AbstractEigenvalue problems arise in many application areas ranging from computational fluid dynamics to information retrieval. In these fields we are often interested in only a few eigenvalues and corresponding eigenvectors of a sparse matrix. In this paper, we comment on the modifications of the eigenvalue problem that can simplify the computation of those eigenpairs. These transformations allow us to avoid difficulties associated with non-Hermitian eigenvalue problems, such as the lack of reliable non-Hermitian eigenvalue solvers, by mapping them into generalized Hermitian eigenvalue problems. Also, they allow us to expose and explore parallelism. They require knowledge of a selected eigenvalue and preserve its eigenspace. The positive d...
We discuss approaches for an efficient handling of the correction equation in the Jacobi-Davidson me...
This PhD thesis is an important development in the theories, methods, and applications of eigenvalue...
The polynomial eigenvalue problem for Hermite interpolation matrix polynomials is discussed. The sta...
Abstract Eigenvalue problems arise in many application areas ranging from compu-tational fluid dynam...
AbstractEigenvalue problems arise in many application areas ranging from computational fluid dynamic...
This thesis treats a number of aspects of subspace methods for various eigenvalue problems. Vibrat...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/17...
The classical perturbation theory for Hermitian matrix eigenvalue and singular value problems provid...
Abstract. We propose a Preconditioned Locally Harmonic Residual (PLHR) method for com-puting several...
The classical perturbation theory for Hermitian matrix enigenvalue and singular value problems provi...
AbstractLet A and B be Hermitian matrices, and let c(A, B) = inf{|xH(A + iB)x|:‖ = 1}. The eigenvalu...
In a recent companion paper, we proposed two methods, GD+k and JDQMR, as nearly optimal methods for ...
AbstractThere is now a large literature on structured perturbation bounds for eigenvalue problems of...
Abstract In the paper, the authors establish some inequalities for generalized eigenvalues of pertur...
Sylvester's law of inertia states that the number of positive, negative and zero eigenvalues of Herm...
We discuss approaches for an efficient handling of the correction equation in the Jacobi-Davidson me...
This PhD thesis is an important development in the theories, methods, and applications of eigenvalue...
The polynomial eigenvalue problem for Hermite interpolation matrix polynomials is discussed. The sta...
Abstract Eigenvalue problems arise in many application areas ranging from compu-tational fluid dynam...
AbstractEigenvalue problems arise in many application areas ranging from computational fluid dynamic...
This thesis treats a number of aspects of subspace methods for various eigenvalue problems. Vibrat...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/17...
The classical perturbation theory for Hermitian matrix eigenvalue and singular value problems provid...
Abstract. We propose a Preconditioned Locally Harmonic Residual (PLHR) method for com-puting several...
The classical perturbation theory for Hermitian matrix enigenvalue and singular value problems provi...
AbstractLet A and B be Hermitian matrices, and let c(A, B) = inf{|xH(A + iB)x|:‖ = 1}. The eigenvalu...
In a recent companion paper, we proposed two methods, GD+k and JDQMR, as nearly optimal methods for ...
AbstractThere is now a large literature on structured perturbation bounds for eigenvalue problems of...
Abstract In the paper, the authors establish some inequalities for generalized eigenvalues of pertur...
Sylvester's law of inertia states that the number of positive, negative and zero eigenvalues of Herm...
We discuss approaches for an efficient handling of the correction equation in the Jacobi-Davidson me...
This PhD thesis is an important development in the theories, methods, and applications of eigenvalue...
The polynomial eigenvalue problem for Hermite interpolation matrix polynomials is discussed. The sta...