AbstractWe compare different algorithms for computing eigenvalues and eigenvectors of a symmetric band matrix across a wide range of synthetic test problems. Of particular interest is a comparison of state-of-the-art tridiagonalization-based methods as implemented in Lapack or Plasma on the one hand, and the block divide-and-conquer (BD&C) algorithm as well as the block twisted factorization (BTF) method on the other hand. The BD&C algorithm does not require tridiagonalization of the original band matrix at all, and the current version of the BTF method tridiagonalizes the original band matrix only for computing the eigenvalues.Avoiding the tridiagonalization process sidesteps the cost of backtransformation of the eigenvectors. Beyond that,...
AbstractThis paper presents an efficient vectorized algorithm for the tridiagonalization of a band s...
This dissertation studies a restricted form of the fundamental algebraic eigenvalue prob lem. From ...
AbstractWe apply a novel approach to approximate within ϵ to all the eigenvalues of an n × n symmetr...
AbstractWe compare different algorithms for computing eigenvalues and eigenvectors of a symmetric ba...
AbstractNew methods for computing eigenvectors of symmetric block tridiagonal matrices based on twis...
This paper presents a parallel implementation of a blocked band reduction algorithm for symmetric ma...
In this report a way to apply high level Blas to the tridiagonalization process of a symmetric matri...
Die fortlaufende Weiterentwicklung moderner Computerarchitekturen fordert eine stetige Anpassung num...
Conventional algorithms for the (symmetric or non-symmetric) eigenvalue decomposition and the singul...
We investigate the performance of the routines in LAPACK and the Successive Band Reduction (SBR) too...
We compare four algorithms from the latest LAPACK 3.1 release for computing eigenpairs of a symmetri...
This report discusses a serial implementation of Cuppen's divide and conquer algorithm for comp...
An algorithm is developed to calculate eigenvalues and eigenvectors of large order symmetric band ma...
We improve divide-and-conquer with multiple divisions for real symmetric tridiagonal eigenproblem pr...
The solution of the symmetric eigenvalue problem is a compute-intensive task in many scientific and ...
AbstractThis paper presents an efficient vectorized algorithm for the tridiagonalization of a band s...
This dissertation studies a restricted form of the fundamental algebraic eigenvalue prob lem. From ...
AbstractWe apply a novel approach to approximate within ϵ to all the eigenvalues of an n × n symmetr...
AbstractWe compare different algorithms for computing eigenvalues and eigenvectors of a symmetric ba...
AbstractNew methods for computing eigenvectors of symmetric block tridiagonal matrices based on twis...
This paper presents a parallel implementation of a blocked band reduction algorithm for symmetric ma...
In this report a way to apply high level Blas to the tridiagonalization process of a symmetric matri...
Die fortlaufende Weiterentwicklung moderner Computerarchitekturen fordert eine stetige Anpassung num...
Conventional algorithms for the (symmetric or non-symmetric) eigenvalue decomposition and the singul...
We investigate the performance of the routines in LAPACK and the Successive Band Reduction (SBR) too...
We compare four algorithms from the latest LAPACK 3.1 release for computing eigenpairs of a symmetri...
This report discusses a serial implementation of Cuppen's divide and conquer algorithm for comp...
An algorithm is developed to calculate eigenvalues and eigenvectors of large order symmetric band ma...
We improve divide-and-conquer with multiple divisions for real symmetric tridiagonal eigenproblem pr...
The solution of the symmetric eigenvalue problem is a compute-intensive task in many scientific and ...
AbstractThis paper presents an efficient vectorized algorithm for the tridiagonalization of a band s...
This dissertation studies a restricted form of the fundamental algebraic eigenvalue prob lem. From ...
AbstractWe apply a novel approach to approximate within ϵ to all the eigenvalues of an n × n symmetr...