LAPACK
3.4.2
LAPACK: Linear Algebra PACKage

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Functions/Subroutines  
subroutine  slag2 (A, LDA, B, LDB, SAFMIN, SCALE1, SCALE2, WR1, WR2, WI) 
SLAG2 computes the eigenvalues of a 2by2 generalized eigenvalue problem, with scaling as necessary to avoid over/underflow. 
subroutine slag2  (  real, dimension( lda, * )  A, 
integer  LDA,  
real, dimension( ldb, * )  B,  
integer  LDB,  
real  SAFMIN,  
real  SCALE1,  
real  SCALE2,  
real  WR1,  
real  WR2,  
real  WI  
) 
SLAG2 computes the eigenvalues of a 2by2 generalized eigenvalue problem, with scaling as necessary to avoid over/underflow.
Download SLAG2 + dependencies [TGZ] [ZIP] [TXT]SLAG2 computes the eigenvalues of a 2 x 2 generalized eigenvalue problem A  w B, with scaling as necessary to avoid over/underflow. The scaling factor "s" results in a modified eigenvalue equation s A  w B where s is a nonnegative scaling factor chosen so that w, w B, and s A do not overflow and, if possible, do not underflow, either.
[in]  A  A is REAL array, dimension (LDA, 2) On entry, the 2 x 2 matrix A. It is assumed that its 1norm is less than 1/SAFMIN. Entries less than sqrt(SAFMIN)*norm(A) are subject to being treated as zero. 
[in]  LDA  LDA is INTEGER The leading dimension of the array A. LDA >= 2. 
[in]  B  B is REAL array, dimension (LDB, 2) On entry, the 2 x 2 upper triangular matrix B. It is assumed that the onenorm of B is less than 1/SAFMIN. The diagonals should be at least sqrt(SAFMIN) times the largest element of B (in absolute value); if a diagonal is smaller than that, then +/ sqrt(SAFMIN) will be used instead of that diagonal. 
[in]  LDB  LDB is INTEGER The leading dimension of the array B. LDB >= 2. 
[in]  SAFMIN  SAFMIN is REAL The smallest positive number s.t. 1/SAFMIN does not overflow. (This should always be SLAMCH('S')  it is an argument in order to avoid having to call SLAMCH frequently.) 
[out]  SCALE1  SCALE1 is REAL A scaling factor used to avoid over/underflow in the eigenvalue equation which defines the first eigenvalue. If the eigenvalues are complex, then the eigenvalues are ( WR1 +/ WI i ) / SCALE1 (which may lie outside the exponent range of the machine), SCALE1=SCALE2, and SCALE1 will always be positive. If the eigenvalues are real, then the first (real) eigenvalue is WR1 / SCALE1 , but this may overflow or underflow, and in fact, SCALE1 may be zero or less than the underflow threshhold if the exact eigenvalue is sufficiently large. 
[out]  SCALE2  SCALE2 is REAL A scaling factor used to avoid over/underflow in the eigenvalue equation which defines the second eigenvalue. If the eigenvalues are complex, then SCALE2=SCALE1. If the eigenvalues are real, then the second (real) eigenvalue is WR2 / SCALE2 , but this may overflow or underflow, and in fact, SCALE2 may be zero or less than the underflow threshhold if the exact eigenvalue is sufficiently large. 
[out]  WR1  WR1 is REAL If the eigenvalue is real, then WR1 is SCALE1 times the eigenvalue closest to the (2,2) element of A B**(1). If the eigenvalue is complex, then WR1=WR2 is SCALE1 times the real part of the eigenvalues. 
[out]  WR2  WR2 is REAL If the eigenvalue is real, then WR2 is SCALE2 times the other eigenvalue. If the eigenvalue is complex, then WR1=WR2 is SCALE1 times the real part of the eigenvalues. 
[out]  WI  WI is REAL If the eigenvalue is real, then WI is zero. If the eigenvalue is complex, then WI is SCALE1 times the imaginary part of the eigenvalues. WI will always be nonnegative. 
Definition at line 156 of file slag2.f.