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NAME
zlaev2 - compute the eigendecomposition of a 2-by-2 Hermi-
tian matrix [ A B ] [ CONJG(B) C ]
SYNOPSIS
SUBROUTINE ZLAEV2( A, B, C, RT1, RT2, CS1, SN1 )
DOUBLE PRECISION CS1, RT1, RT2
COMPLEX*16 A, B, C, SN1
#include <sunperf.h>
void zlaev2(doublecomplex *za, doublecomplex *zb, doublecom-
plex *zc, double *rt1, double *rt2, double *cs1,
doublecomplex *sn1) ;
PURPOSE
ZLAEV2 computes the eigendecomposition of a 2-by-2 Hermitian
matrix
[ A B ]
[ CONJG(B) C ].
On return, RT1 is the eigenvalue of larger absolute value,
RT2 is the eigenvalue of smaller absolute value, and
(CS1,SN1) is the unit right eigenvector for RT1, giving the
decomposition
[ CS1 CONJG(SN1) ] [ A B ] [ CS1 -CONJG(SN1) ] = [ RT1 0 ]
[-SN1 CS1 ] [ CONJG(B) C ] [ SN1 CS1 ] [ 0 RT2 ]
ARGUMENTS
A (input) COMPLEX*16
The (1,1) element of the 2-by-2 matrix.
B (input) COMPLEX*16
The (1,2) element and the conjugate of the (2,1)
element of the 2-by-2 matrix.
C (input) COMPLEX*16
The (2,2) element of the 2-by-2 matrix.
RT1 (output) DOUBLE PRECISION
The eigenvalue of larger absolute value.
RT2 (output) DOUBLE PRECISION
The eigenvalue of smaller absolute value.
CS1 (output) DOUBLE PRECISION
SN1 (output) COMPLEX*16 The vector (CS1, SN1)
is a unit right eigenvector for RT1.
FURTHER DETAILS
RT1 is accurate to a few ulps barring over/underflow.
RT2 may be inaccurate if there is massive cancellation in
the determinant A*C-B*B; higher precision or correctly
rounded or correctly truncated arithmetic would be needed to
compute RT2 accurately in all cases.
CS1 and SN1 are accurate to a few ulps barring
over/underflow.
Overflow is possible only if RT1 is within a factor of 5 of
overflow. Underflow is harmless if the input data is 0 or
exceeds
underflow_threshold / macheps.
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