We investigate the performance of the routines in LAPACK and the Successive Band Reduction (SBR) toolbox for the reduction of a dense matrix to tridiagonal form, a crucial preprocessing stage in the solution of the symmetric eigenvalue problem, on general-purpose multi-core processors. In response to the advances of hardware accelerators, we also modify the code in SBR to accelerate the computation by off-loading a significant part of the operations to a graphics processor (GPU). Performance results illustrate the parallelism and scalability of these algorithms on current high-performance multi-core architectures
Obtaining the eigenvalues and eigenvectors of large matrices is a key problem in electronic structur...
Communicated by Yasuaki Ito Solution of large-scale dense nonsymmetric eigenvalue problem is require...
The goal of the PRISM project is the development of infrastructure and algorithms for the parallel s...
We investigate the performance of the routines in LAPACK and the Successive Band Reduction (SBR) too...
Successive band reduction (SBR) is a two-phase approach for reducing a full symmetric matrix to trid...
This paper presents a parallel implementation of a blocked band reduction algorithm for symmetric ma...
The solution of the symmetric eigenvalue problem is a compute-intensive task in many scientific and ...
Asymmetric multicore processors (AMPs), as those present in ARM big.LITTLE technology, have been pro...
Abstract. The eigenvalues and eigenvectors of a symmetric matrix are needed in a myriad of applicati...
Linear algebra operations arise in a myriad of scientific and engineering applications and, therefor...
Abstract. The objective of this paper is to extend, in the context of multicore architectures, the c...
The real symmetric tridiagonal eigenproblem is of outstanding importance in numerical computations; ...
We investigate how to leverage the heterogeneous resources of an Asymmetric Multicore Processor (AMP...
The objective of this paper is to extend, in the context of multicore architectures, the concepts of...
An efficient parallel algorithm, farmzeroinNR, for the eigenvalue problem of a symmetric tridiagonal...
Obtaining the eigenvalues and eigenvectors of large matrices is a key problem in electronic structur...
Communicated by Yasuaki Ito Solution of large-scale dense nonsymmetric eigenvalue problem is require...
The goal of the PRISM project is the development of infrastructure and algorithms for the parallel s...
We investigate the performance of the routines in LAPACK and the Successive Band Reduction (SBR) too...
Successive band reduction (SBR) is a two-phase approach for reducing a full symmetric matrix to trid...
This paper presents a parallel implementation of a blocked band reduction algorithm for symmetric ma...
The solution of the symmetric eigenvalue problem is a compute-intensive task in many scientific and ...
Asymmetric multicore processors (AMPs), as those present in ARM big.LITTLE technology, have been pro...
Abstract. The eigenvalues and eigenvectors of a symmetric matrix are needed in a myriad of applicati...
Linear algebra operations arise in a myriad of scientific and engineering applications and, therefor...
Abstract. The objective of this paper is to extend, in the context of multicore architectures, the c...
The real symmetric tridiagonal eigenproblem is of outstanding importance in numerical computations; ...
We investigate how to leverage the heterogeneous resources of an Asymmetric Multicore Processor (AMP...
The objective of this paper is to extend, in the context of multicore architectures, the concepts of...
An efficient parallel algorithm, farmzeroinNR, for the eigenvalue problem of a symmetric tridiagonal...
Obtaining the eigenvalues and eigenvectors of large matrices is a key problem in electronic structur...
Communicated by Yasuaki Ito Solution of large-scale dense nonsymmetric eigenvalue problem is require...
The goal of the PRISM project is the development of infrastructure and algorithms for the parallel s...