Abstract. Spectral divide and conquer algorithms solve the eigenvalue problem for all the eigen-values and eigenvectors by recursively computing an invariant subspace for a subset of the spectrum and using it to decouple the problem into two smaller subproblems. A number of such algorithms have been developed over the last 40 years, often motivated by parallel computing and, most recently, with the aim of achieving minimal communication costs. However, none of the existing algorithms has been proved to be backward stable, and they all have a significantly higher arithmetic cost than the standard algorithms currently used. We present new spectral divide and conquer algorithms for the symmetric eigenvalue problem and the singular value decomp...
In this thesis we address the computation of a spectral decomposition for symmetric banded matrices....
In computational science symmetric eigenvalue problems are central and the need for fast and accura...
The computation of eigenvalues of large-scale matrices arising from finite element discretizations h...
Spectral divide and conquer algorithms solve the eigenvalue problem by recursively computing an inva...
Conventional algorithms for the (symmetric or non-symmetric) eigenvalue decomposition and the singul...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental m...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental ma...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental ma...
This report discusses a serial implementation of Cuppen's divide and conquer algorithm for comp...
We present a new parallel implementation of a divide and conquer algorithm for computing the spectra...
The authors present a stable and efficient divide-and-conquer algorithm for computing the spectral d...
Abstract. We present a new parallel implementation of a divide and conquer algorithm for computing t...
Algorithms have two costs: arithmetic and communication. The latter represents the cost of moving da...
We present a new parallel implementation of a divide and conquer algorithm for computing the spectra...
In this paper we present a new stable algorithm for the parallel QR-decomposition of ”tall and skinn...
In this thesis we address the computation of a spectral decomposition for symmetric banded matrices....
In computational science symmetric eigenvalue problems are central and the need for fast and accura...
The computation of eigenvalues of large-scale matrices arising from finite element discretizations h...
Spectral divide and conquer algorithms solve the eigenvalue problem by recursively computing an inva...
Conventional algorithms for the (symmetric or non-symmetric) eigenvalue decomposition and the singul...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental m...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental ma...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental ma...
This report discusses a serial implementation of Cuppen's divide and conquer algorithm for comp...
We present a new parallel implementation of a divide and conquer algorithm for computing the spectra...
The authors present a stable and efficient divide-and-conquer algorithm for computing the spectral d...
Abstract. We present a new parallel implementation of a divide and conquer algorithm for computing t...
Algorithms have two costs: arithmetic and communication. The latter represents the cost of moving da...
We present a new parallel implementation of a divide and conquer algorithm for computing the spectra...
In this paper we present a new stable algorithm for the parallel QR-decomposition of ”tall and skinn...
In this thesis we address the computation of a spectral decomposition for symmetric banded matrices....
In computational science symmetric eigenvalue problems are central and the need for fast and accura...
The computation of eigenvalues of large-scale matrices arising from finite element discretizations h...