The final publication is available at Springer via http://dx.doi.org/10.1007/978-3-319-32149-3_18In an eigenvalue problem defined by one or two matrices with block-tridiagonal structure, if only a few eigenpairs are required it is interesting to consider iterative methods based on Krylov subspaces, even if matrix blocks are dense. In this context, using the GPU for the associated dense linear algebra may provide high performance. We analyze this in an implementation done in the context of SLEPc, the Scalable Library for Eigenvalue Problem Computations. In the case of a generalized eigenproblem or when interior eigenvalues are computed with shift-and-invert, the main computational kernel is the solution of linear systems with a block-tridia...
Abstract—Krylov subspace solvers are often the method of choice when solving sparse linear systems i...
We investigate the performance of the routines in LAPACK and the Successive Band Reduction (SBR) too...
Block iterative methods are extremely important as smoothers for multigrid methods, as preconditione...
The final publication is available at Springer via http://dx.doi.org/10.1007/978-3-319-32149-3_18In...
[EN] We consider the computation of a few eigenpairs of a generalized eigenvalue problem Ax = lambda...
We compare two approaches to compute a fraction of the spectrum of dense symmetric definite generali...
Abstract. Polynomial eigenvalue problems are often found in scientific computing applications. When ...
We compare two approaches to compute a fraction of the spectrum of dense symmetric definite generali...
Many eigenvalue and eigenvector algorithms begin with reducing the input matrix into a tridiagonal ...
This thesis contributes to the field of sparse linear algebra, graph applications, and preconditione...
Polynomial eigenvalue problems are often found in scientific computing applications. When the coeffi...
AbstractNew methods for computing eigenvectors of symmetric block tridiagonal matrices based on twis...
The research conducted in this thesis provides a robust implementation of a preconditioned iterative...
Abstract. Linear systems are required to solve in many scientific applications and the solution of t...
Communicated by Yasuaki Ito Solution of large-scale dense nonsymmetric eigenvalue problem is require...
Abstract—Krylov subspace solvers are often the method of choice when solving sparse linear systems i...
We investigate the performance of the routines in LAPACK and the Successive Band Reduction (SBR) too...
Block iterative methods are extremely important as smoothers for multigrid methods, as preconditione...
The final publication is available at Springer via http://dx.doi.org/10.1007/978-3-319-32149-3_18In...
[EN] We consider the computation of a few eigenpairs of a generalized eigenvalue problem Ax = lambda...
We compare two approaches to compute a fraction of the spectrum of dense symmetric definite generali...
Abstract. Polynomial eigenvalue problems are often found in scientific computing applications. When ...
We compare two approaches to compute a fraction of the spectrum of dense symmetric definite generali...
Many eigenvalue and eigenvector algorithms begin with reducing the input matrix into a tridiagonal ...
This thesis contributes to the field of sparse linear algebra, graph applications, and preconditione...
Polynomial eigenvalue problems are often found in scientific computing applications. When the coeffi...
AbstractNew methods for computing eigenvectors of symmetric block tridiagonal matrices based on twis...
The research conducted in this thesis provides a robust implementation of a preconditioned iterative...
Abstract. Linear systems are required to solve in many scientific applications and the solution of t...
Communicated by Yasuaki Ito Solution of large-scale dense nonsymmetric eigenvalue problem is require...
Abstract—Krylov subspace solvers are often the method of choice when solving sparse linear systems i...
We investigate the performance of the routines in LAPACK and the Successive Band Reduction (SBR) too...
Block iterative methods are extremely important as smoothers for multigrid methods, as preconditione...