/*           how the array may be stored in the calling routine.  [A */
/*           cannot, however, actually be dimensioned thus, since for */
/*           band format, the row number may exceed LDA, which is not */
/*           legal FORTRAN.] */
/*           If LROWS=.TRUE., then LDA must be at least 1, otherwise */
/*           it must be at least NL minus the number of .TRUE. values */
/*           in XLEFT and XRIGHT. */
/*           Not modified. */

/*  XLEFT  - COMPLEX*16 */
/*           If LLEFT is .TRUE., then XLEFT will be used and modified */
/*           instead of A(2,1) (if LROWS=.TRUE.) or A(1,2) */
/*           (if LROWS=.FALSE.). */
/*           Read and modified. */

/*  XRIGHT - COMPLEX*16 */
/*           If LRIGHT is .TRUE., then XRIGHT will be used and modified */
/*           instead of A(1,NL) (if LROWS=.TRUE.) or A(NL,1) */
/*           (if LROWS=.FALSE.). */
/*           Read and modified. */

/*  ===================================================================== */

/*     .. Local Scalars .. */
/*     .. */
/*     .. Local Arrays .. */
/*     .. */
/*     .. External Subroutines .. */
/*     .. */
/*     .. Intrinsic Functions .. */
/*     .. */
/*     .. Executable Statements .. */

/*     Set up indices, arrays for ends */

    /* Parameter adjustments */
    --a;

    /* Function Body */
    if (*lrows) {
        iinc = *lda;
        inext = 1;
    } else {
        iinc = 1;
        inext = *lda;
    }

    if (*lleft) {
        nt = 1;
        ix = iinc + 1;
        iy = *lda + 2;
        xt[0].r = a[1].r, xt[0].i = a[1].i;
        yt[0].r = xleft->r, yt[0].i = xleft->i;
    } else {
        nt = 0;
        ix = 1;
        iy = inext + 1;
    }

    if (*lright) {
        iyt = inext + 1 + (*nl - 1) * iinc;
        ++nt;
        i__1 = nt - 1;
        xt[i__1].r = xright->r, xt[i__1].i = xright->i;
        i__1 = nt - 1;
        i__2 = iyt;
        yt[i__1].r = a[i__2].r, yt[i__1].i = a[i__2].i;
    }

/*     Check for errors */

    if (*nl < nt) {
        xerbla_("ZLAROT", &c__4);
        return 0;
    }
    if (*lda <= 0 || ! (*lrows) && *lda < *nl - nt) {
        xerbla_("ZLAROT", &c__8);
        return 0;
    }

/*     Rotate */

/*     ZROT( NL-NT, A(IX),IINC, A(IY),IINC, C, S ) with complex C, S */

    i__1 = *nl - nt - 1;
    for (j = 0; j <= i__1; ++j) {
        i__2 = ix + j * iinc;
        z__2.r = c__->r * a[i__2].r - c__->i * a[i__2].i, z__2.i = c__->r * a[
                i__2].i + c__->i * a[i__2].r;
        i__3 = iy + j * iinc;
        z__3.r = s->r * a[i__3].r - s->i * a[i__3].i, z__3.i = s->r * a[i__3]
                .i + s->i * a[i__3].r;
        z__1.r = z__2.r + z__3.r, z__1.i = z__2.i + z__3.i;
        tempx.r = z__1.r, tempx.i = z__1.i;
        i__2 = iy + j * iinc;
        d_cnjg(&z__4, s);
        z__3.r = -z__4.r, z__3.i = -z__4.i;
        i__3 = ix + j * iinc;
        z__2.r = z__3.r * a[i__3].r - z__3.i * a[i__3].i, z__2.i = z__3.r * a[
                i__3].i + z__3.i * a[i__3].r;
        d_cnjg(&z__6, c__);
        i__4 = iy + j * iinc;
        z__5.r = z__6.r * a[i__4].r - z__6.i * a[i__4].i, z__5.i = z__6.r * a[
                i__4].i + z__6.i * a[i__4].r;
        z__1.r = z__2.r + z__5.r, z__1.i = z__2.i + z__5.i;
        a[i__2].r = z__1.r, a[i__2].i = z__1.i;
        i__2 = ix + j * iinc;
        a[i__2].r = tempx.r, a[i__2].i = tempx.i;
/* L10: */
    }

/*     ZROT( NT, XT,1, YT,1, C, S ) with complex C, S */

    i__1 = nt;
    for (j = 1; j <= i__1; ++j) {
        i__2 = j - 1;
        z__2.r = c__->r * xt[i__2].r - c__->i * xt[i__2].i, z__2.i = c__->r * 
                xt[i__2].i + c__->i * xt[i__2].r;
        i__3 = j - 1;
        z__3.r = s->r * yt[i__3].r - s->i * yt[i__3].i, z__3.i = s->r * yt[
                i__3].i + s->i * yt[i__3].r;
        z__1.r = z__2.r + z__3.r, z__1.i = z__2.i + z__3.i;
        tempx.r = z__1.r, tempx.i = z__1.i;
        i__2 = j - 1;
        d_cnjg(&z__4, s);
        z__3.r = -z__4.r, z__3.i = -z__4.i;
        i__3 = j - 1;
        z__2.r = z__3.r * xt[i__3].r - z__3.i * xt[i__3].i, z__2.i = z__3.r * 
                xt[i__3].i + z__3.i * xt[i__3].r;
        d_cnjg(&z__6, c__);
        i__4 = j - 1;
        z__5.r = z__6.r * yt[i__4].r - z__6.i * yt[i__4].i, z__5.i = z__6.r * 
                yt[i__4].i + z__6.i * yt[i__4].r;
        z__1.r = z__2.r + z__5.r, z__1.i = z__2.i + z__5.i;
        yt[i__2].r = z__1.r, yt[i__2].i = z__1.i;
        i__2 = j - 1;
        xt[i__2].r = tempx.r, xt[i__2].i = tempx.i;
/* L20: */
    }

/*     Stuff values back into XLEFT, XRIGHT, etc. */

    if (*lleft) {
        a[1].r = xt[0].r, a[1].i = xt[0].i;
        xleft->r = yt[0].r, xleft->i = yt[0].i;
    }

    if (*lright) {
        i__1 = nt - 1;
        xright->r = xt[i__1].r, xright->i = xt[i__1].i;
        i__1 = iyt;
        i__2 = nt - 1;
        a[i__1].r = yt[i__2].r, a[i__1].i = yt[i__2].i;
    }

    return 0;

/*     End of ZLAROT */

} /* zlarot_ */