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lartgs(3) Library Functions Manual lartgs(3)

NAME

lartgs - lartgs: generate plane rotation for bidiag SVD

SYNOPSIS

Functions


subroutine DLARTGS (x, y, sigma, cs, sn)
DLARTGS generates a plane rotation designed to introduce a bulge in implicit QR iteration for the bidiagonal SVD problem. subroutine SLARTGS (x, y, sigma, cs, sn)
SLARTGS generates a plane rotation designed to introduce a bulge in implicit QR iteration for the bidiagonal SVD problem.

Detailed Description

Function Documentation

subroutine DLARTGS (double precision x, double precision y, double precision sigma, double precision cs, double precision sn)

DLARTGS generates a plane rotation designed to introduce a bulge in implicit QR iteration for the bidiagonal SVD problem.

Purpose:

!>
!> DLARTGS generates a plane rotation designed to introduce a bulge in
!> Golub-Reinsch-style implicit QR iteration for the bidiagonal SVD
!> problem. X and Y are the top-row entries, and SIGMA is the shift.
!> The computed CS and SN define a plane rotation satisfying
!>
!>    [  CS  SN  ]  .  [ X^2 - SIGMA ]  =  [ R ],
!>    [ -SN  CS  ]     [    X * Y    ]     [ 0 ]
!>
!> with R nonnegative.  If X^2 - SIGMA and X * Y are 0, then the
!> rotation is by PI/2.
!>

Parameters

X 

!>          X is DOUBLE PRECISION
!>          The (1,1) entry of an upper bidiagonal matrix.
!>

Y

!>          Y is DOUBLE PRECISION
!>          The (1,2) entry of an upper bidiagonal matrix.
!>

SIGMA

!>          SIGMA is DOUBLE PRECISION
!>          The shift.
!>

CS

!>          CS is DOUBLE PRECISION
!>          The cosine of the rotation.
!>

SN

!>          SN is DOUBLE PRECISION
!>          The sine of the rotation.
!>

Author

Univ. of Tennessee

Univ. of California Berkeley

Univ. of Colorado Denver

NAG Ltd.

Definition at line 89 of file dlartgs.f.

subroutine SLARTGS (real x, real y, real sigma, real cs, real sn)

SLARTGS generates a plane rotation designed to introduce a bulge in implicit QR iteration for the bidiagonal SVD problem.

Purpose:

!>
!> SLARTGS generates a plane rotation designed to introduce a bulge in
!> Golub-Reinsch-style implicit QR iteration for the bidiagonal SVD
!> problem. X and Y are the top-row entries, and SIGMA is the shift.
!> The computed CS and SN define a plane rotation satisfying
!>
!>    [  CS  SN  ]  .  [ X^2 - SIGMA ]  =  [ R ],
!>    [ -SN  CS  ]     [    X * Y    ]     [ 0 ]
!>
!> with R nonnegative.  If X^2 - SIGMA and X * Y are 0, then the
!> rotation is by PI/2.
!>

Parameters

X 

!>          X is REAL
!>          The (1,1) entry of an upper bidiagonal matrix.
!>

Y

!>          Y is REAL
!>          The (1,2) entry of an upper bidiagonal matrix.
!>

SIGMA

!>          SIGMA is REAL
!>          The shift.
!>

CS

!>          CS is REAL
!>          The cosine of the rotation.
!>

SN

!>          SN is REAL
!>          The sine of the rotation.
!>

Author

Univ. of Tennessee

Univ. of California Berkeley

Univ. of Colorado Denver

NAG Ltd.

Definition at line 89 of file slartgs.f.

Author

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