Add to ORKGIn this paper we propose a variant of the Rayleigh quotient method to compute an eigenvalue and corresponding eigenvectors of a matrix. It is based on the observation that eigenvectors of a matrix with eigenvalue zero are also singular vectors corresponding to zero singular values. Instead of computing eigenvector approximations by the inverse power method, we take them to be the singular vectors corresponding to the smallest singular value of the shifted matrix. If these singular vectors are computed exactly the method is quadratically convergent. However, exact singular vectors are not required for convergence, and the resulting method combined with Golub--Kahan--Krylov bidiagonalization looks promising for enhancement/refinement metho...
Large scale eigenvalue computation is about approximating certain invariant sub-spaces associated wi...
AbstractNew simultaneous iteration techniques are developed for solving the generalized eigenproblem...
Iterative algorithms for large-scale eigenpair computation of symmetric matrices are mostly based on...
In this paper we propose a variant of the Rayleigh quotient method to compute an eigenvalue and corr...
In this paper we propose a variant of the Rayleigh quotient method to compute an eigenvalue and corr...
Generalized Rayleigh quotients for calculating eigenvalues and eigenvectors of large matrice
We present new algorithms for refining the estimates of the eigenvectors of a real symmetric matrix....
AbstractUsing an integrable discretization of the Rayleigh quotient system, a new algorithm for comp...
Many fields make use of the concepts about eigenvalues in their studies. In engineering, physics, st...
Rayleigh Quotient iteration is an iterative method with some attractive convergence properties for n...
AbstractRecently, a continuous method has been proposed by Golub and Liao as an alternative way to s...
AbstractArnoldi's method has been popular for computing the small number of selected eigenvalues and...
Abstract. Rayleigh Quotient iteration is an iterative method with some attractive convergence proper...
We discuss the close connection between eigenvalue computation and optimization using the Newton met...
AbstractExamples are given of nonsymmetric matrices for which the Rayleigh Quotient Iteration fails ...
Large scale eigenvalue computation is about approximating certain invariant sub-spaces associated wi...
AbstractNew simultaneous iteration techniques are developed for solving the generalized eigenproblem...
Iterative algorithms for large-scale eigenpair computation of symmetric matrices are mostly based on...
In this paper we propose a variant of the Rayleigh quotient method to compute an eigenvalue and corr...
In this paper we propose a variant of the Rayleigh quotient method to compute an eigenvalue and corr...
Generalized Rayleigh quotients for calculating eigenvalues and eigenvectors of large matrice
We present new algorithms for refining the estimates of the eigenvectors of a real symmetric matrix....
AbstractUsing an integrable discretization of the Rayleigh quotient system, a new algorithm for comp...
Many fields make use of the concepts about eigenvalues in their studies. In engineering, physics, st...
Rayleigh Quotient iteration is an iterative method with some attractive convergence properties for n...
AbstractRecently, a continuous method has been proposed by Golub and Liao as an alternative way to s...
AbstractArnoldi's method has been popular for computing the small number of selected eigenvalues and...
Abstract. Rayleigh Quotient iteration is an iterative method with some attractive convergence proper...
We discuss the close connection between eigenvalue computation and optimization using the Newton met...
AbstractExamples are given of nonsymmetric matrices for which the Rayleigh Quotient Iteration fails ...
Large scale eigenvalue computation is about approximating certain invariant sub-spaces associated wi...
AbstractNew simultaneous iteration techniques are developed for solving the generalized eigenproblem...
Iterative algorithms for large-scale eigenpair computation of symmetric matrices are mostly based on...