Visible to Intel only — GUID: GUID-EFAE0280-7B21-4B57-AF10-4CACCD99FF18
Visible to Intel only — GUID: GUID-EFAE0280-7B21-4B57-AF10-4CACCD99FF18
b?laexc
Swaps adjacent diagonal blocks of a real upper quasi-triangular matrix in Schur canonical form, by an orthogonal similarity transformation.
call bslaexc( n, t, ldt, j1, n1, n2, itraf, dtraf, work, info )
call bdlaexc( n, t, ldt, j1, n1, n2, itraf, dtraf, work, info )
b?laexc swaps adjacent diagonal blocks T11 and T22 of order 1 or 2 in an upper quasi-triangular matrix T by an orthogonal similarity transformation.
In contrast to the LAPACK routine ?laexc, the orthogonal transformation matrix Q is not explicitly constructed but represented by parameters contained in the arrays itraf and dtraf. See the description of b?trexc for more details.
T must be in Schur canonical form, that is, block upper triangular with 1-by-1 and 2-by-2 diagonal blocks; each 2-by-2 diagonal block has its diagonal elements equal and its off-diagonal elements of opposite sign.
- n
-
INTEGER
The order of the matrix T. n≥ 0.
- t
-
REAL for bslaexc
DOUBLE PRECISION for bdlaexc
Array of size (ldt,n).
The upper quasi-triangular matrix T, in Schur canonical form.
- ldt
-
INTEGER
The leading dimension of the array t. ldt≥ max(1,n).
- j1
-
INTEGER
The index of the first row of the first block T11.
- n1
-
INTEGER
The order of the first block T11. n1 = 0, 1 or 2.
- n2
-
INTEGER
The order of the second block T22. n2 = 0, 1 or 2.
- work
-
REAL for bslaexc
DOUBLE PRECISION for bdlaexc
(Workspace) array of size n.
- t
-
The updated matrix T, in Schur canonical form.
- itraf
-
INTEGER array, length k, where
k = 1, if n1+n2 = 2;
k = 2, if n1+n2 = 3;
k = 4, if n1+n2 = 4.
List of parameters for representing the transformation matrix Q, see b?trexc.
- dtraf
-
REAL for bslaexc
DOUBLE PRECISION for bdlaexc
Array, length k, where
k = 2, if n1+n2 = 2;
k = 5, if n1+n2 = 3;
k = 10, if n1+n2 = 4.
List of parameters for representing the transformation matrix Q, see b?trexc.
- info
-
INTEGER
= 0: successful exit
= 1: the transformed matrix T would be too far from Schur form; the blocks are not swapped and T and Q are unchanged.