Visible to Intel only — GUID: GUID-E239BC55-E2C8-4E2E-A3B8-8027A5A76CA3
Visible to Intel only — GUID: GUID-E239BC55-E2C8-4E2E-A3B8-8027A5A76CA3
?spgst
Reduces a real symmetric-definite generalized eigenvalue problem to the standard form using packed storage.
Syntax
lapack_int LAPACKE_sspgst (int matrix_layout, lapack_int itype, char uplo, lapack_int n, float* ap, const float* bp);
lapack_int LAPACKE_dspgst (int matrix_layout, lapack_int itype, char uplo, lapack_int n, double* ap, const double* bp);
Include Files
- mkl.h
Description
The routine reduces real symmetric-definite generalized eigenproblems
A*x = λ*B*x, A*B*x = λ*x, or B*A*x = λ*x
to the standard form C*y = λ*y, using packed matrix storage. Here A is a real symmetric matrix, and B is a real symmetric positive-definite matrix. Before calling this routine, call ?pptrf to compute the Cholesky factorization: B = UT*U or B = L*LT.
Input Parameters
- matrix_layout
-
Specifies whether matrix storage layout is row major (LAPACK_ROW_MAJOR) or column major (LAPACK_COL_MAJOR).
- itype
-
Must be 1 or 2 or 3.
If itype = 1, the generalized eigenproblem is A*z = lambda*B*z
for uplo = 'U': C = inv(UT)*A*inv(U), z = inv(U)*y;
for uplo = 'L': C = inv(L)*A*inv(LT), z = inv(LT)*y.
If itype = 2, the generalized eigenproblem is A*B*z = lambda*z
for uplo = 'U': C = U*A*UT, z = inv(U)*y;
for uplo = 'L': C = LT*A*L, z = inv(LT)*y.
If itype = 3, the generalized eigenproblem is B*A*z = lambda*z
for uplo = 'U': C = U*A*UT, z = UT*y;
for uplo = 'L': C = LT*A*L, z = L*y.
- uplo
-
Must be 'U' or 'L'.
If uplo = 'U', ap stores the packed upper triangle of A;
you must supply B in the factored form B = UT*U.
If uplo = 'L', ap stores the packed lower triangle of A;
you must supply B in the factored form B = L*LT.
- n
-
The order of the matrices A and B (n≥ 0).
- ap, bp
-
Arrays:
ap contains the packed upper or lower triangle of A.
The dimension of ap must be at least max(1, n*(n+1)/2).
bp contains the packed Cholesky factor of B (as returned by ?pptrf with the same uplo value).
The dimension of bp must be at least max(1, n*(n+1)/2).
Output Parameters
- ap
-
The upper or lower triangle of A is overwritten by the upper or lower triangle of C, as specified by the arguments itype and uplo.
Return Values
This function returns a value info.
If info=0, the execution is successful.
If info = -i, the i-th parameter had an illegal value.
Application Notes
Forming the reduced matrix C is a stable procedure. However, it involves implicit multiplication by inv(B) (if itype = 1) or B (if itype = 2 or 3). When the routine is used as a step in the computation of eigenvalues and eigenvectors of the original problem, there may be a significant loss of accuracy if B is ill-conditioned with respect to inversion.
The approximate number of floating-point operations is n3.