We show how to build hierarchical, reduced-rank representation for large stochastic matrices and use this representation to design an efficient algorithm for computing the largest eigenvalues, and the corresponding eigenvectors. In particular, the eigen problem is first solved at the coarsest level of the representation. The approximate eigen solution is then interpolated over successive levels of the hierarchy. A small number of power iterations are employed at each stage to correct the eigen solution. The typical speedups obtained by a Matlab implementation of our fast eigensolver over a standard sparse matrix eigensolver [13] are at least a factor of ten for large image sizes. The hierarchical representation has proven to be effective in...
This thesis is on the numerical computation of eigenvalues of symmetric hierarchical matrices. The n...
In this thesis, we consider the numerical solution of a large eigenvalue problem in which the integr...
Conventional algorithms for the (symmetric or non-symmetric) eigenvalue decomposition and the singul...
This PhD thesis is an important development in the theories, methods, and applications of eigenvalue...
We give faster algorithms and improved sample complexities for the fundamental problem of estimating...
AbstractIn this work, we consider the numerical solution of a large eigenvalue problem resulting fro...
In this paper we consider a class of hierarchically rank structured matrices, including some of the ...
In this thesis we address the computation of a spectral decomposition for symmetric banded matrices....
Computing the k dominant eigenvalues and eigenvectors of massive graphs is a key operation in numero...
Recently a novel family of eigensolvers, called spectral indicator methods (SIMs), was proposed. Giv...
In this work, we consider the numerical solution of a large eigenvalue problem resulting from a fini...
Abstract. In this paper, we consider a class of hierarchically rank structured matrices that include...
Eigenvector analysis is used extensively in image processing, pattern matching, and machine vision. ...
We examine sub-structuring methods for solving large-scale generalized eigenvalue problems from a p...
In many areas of machine learning, it becomes necessary to find the eigenvector decompositions of la...
This thesis is on the numerical computation of eigenvalues of symmetric hierarchical matrices. The n...
In this thesis, we consider the numerical solution of a large eigenvalue problem in which the integr...
Conventional algorithms for the (symmetric or non-symmetric) eigenvalue decomposition and the singul...
This PhD thesis is an important development in the theories, methods, and applications of eigenvalue...
We give faster algorithms and improved sample complexities for the fundamental problem of estimating...
AbstractIn this work, we consider the numerical solution of a large eigenvalue problem resulting fro...
In this paper we consider a class of hierarchically rank structured matrices, including some of the ...
In this thesis we address the computation of a spectral decomposition for symmetric banded matrices....
Computing the k dominant eigenvalues and eigenvectors of massive graphs is a key operation in numero...
Recently a novel family of eigensolvers, called spectral indicator methods (SIMs), was proposed. Giv...
In this work, we consider the numerical solution of a large eigenvalue problem resulting from a fini...
Abstract. In this paper, we consider a class of hierarchically rank structured matrices that include...
Eigenvector analysis is used extensively in image processing, pattern matching, and machine vision. ...
We examine sub-structuring methods for solving large-scale generalized eigenvalue problems from a p...
In many areas of machine learning, it becomes necessary to find the eigenvector decompositions of la...
This thesis is on the numerical computation of eigenvalues of symmetric hierarchical matrices. The n...
In this thesis, we consider the numerical solution of a large eigenvalue problem in which the integr...
Conventional algorithms for the (symmetric or non-symmetric) eigenvalue decomposition and the singul...