This thesis is on the numerical computation of eigenvalues of symmetric hierarchical matrices. The numerical algorithms used for this computation are derivations of the LR Cholesky algorithm, the preconditioned inverse iteration, and a bisection method based on LDLT factorizations. The investigation of QR decompositions for H-matrices leads to a new QR decomposition. It has some properties that are superior to the existing ones, which is shown by experiments using the HQR decompositions to build a QR (eigenvalue) algorithm for H-matrices does not progress to a more efficient algorithm than the LR Cholesky algorithm. The implementation of the LR Cholesky algorithm for hierarchical matrices together with deflation and shift strategies yield...
The computation of eigenvalues of large-scale matrices arising from finite ele-ment discretizations ...
The QR-algorithm is a popular numerical method for the computation of eigenvalues of matrices. All e...
An effective strategy in dense linear algebra is the design of algorithms as tiled algorithms. Tiled...
This thesis is on the numerical computation of eigenvalues of symmetric hierarchical matrices. The n...
In this thesis we address the computation of a spectral decomposition for symmetric banded matrices....
The numerical solution of eigenvalue problems is essential in various application areas of scientifi...
The computation of eigenvalues of large-scale matrices arising from finite element discretizations h...
This PhD thesis is an important development in the theories, methods, and applications of eigenvalue...
We investigate the use of Rutishauser’s LR-Cholesky transformation [8] to com-pute all eigenvalues o...
The standard algorithms for dense matrices become expensive for large matrices, since the number of ...
The hierarchical (H-) matrix format allows storing a variety of dense matrices from certain applicat...
Abstract. This paper proposes a new type of iteration for computing eigenvalues of semiseparable (pl...
In this paper we present a new stable algorithm for the parallel QR-decomposition of ”tall and skinn...
Abstract. In this paper, we consider a class of hierarchically rank structured matrices that include...
We show how to build hierarchical, reduced-rank representation for large stochastic matrices and use...
The computation of eigenvalues of large-scale matrices arising from finite ele-ment discretizations ...
The QR-algorithm is a popular numerical method for the computation of eigenvalues of matrices. All e...
An effective strategy in dense linear algebra is the design of algorithms as tiled algorithms. Tiled...
This thesis is on the numerical computation of eigenvalues of symmetric hierarchical matrices. The n...
In this thesis we address the computation of a spectral decomposition for symmetric banded matrices....
The numerical solution of eigenvalue problems is essential in various application areas of scientifi...
The computation of eigenvalues of large-scale matrices arising from finite element discretizations h...
This PhD thesis is an important development in the theories, methods, and applications of eigenvalue...
We investigate the use of Rutishauser’s LR-Cholesky transformation [8] to com-pute all eigenvalues o...
The standard algorithms for dense matrices become expensive for large matrices, since the number of ...
The hierarchical (H-) matrix format allows storing a variety of dense matrices from certain applicat...
Abstract. This paper proposes a new type of iteration for computing eigenvalues of semiseparable (pl...
In this paper we present a new stable algorithm for the parallel QR-decomposition of ”tall and skinn...
Abstract. In this paper, we consider a class of hierarchically rank structured matrices that include...
We show how to build hierarchical, reduced-rank representation for large stochastic matrices and use...
The computation of eigenvalues of large-scale matrices arising from finite ele-ment discretizations ...
The QR-algorithm is a popular numerical method for the computation of eigenvalues of matrices. All e...
An effective strategy in dense linear algebra is the design of algorithms as tiled algorithms. Tiled...