◆ slasd5()

subroutine slasd5	(	integer	I,
		real, dimension( 2 )	D,
		real, dimension( 2 )	Z,
		real, dimension( 2 )	DELTA,
		real	RHO,
		real	DSIGMA,
		real, dimension( 2 )	WORK
	)

SLASD5 computes the square root of the i-th eigenvalue of a positive symmetric rank-one modification of a 2-by-2 diagonal matrix. Used by sbdsdc.

Download SLASD5 + dependencies [TGZ] [ZIP] [TXT]

Purpose:

 This subroutine computes the square root of the I-th eigenvalue
 of a positive symmetric rank-one modification of a 2-by-2 diagonal
 matrix

            diag( D ) * diag( D ) +  RHO * Z * transpose(Z) .

 The diagonal entries in the array D are assumed to satisfy

            0 <= D(i) < D(j)  for  i < j .

 We also assume RHO > 0 and that the Euclidean norm of the vector
 Z is one.

Parameters

[in]	I	I is INTEGER The index of the eigenvalue to be computed. I = 1 or I = 2.
[in]	D	D is REAL array, dimension (2) The original eigenvalues. We assume 0 <= D(1) < D(2).
[in]	Z	Z is REAL array, dimension (2) The components of the updating vector.
[out]	DELTA	DELTA is REAL array, dimension (2) Contains (D(j) - sigma_I) in its j-th component. The vector DELTA contains the information necessary to construct the eigenvectors.
[in]	RHO	RHO is REAL The scalar in the symmetric updating formula.
[out]	DSIGMA	DSIGMA is REAL The computed sigma_I, the I-th updated eigenvalue.
[out]	WORK	WORK is REAL array, dimension (2) WORK contains (D(j) + sigma_I) in its j-th component.

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

Date: December 2016

Contributors:: Ren-Cang Li, Computer Science Division, University of California at Berkeley, USA

Definition at line 118 of file slasd5.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            I
       REAL               DSIGMA, RHO
 *     ..
 *     .. Array Arguments ..
       REAL               D( 2 ), DELTA( 2 ), WORK( 2 ), Z( 2 )
 *     ..
 *
 *  =====================================================================
 *
 *     .. Parameters ..
       REAL               ZERO, ONE, TWO, THREE, FOUR
       parameter( zero = 0.0e+0, one = 1.0e+0, two = 2.0e+0,
      $                   three = 3.0e+0, four = 4.0e+0 )
 *     ..
 *     .. Local Scalars ..
       REAL               B, C, DEL, DELSQ, TAU, W
 *     ..
 *     .. Intrinsic Functions ..
       INTRINSIC          abs, sqrt
 *     ..
 *     .. Executable Statements ..
 *
       del = d( 2 ) - d( 1 )
       delsq = del*( d( 2 )+d( 1 ) )
       IF( i.EQ.1 ) THEN
          w = one + four*rho*( z( 2 )*z( 2 ) / ( d( 1 )+three*d( 2 ) )-
      $       z( 1 )*z( 1 ) / ( three*d( 1 )+d( 2 ) ) ) / del
          IF( w.GT.zero ) THEN
             b = delsq + rho*( z( 1 )*z( 1 )+z( 2 )*z( 2 ) )
             c = rho*z( 1 )*z( 1 )*delsq
 *
 *           B > ZERO, always
 *
 *           The following TAU is DSIGMA * DSIGMA - D( 1 ) * D( 1 )
 *
             tau = two*c / ( b+sqrt( abs( b*b-four*c ) ) )
 *
 *           The following TAU is DSIGMA - D( 1 )
 *
             tau = tau / ( d( 1 )+sqrt( d( 1 )*d( 1 )+tau ) )
             dsigma = d( 1 ) + tau
             delta( 1 ) = -tau
             delta( 2 ) = del - tau
             work( 1 ) = two*d( 1 ) + tau
             work( 2 ) = ( d( 1 )+tau ) + d( 2 )
 *           DELTA( 1 ) = -Z( 1 ) / TAU
 *           DELTA( 2 ) = Z( 2 ) / ( DEL-TAU )
          ELSE
             b = -delsq + rho*( z( 1 )*z( 1 )+z( 2 )*z( 2 ) )
             c = rho*z( 2 )*z( 2 )*delsq
 *
 *           The following TAU is DSIGMA * DSIGMA - D( 2 ) * D( 2 )
 *
             IF( b.GT.zero ) THEN
                tau = -two*c / ( b+sqrt( b*b+four*c ) )
             ELSE
                tau = ( b-sqrt( b*b+four*c ) ) / two
             END IF
 *
 *           The following TAU is DSIGMA - D( 2 )
 *
             tau = tau / ( d( 2 )+sqrt( abs( d( 2 )*d( 2 )+tau ) ) )
             dsigma = d( 2 ) + tau
             delta( 1 ) = -( del+tau )
             delta( 2 ) = -tau
             work( 1 ) = d( 1 ) + tau + d( 2 )
             work( 2 ) = two*d( 2 ) + tau
 *           DELTA( 1 ) = -Z( 1 ) / ( DEL+TAU )
 *           DELTA( 2 ) = -Z( 2 ) / TAU
          END IF
 *        TEMP = SQRT( DELTA( 1 )*DELTA( 1 )+DELTA( 2 )*DELTA( 2 ) )
 *        DELTA( 1 ) = DELTA( 1 ) / TEMP
 *        DELTA( 2 ) = DELTA( 2 ) / TEMP
       ELSE
 *
 *        Now I=2
 *
          b = -delsq + rho*( z( 1 )*z( 1 )+z( 2 )*z( 2 ) )
          c = rho*z( 2 )*z( 2 )*delsq
 *
 *        The following TAU is DSIGMA * DSIGMA - D( 2 ) * D( 2 )
 *
          IF( b.GT.zero ) THEN
             tau = ( b+sqrt( b*b+four*c ) ) / two
          ELSE
             tau = two*c / ( -b+sqrt( b*b+four*c ) )
          END IF
 *
 *        The following TAU is DSIGMA - D( 2 )
 *
          tau = tau / ( d( 2 )+sqrt( d( 2 )*d( 2 )+tau ) )
          dsigma = d( 2 ) + tau
          delta( 1 ) = -( del+tau )
          delta( 2 ) = -tau
          work( 1 ) = d( 1 ) + tau + d( 2 )
          work( 2 ) = two*d( 2 ) + tau
 *        DELTA( 1 ) = -Z( 1 ) / ( DEL+TAU )
 *        DELTA( 2 ) = -Z( 2 ) / TAU
 *        TEMP = SQRT( DELTA( 1 )*DELTA( 1 )+DELTA( 2 )*DELTA( 2 ) )
 *        DELTA( 1 ) = DELTA( 1 ) / TEMP
 *        DELTA( 2 ) = DELTA( 2 ) / TEMP
       END IF
       RETURN
 *
 *     End of SLASD5
 *

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