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

/* Subroutine */ int zlartg_(doublecomplex *f, doublecomplex *g, doublereal *
	cs, doublecomplex *sn, doublecomplex *r__)
{
/*  -- LAPACK auxiliary routine (version 3.1) --   
       Univ. of Tennessee, Univ. of California Berkeley and NAG Ltd..   
       November 2006   


    Purpose   
    =======   

    ZLARTG generates a plane rotation so that   

       [  CS  SN  ]     [ F ]     [ R ]   
       [  __      ]  .  [   ]  =  [   ]   where CS**2 + |SN|**2 = 1.   
       [ -SN  CS  ]     [ G ]     [ 0 ]   

    This is a faster version of the BLAS1 routine ZROTG, except for   
    the following differences:   
       F and G are unchanged on return.   
       If G=0, then CS=1 and SN=0.   
       If F=0, then CS=0 and SN is chosen so that R is real.   

    Arguments   
    =========   

    F       (input) COMPLEX*16   
            The first component of vector to be rotated.   

    G       (input) COMPLEX*16   
            The second component of vector to be rotated.   

    CS      (output) DOUBLE PRECISION   
            The cosine of the rotation.   

    SN      (output) COMPLEX*16   
            The sine of the rotation.   

    R       (output) COMPLEX*16   
            The nonzero component of the rotated vector.   

    Further Details   
    ======= =======   

    3-5-96 - 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.   

    =====================================================================   

       LOGICAL            FIRST   
       SAVE               FIRST, SAFMX2, SAFMIN, SAFMN2   
       DATA               FIRST / .TRUE. /   

       IF( FIRST ) THEN */
    /* System generated locals */
    integer i__1;
    doublereal d__1, d__2, d__3, d__4, d__5, d__6, d__7, d__8, d__9, d__10;
    doublecomplex z__1, z__2, z__3;
    /* Builtin functions */
    double log(doublereal), pow_di(doublereal *, integer *), d_imag(
	    doublecomplex *), sqrt(doublereal);
    void d_cnjg(doublecomplex *, doublecomplex *);
    /* Local variables */
    static doublereal d__;
    static integer i__;
    static doublereal f2, g2;
    static doublecomplex ff;
    static doublereal di, dr;
    static doublecomplex fs, gs;
    static doublereal f2s, g2s, eps, scale;
    static integer count;
    static doublereal safmn2;
    extern doublereal dlapy2_(doublereal *, doublereal *);
    static doublereal safmx2;
    extern doublereal dlamch_(char *);
    static doublereal safmin;

    safmin = dlamch_("S");
    eps = dlamch_("E");
    d__1 = dlamch_("B");
    i__1 = (integer) (log(safmin / eps) / log(dlamch_("B")) / 2.);
    safmn2 = pow_di(&d__1, &i__1);
    safmx2 = 1. / safmn2;
/*        FIRST = .FALSE.   
       END IF   
   Computing MAX   
   Computing MAX */
    d__7 = (d__1 = f->r, abs(d__1)), d__8 = (d__2 = d_imag(f), abs(d__2));
/* Computing MAX */
    d__9 = (d__3 = g->r, abs(d__3)), d__10 = (d__4 = d_imag(g), abs(d__4));
    d__5 = max(d__7,d__8), d__6 = max(d__9,d__10);
    scale = max(d__5,d__6);
    fs.r = f->r, fs.i = f->i;
    gs.r = g->r, gs.i = g->i;
    count = 0;
    if (scale >= safmx2) {
L10:
	++count;
	z__1.r = safmn2 * fs.r, z__1.i = safmn2 * fs.i;
	fs.r = z__1.r, fs.i = z__1.i;
	z__1.r = safmn2 * gs.r, z__1.i = safmn2 * gs.i;
	gs.r = z__1.r, gs.i = z__1.i;
	scale *= safmn2;
	if (scale >= safmx2) {
	    goto L10;
	}
    } else if (scale <= safmn2) {
	if (g->r == 0. && g->i == 0.) {
	    *cs = 1.;
	    sn->r = 0., sn->i = 0.;
	    r__->r = f->r, r__->i = f->i;
	    return 0;
	}
L20:
	--count;
	z__1.r = safmx2 * fs.r, z__1.i = safmx2 * fs.i;
	fs.r = z__1.r, fs.i = z__1.i;
	z__1.r = safmx2 * gs.r, z__1.i = safmx2 * gs.i;
	gs.r = z__1.r, gs.i = z__1.i;
	scale *= safmx2;
	if (scale <= safmn2) {
	    goto L20;
	}
    }
/* Computing 2nd power */
    d__1 = fs.r;
/* Computing 2nd power */
    d__2 = d_imag(&fs);
    f2 = d__1 * d__1 + d__2 * d__2;
/* Computing 2nd power */
    d__1 = gs.r;
/* Computing 2nd power */
    d__2 = d_imag(&gs);
    g2 = d__1 * d__1 + d__2 * d__2;
    if (f2 <= max(g2,1.) * safmin) {

