We analyze the FEAST method for computing selected eigenvalues and eigenvectors of large sparse matrix pencils. After establishing the close connection between FEAST and the well-known Rayleigh–Ritz method, we identify several critical issues that influence convergence and accuracy of the solver: the choice of the starting vector space, the stopping criterion, how the inner linear systems impact the quality of the solution, and the use of FEAST for computing eigenpairs from multiple intervals. We complement the study with numerical examples, and hint at possible improvements to overcome the existing problems
The FEAST eigensolver is extended to the computation of the singular triplets of a large matrix $A$ ...
AbstractA new method for finding eigenpairs of any symmetric definite matrix pencil is proposed. It ...
An accelerated simultaneous iteration method is presented for the solution of the generalized eigenp...
The FEAST method for solving large sparse eigenproblems is equivalent to subspace iteration with an ...
The FEAST method for solving large sparse eigenproblems is equivalent to subspace iteration with an ...
This paper is concerned with the computation of the minimal eigenpair of the generalized eigen-probl...
In this paper, we consider four methods for determining certain eigenvalues and corresponding eigenv...
. This paper addresses the question of the form library routine eigenvalue solvers for large--scale ...
We discuss the generalized Davidson's algorithm for computing accurate approximations of the k princ...
In this paper we apply the recently proposed Jacobi-Davidson method for calculating extreme eigenval...
This dissertation discusses parallel algorithms for the generalized eigenvalue problem Ax = λBx wher...
This report is concerned with the computation of the minimal eigenpair of the generalized eigen-prob...
Block variants of the Jacobi-Davidson method for computing a few extreme eigenpairs of a large spars...
In this paper we apply the recently proposed Jacobi-Davidson method for calculating extreme eigenval...
An acceleratedsimultaneousiteration method is presented for the solution of the generalized eigenpro...
The FEAST eigensolver is extended to the computation of the singular triplets of a large matrix $A$ ...
AbstractA new method for finding eigenpairs of any symmetric definite matrix pencil is proposed. It ...
An accelerated simultaneous iteration method is presented for the solution of the generalized eigenp...
The FEAST method for solving large sparse eigenproblems is equivalent to subspace iteration with an ...
The FEAST method for solving large sparse eigenproblems is equivalent to subspace iteration with an ...
This paper is concerned with the computation of the minimal eigenpair of the generalized eigen-probl...
In this paper, we consider four methods for determining certain eigenvalues and corresponding eigenv...
. This paper addresses the question of the form library routine eigenvalue solvers for large--scale ...
We discuss the generalized Davidson's algorithm for computing accurate approximations of the k princ...
In this paper we apply the recently proposed Jacobi-Davidson method for calculating extreme eigenval...
This dissertation discusses parallel algorithms for the generalized eigenvalue problem Ax = λBx wher...
This report is concerned with the computation of the minimal eigenpair of the generalized eigen-prob...
Block variants of the Jacobi-Davidson method for computing a few extreme eigenpairs of a large spars...
In this paper we apply the recently proposed Jacobi-Davidson method for calculating extreme eigenval...
An acceleratedsimultaneousiteration method is presented for the solution of the generalized eigenpro...
The FEAST eigensolver is extended to the computation of the singular triplets of a large matrix $A$ ...
AbstractA new method for finding eigenpairs of any symmetric definite matrix pencil is proposed. It ...
An accelerated simultaneous iteration method is presented for the solution of the generalized eigenp...