◆ zlargv()

subroutine zlargv	(	integer	N,
		complex16, dimension( )	X,
		integer	INCX,
		complex16, dimension( )	Y,
		integer	INCY,
		double precision, dimension( * )	C,
		integer	INCC
	)

ZLARGV generates a vector of plane rotations with real cosines and complex sines.

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Purpose:

 ZLARGV generates a vector of complex plane rotations with real
 cosines, determined by elements of the complex vectors x and y.
 For i = 1,2,...,n

    (        c(i)   s(i) ) ( x(i) ) = ( r(i) )
    ( -conjg(s(i))  c(i) ) ( y(i) ) = (   0  )

    where c(i)**2 + ABS(s(i))**2 = 1

 The following conventions are used (these are the same as in ZLARTG,
 but differ from the BLAS1 routine ZROTG):
    If y(i)=0, then c(i)=1 and s(i)=0.
    If x(i)=0, then c(i)=0 and s(i) is chosen so that r(i) is real.

Parameters

[in]	N	N is INTEGER The number of plane rotations to be generated.
[in,out]	X	X is COMPLEX16 array, dimension (1+(N-1)INCX) On entry, the vector x. On exit, x(i) is overwritten by r(i), for i = 1,...,n.
[in]	INCX	INCX is INTEGER The increment between elements of X. INCX > 0.
[in,out]	Y	Y is COMPLEX16 array, dimension (1+(N-1)INCY) On entry, the vector y. On exit, the sines of the plane rotations.
[in]	INCY	INCY is INTEGER The increment between elements of Y. INCY > 0.
[out]	C	C is DOUBLE PRECISION array, dimension (1+(N-1)*INCC) The cosines of the plane rotations.
[in]	INCC	INCC is INTEGER The increment between elements of C. INCC > 0.

Author: Univ. of Tennessee; Univ. of California Berkeley; Univ. of Colorado Denver; NAG Ltd.

Date: December 2016

Further Details:

  6-6-96 - Modified with a new algorithm by W. Kahan and J. Demmel

  This version has a few statements commented out for thread safety
  (machine parameters are computed on each entry). 10 feb 03, SJH.

Definition at line 124 of file zlargv.f.

 *
 *  -- LAPACK auxiliary routine (version 3.7.0) --
 *  -- LAPACK is a software package provided by Univ. of Tennessee,    --
 *  -- Univ. of California Berkeley, Univ. of Colorado Denver and NAG Ltd..--
 *     December 2016
 *
 *     .. Scalar Arguments ..
       INTEGER            INCC, INCX, INCY, N
 *     ..
 *     .. Array Arguments ..
       DOUBLE PRECISION   C( * )
       COMPLEX*16         X( * ), Y( * )
 *     ..
 *
 *  =====================================================================
 *
 *     .. Parameters ..
       DOUBLE PRECISION   TWO, ONE, ZERO
       parameter( two = 2.0d+0, one = 1.0d+0, zero = 0.0d+0 )
       COMPLEX*16         CZERO
       parameter( czero = ( 0.0d+0, 0.0d+0 ) )
 *     ..
 *     .. Local Scalars ..
 *     LOGICAL            FIRST
  