/*        This is a rare case: F is very small. */

	if (f->r == 0. && f->i == 0.) {
	    *cs = 0.;
	    d__2 = g->r;
	    d__3 = d_imag(g);
	    d__1 = dlapy2_(&d__2, &d__3);
	    r__->r = d__1, r__->i = 0.;
/*           Do complex/real division explicitly with two real divisions */
	    d__1 = gs.r;
	    d__2 = d_imag(&gs);
	    d__ = dlapy2_(&d__1, &d__2);
	    d__1 = gs.r / d__;
	    d__2 = -d_imag(&gs) / d__;
	    z__1.r = d__1, z__1.i = d__2;
	    sn->r = z__1.r, sn->i = z__1.i;
	    return 0;
	}
	d__1 = fs.r;
	d__2 = d_imag(&fs);
	f2s = dlapy2_(&d__1, &d__2);
/*        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   
   Computing MAX */
	d__3 = (d__1 = f->r, abs(d__1)), d__4 = (d__2 = d_imag(f), abs(d__2));
	if (max(d__3,d__4) > 1.) {
	    d__1 = f->r;
	    d__2 = d_imag(f);
	    d__ = dlapy2_(&d__1, &d__2);
	    d__1 = f->r / d__;
	    d__2 = d_imag(f) / d__;
	    z__1.r = d__1, z__1.i = d__2;
	    ff.r = z__1.r, ff.i = z__1.i;
	} else {
	    dr = safmx2 * f->r;
	    di = safmx2 * d_imag(f);
	    d__ = dlapy2_(&dr, &di);
	    d__1 = dr / d__;
	    d__2 = di / d__;
	    z__1.r = d__1, z__1.i = d__2;
	    ff.r = z__1.r, ff.i = z__1.i;
	}
	d__1 = gs.r / g2s;
	d__2 = -d_imag(&gs) / g2s;
	z__2.r = d__1, z__2.i = d__2;
	z__1.r = ff.r * z__2.r - ff.i * z__2.i, z__1.i = ff.r * z__2.i + ff.i 
		* z__2.r;
	sn->r = z__1.r, sn->i = z__1.i;
	z__2.r = *cs * f->r, z__2.i = *cs * f->i;
	z__3.r = sn->r * g->r - sn->i * g->i, z__3.i = sn->r * g->i + sn->i * 
		g->r;
	z__1.r = z__2.r + z__3.r, z__1.i = z__2.i + z__3.i;
	r__->r = z__1.r, r__->i = z__1.i;
    } 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(g2 / f2 + 1.);
/*        Do the F2S(real)*FS(complex) multiply with two real multiplies */
	d__1 = f2s * fs.r;
	d__2 = f2s * d_imag(&fs);
	z__1.r = d__1, z__1.i = d__2;
	r__->r = z__1.r, r__->i = z__1.i;
	*cs = 1. / f2s;
	d__ = f2 + g2;
/*        Do complex/real division explicitly with two real divisions */
	d__1 = r__->r / d__;
	d__2 = d_imag(r__) / d__;
	z__1.r = d__1, z__1.i = d__2;
	sn->r = z__1.r, sn->i = z__1.i;
	d_cnjg(&z__2, &gs);
	z__1.r = sn->r * z__2.r - sn->i * z__2.i, z__1.i = sn->r * z__2.i + 
		sn->i * z__2.r;
	sn->r = z__1.r, sn->i = z__1.i;
	if (count != 0) {
	    if (count > 0) {
		i__1 = count;
		for (i__ = 1; i__ <= i__1; ++i__) {
		    z__1.r = safmx2 * r__->r, z__1.i = safmx2 * r__->i;
		    r__->r = z__1.r, r__->i = z__1.i;
/* L30: */
		}
	    } else {
		i__1 = -count;
		for (i__ = 1; i__ <= i__1; ++i__) {
		    z__1.r = safmn2 * r__->r, z__1.i = safmn2 * r__->i;
		    r__->r = z__1.r, r__->i = z__1.i;
/* L40: */
		}
	    }
	}
    }
    return 0;

/*     End of ZLARTG */

} /* zlartg_ */