Add to ORKGA considerable amount of material has been published on procedures for the solution of the standard eigenproblem Ax = [lambda]x. In the last few years increasing attention has been focused on the more general problem Ax = [lambda]Bx. This study of the generalized eigenproblem Ax = [lambda]Bx can be divided into three main parts. The first part is concerned with the solution of this problem when A and B are certain types of nonsingular matrices such as elementary, diagonal, or triangular. A survey of the numerical methods used to solve the eigenproblem Ax = [lambda]Bx when A and B are symmetric and B is positive definite is given in the second part. The third part uses the pseudoinverse of a matrix to solve Ax = [lambda]Bx when A and B are s...
We present an algorithmic framework to compute approximations to all eigenvalues of a generalized sy...
AbstractA new method which is based on two transformations, called the HMDR and the FMDR transformat...
We present an algorithmic framework to compute approximations to all eigenvalues of a generalized sy...
The generalized symmetric eigenvalue problem (GSEVP) $A x = \lambda B x$, $A$ symmetric, $B$ symmetr...
AbstractA new method is presented for the solution of the matrix eigenvalue problem Ax=λBx, where A ...
An algorithm is developed for the generalized eigenvalue problem (A - λB)φ = O where A and B are rea...
An algorithm is presented for computing the m smallest eigenvalues and corresponding eigenvectors of...
PhDMathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue.li...
We present a new fast algorithm for solving the generalized eigenvalue problem Tx = lambda Sx, in wh...
Watkins DS, Elsner L. Theory of decomposition and bulge-chasing algorithms for the generalized eigen...
AbstractAn algorithm for enclosing all eigenvalues in generalized eigenvalue problem Ax=λBx is propo...
It is well-known that the finite difference discretization of the Laplacian eigenvalue problem −Δu =...
[[abstract]]A new method which is based on two transformations, called the HMDR and the FMDR transfo...
AbstractGeneralized eigenvalue problems play a significant role in many applications. In this paper,...
http://deepblue.lib.umich.edu/bitstream/2027.42/6667/5/bac9269.0001.001.pdfhttp://deepblue.lib.umich...
We present an algorithmic framework to compute approximations to all eigenvalues of a generalized sy...
AbstractA new method which is based on two transformations, called the HMDR and the FMDR transformat...
We present an algorithmic framework to compute approximations to all eigenvalues of a generalized sy...
The generalized symmetric eigenvalue problem (GSEVP) $A x = \lambda B x$, $A$ symmetric, $B$ symmetr...
AbstractA new method is presented for the solution of the matrix eigenvalue problem Ax=λBx, where A ...
An algorithm is developed for the generalized eigenvalue problem (A - λB)φ = O where A and B are rea...
An algorithm is presented for computing the m smallest eigenvalues and corresponding eigenvectors of...
PhDMathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue.li...
We present a new fast algorithm for solving the generalized eigenvalue problem Tx = lambda Sx, in wh...
Watkins DS, Elsner L. Theory of decomposition and bulge-chasing algorithms for the generalized eigen...
AbstractAn algorithm for enclosing all eigenvalues in generalized eigenvalue problem Ax=λBx is propo...
It is well-known that the finite difference discretization of the Laplacian eigenvalue problem −Δu =...
[[abstract]]A new method which is based on two transformations, called the HMDR and the FMDR transfo...
AbstractGeneralized eigenvalue problems play a significant role in many applications. In this paper,...
http://deepblue.lib.umich.edu/bitstream/2027.42/6667/5/bac9269.0001.001.pdfhttp://deepblue.lib.umich...
We present an algorithmic framework to compute approximations to all eigenvalues of a generalized sy...
AbstractA new method which is based on two transformations, called the HMDR and the FMDR transformat...
We present an algorithmic framework to compute approximations to all eigenvalues of a generalized sy...