       INTEGER            COUNT, I, IC, IX, IY, J
       DOUBLE PRECISION   CS, D, DI, DR, EPS, F2, F2S, G2, G2S, SAFMIN,
      $                   SAFMN2, SAFMX2, SCALE
       COMPLEX*16         F, FF, FS, G, GS, R, SN
 *     ..
 *     .. External Functions ..
       DOUBLE PRECISION   DLAMCH, DLAPY2
       EXTERNAL           dlamch, dlapy2
 *     ..
 *     .. Intrinsic Functions ..
       INTRINSIC          abs, dble, dcmplx, dconjg, dimag, int, log,
      $                   max, sqrt
 *     ..
 *     .. Statement Functions ..
       DOUBLE PRECISION   ABS1, ABSSQ
 *     ..
 *     .. Save statement ..
 *     SAVE               FIRST, SAFMX2, SAFMIN, SAFMN2
 *     ..
 *     .. Data statements ..
 *     DATA               FIRST / .TRUE. /
 *     ..
 *     .. Statement Function definitions ..
       abs1( ff ) = max( abs( dble( ff ) ), abs( dimag( ff ) ) )
       abssq( ff ) = dble( ff )**2 + dimag( ff )**2
 *     ..
 *     .. Executable Statements ..
 *
 *     IF( FIRST ) THEN
 *        FIRST = .FALSE.
          safmin = dlamch( 'S' )
          eps = dlamch( 'E' )
          safmn2 = dlamch( 'B' )**int( log( safmin / eps ) /
      $            log( dlamch( 'B' ) ) / two )
          safmx2 = one / safmn2
 *     END IF
       ix = 1
       iy = 1
       ic = 1
       DO 60 i = 1, n
          f = x( ix )
          g = y( iy )
 *
 *        Use identical algorithm as in ZLARTG
 *
          scale = max( abs1( f ), abs1( g ) )
          fs = f
          gs = g
          count = 0
          IF( scale.GE.safmx2 ) THEN
    10       CONTINUE
             count = count + 1
             fs = fs*safmn2
             gs = gs*safmn2
             scale = scale*safmn2
             IF( scale.GE.safmx2 )
      $         GO TO 10
          ELSE IF( scale.LE.safmn2 ) THEN
             IF( g.EQ.czero ) THEN
                cs = one
                sn = czero
                r = f
                GO TO 50
             END IF
    20       CONTINUE
             count = count - 1
             fs = fs*safmx2
             gs = gs*safmx2
             scale = scale*safmx2
             IF( scale.LE.safmn2 )
      $         GO TO 20
          END IF
          f2 = abssq( fs )
          g2 = abssq( gs )
          IF( f2.LE.max( g2, one )*safmin ) THEN
 *
 *           This is a rare case: F is very small.
 *
             IF( f.EQ.czero ) THEN
                cs = zero
                r = dlapy2( dble( g ), dimag( g ) )
 *              Do complex/real division explicitly with two real
 *              divisions
                d = dlapy2( dble( gs ), dimag( gs ) )
                sn = dcmplx( dble( gs ) / d, -dimag( gs ) / d )
                GO TO 50
             END IF
             f2s = dlapy2( dble( fs ), dimag( fs ) )
 *           G2 and G2S are accurate
 *           G2 is at least SAFMIN, and G2S is at least SAFMN2
             g2s = sqrt( g2 )
 *           Error in CS from underflow in F2S is at most
 *           UNFL / SAFMN2 .lt. sqrt(UNFL*EPS) .lt. EPS
 *           If MAX(G2,ONE)=G2, then F2 .lt. G2*SAFMIN,
 *           and so CS .lt. sqrt(SAFMIN)
 *           If MAX(G2,ONE)=ONE, then F2 .lt. SAFMIN
 *           and so CS .lt. sqrt(SAFMIN)/SAFMN2 = sqrt(EPS)
 *           Therefore, CS = F2S/G2S / sqrt( 1 + (F2S/G2S)**2 ) = F2S/G2S
             cs = f2s / g2s
 *           Make sure abs(FF) = 1
 *           Do complex/real division explicitly with 2 real divisions
             IF( abs1( f ).GT.one ) THEN
                d = dlapy2( dble( f ), dimag( f ) )
                ff = dcmplx( dble( f ) / d, dimag( f ) / d )
             ELSE
                dr = safmx2*dble( f )
                di = safmx2*dimag( f )
                d = dlapy2( dr, di )
                ff = dcmplx( dr / d, di / d )
             END IF
             sn = ff*dcmplx( dble( gs ) / g2s, -dimag( gs ) / g2s )
             r = cs*f + sn*g
          ELSE
 *
 *           This is the most common case.
 *           Neither F2 nor F2/G2 are less than SAFMIN
 *           F2S cannot overflow, and it is accurate
 *
             f2s = sqrt( one+g2 / f2 )
 *           Do the F2S(real)*FS(complex) multiply with two real
 *           multiplies
             r = dcmplx( f2s*dble( fs ), f2s*dimag( fs ) )
             cs = one / f2s
             d = f2 + g2
 *           Do complex/real division explicitly with two real divisions
             sn = dcmplx( dble( r ) / d, dimag( r ) / d )
             sn = sn*dconjg( gs )
             IF( count.NE.0 ) THEN
                IF( count.GT.0 ) THEN
                   DO 30 j = 1, count
                      r = r*safmx2
    30             CONTINUE
                ELSE
                   DO 40 j = 1, -count
                      r = r*safmn2
    40             CONTINUE
                END IF
             END IF
          END IF
    50    CONTINUE
          c( ic ) = cs
          y( iy ) = sn
          x( ix ) = r
          ic = ic + incc
          iy = iy + incy
          ix = ix + incx
    60 CONTINUE
       RETURN
 *
 *     End of ZLARGV
 *

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