AbstractIn this work, we consider the numerical solution of a large eigenvalue problem resulting from a finite rank discretization of an integral operator. We are interested in computing a few eigenpairs, with an iterative method, so a matrix representation that allows for fast matrix-vector products is required. Hierarchical matrices are appropriate for this setting, and also provide cheap LU decompositions required in the spectral transformation technique. We illustrate the use of freely available software tools to address the problem, in particular SLEPc for the eigensolvers and HLib for the construction of H-matrices. The numerical tests are performed using an astrophysics application. Results show the benefits of the data-sparse repres...
The ESSEX project is an ongoing effort to provide exascale-enabled sparse eigensolvers, especially f...
This thesis deals with the computation of a small set of exterior eigenvalues of a given large spar...
Sparse eigenproblems are important for various applications in computer graphics. The spectrum and e...
In this work, we consider the numerical solution of a large eigenvalue problem resulting from a fini...
AbstractIn this work, we consider the numerical solution of a large eigenvalue problem resulting fro...
In this thesis, we consider the numerical solution of a large eigenvalue problem in which the integr...
AbstractWe consider the approximation of eigenpairs of large-scale matrices arising from the discret...
2The computation of a number of the smallest eigenvalues of large and sparse matrices is crucial in ...
An important problem in scientific computing consists in finding a few eigenvalues and corresponding...
A hierarchical matrix is an efficient data-sparse representation of a matrix, especially useful for ...
In this paper we propose a new iterative method to hierarchically compute a relatively large number ...
This thesis is on the numerical computation of eigenvalues of symmetric hierarchical matrices. The n...
The matrix N (Λ) whose elements are functions of a parameter Λ is called the Λ-matrix. Those values...
This thesis treats a number of aspects of subspace methods for various eigenvalue problems. Vibrat...
International audienceIterative linear algebra methods to solve linear systems and eigenvalue proble...
The ESSEX project is an ongoing effort to provide exascale-enabled sparse eigensolvers, especially f...
This thesis deals with the computation of a small set of exterior eigenvalues of a given large spar...
Sparse eigenproblems are important for various applications in computer graphics. The spectrum and e...
In this work, we consider the numerical solution of a large eigenvalue problem resulting from a fini...
AbstractIn this work, we consider the numerical solution of a large eigenvalue problem resulting fro...
In this thesis, we consider the numerical solution of a large eigenvalue problem in which the integr...
AbstractWe consider the approximation of eigenpairs of large-scale matrices arising from the discret...
2The computation of a number of the smallest eigenvalues of large and sparse matrices is crucial in ...
An important problem in scientific computing consists in finding a few eigenvalues and corresponding...
A hierarchical matrix is an efficient data-sparse representation of a matrix, especially useful for ...
In this paper we propose a new iterative method to hierarchically compute a relatively large number ...
This thesis is on the numerical computation of eigenvalues of symmetric hierarchical matrices. The n...
The matrix N (Λ) whose elements are functions of a parameter Λ is called the Λ-matrix. Those values...
This thesis treats a number of aspects of subspace methods for various eigenvalue problems. Vibrat...
International audienceIterative linear algebra methods to solve linear systems and eigenvalue proble...
The ESSEX project is an ongoing effort to provide exascale-enabled sparse eigensolvers, especially f...
This thesis deals with the computation of a small set of exterior eigenvalues of a given large spar...
Sparse eigenproblems are important for various applications in computer graphics. The spectrum and e...