In this paper we present heuristic techniques for the reduction of the bandwidth of a sparse matrix as well as for the reduction of the cost of the associated Cholesky factorization. Our algorithms are inspired by the Spectral Method of Barnard, Pothen and Simon [BPS95] which derives a permutation for reducing the envelope-size of a sparse matrix by computing the second eigenvector of the associated Laplacian matrix. Two main modifications of that method are proposed and tested. The first is based on the experimental observation that it is often preferable to perform only few iterations of an iterative method converging to the second eigenvector; the second is the introduction of a weighted Laplacian. These simple ideas allows us...
A novel sparse spectral clustering method using linear algebra techniques is proposed. Spectral clus...
Colloque avec actes et comité de lecture. internationale.International audience"Bandwidth minimizati...
AbstractA novel sparse spectral clustering method using linear algebra techniques is proposed. Spect...
This paper studies heuristics for the bandwidth reduction of large-scale matrices in serial computat...
The problem of sparse matrix bandwidth reduction is addressed and solved with two approaches suitabl...
The paper describes a new bandwidth reduction method for sparse matrices which promises to be both f...
Spectral clustering methods allow to partition a dataset into clusters by mapping the input datapoin...
The problem of reordering a sparse symmetric matrix to reduce its envelope size is considered. A new...
Spectral clustering methods allow datasets to be partitioned into clusters by mapping the input data...
Most research in algorithm design relies on worst-case analysis for performance comparisons. Unfortu...
AbstractComputational and storage costs of resolution of large sparse linear systems Ax=b can be per...
. A new spectral algorithm for reordering a sparse symmetric matrix to reduce its envelope size was ...
Abstract Most research in algorithm design relies on worstcase analysis for performance com parison...
This dissertation studies a restricted form of the fundamental algebraic eigenvalue prob lem. From ...
Bandwidth (or semibandwidth) of n × n matrix A is smallest value β such that aij = 0 for all |i − j ...
A novel sparse spectral clustering method using linear algebra techniques is proposed. Spectral clus...
Colloque avec actes et comité de lecture. internationale.International audience"Bandwidth minimizati...
AbstractA novel sparse spectral clustering method using linear algebra techniques is proposed. Spect...
This paper studies heuristics for the bandwidth reduction of large-scale matrices in serial computat...
The problem of sparse matrix bandwidth reduction is addressed and solved with two approaches suitabl...
The paper describes a new bandwidth reduction method for sparse matrices which promises to be both f...
Spectral clustering methods allow to partition a dataset into clusters by mapping the input datapoin...
The problem of reordering a sparse symmetric matrix to reduce its envelope size is considered. A new...
Spectral clustering methods allow datasets to be partitioned into clusters by mapping the input data...
Most research in algorithm design relies on worst-case analysis for performance comparisons. Unfortu...
AbstractComputational and storage costs of resolution of large sparse linear systems Ax=b can be per...
. A new spectral algorithm for reordering a sparse symmetric matrix to reduce its envelope size was ...
Abstract Most research in algorithm design relies on worstcase analysis for performance com parison...
This dissertation studies a restricted form of the fundamental algebraic eigenvalue prob lem. From ...
Bandwidth (or semibandwidth) of n × n matrix A is smallest value β such that aij = 0 for all |i − j ...
A novel sparse spectral clustering method using linear algebra techniques is proposed. Spectral clus...
Colloque avec actes et comité de lecture. internationale.International audience"Bandwidth minimizati...
AbstractA novel sparse spectral clustering method using linear algebra techniques is proposed. Spect...