| f02adc
|
All eigenvalues of generalized real symmetric-definite eigenproblem |
| f02aec
|
All eigenvalues and eigenvectors of generalized real symmetric-definite eigenproblem |
| f02bjc
|
All eigenvalues and optionally eigenvectors of real generalized eigenproblem, by QZ algorithm
|
| f08sec
|
Reduction to standard form of real symmetric-definite generalized eigenproblem Ax = λ Bx, ABx = λ x or BAx = λ x, B factorized by f07fdc |
| f08ssc
|
Reduction to standard form of complex Hermitian-definite generalized eigenproblem Ax = λ Bx, ABx = λ x or BAx = λ x, B factorized by f07frc |
| f08tec
|
Reduction to standard form of real symmetric-definite generalized eigenproblem Ax=λ Bx, ABx = λ x or BAx = λ x, packed storage, B factorized by f07gdc |
| f08tsc
|
Reduction to standard form of complex Hermitian-definite generalized eigenproblem Ax=λ Bx, ABx = λ x or BAx = λ x, packed storage, B factorized by f07grc |
| f08uec
|
Reduction of real symmetric-definite banded generalized eigenproblem Ax = λ Bx to standard form Cy = λ y, such that C has the same bandwidth as A |
| f08usc
|
Reduction of complex Hermitian-definite banded generalized eigenproblem Ax = λ Bx to standard form Cy = λ y, such that C has the same bandwidth as A |
| f08wec
|
Orthogonal reduction of a pair of real general matrices to generalized upper Hessenberg form
|
| f08wsc
|
Unitary reduction of a pair of complex general matrices to generalized upper Hessenberg form
|
| f08xec
|
Eigenvalues and generalized Schur factorization of real generalized upper Hessenberg form reduced from a pair of real general matrices
|
| f08xsc
|
Eigenvalues and generalized Schur factorization of complex generalized upper Hessenberg form reduced from a pair of complex general matrices
|
| g02gac
|
Fits a generalized linear model with Normal errors |
| g02gbc
|
Fits a generalized linear model with binomial errors |
| g02gcc
|
Fits a generalized linear model with Poisson errors |
| g02gdc
|
Fits a generalized linear model with gamma errors |
| g02gnc
|
Estimable function and the standard error of a generalized linear model |
© The Numerical Algorithms Group Ltd, Oxford UK. 2002