AbstractWe consider the approximation of eigenpairs of large-scale matrices arising from the discretization of integral operators with weakly singular function kernels. Efficient and fast solvers to numerically approximate the sought eigenpairs are required. For this, we would like to exploit the computational power of modern graphical processing units (GPUs), and we are interested in doing this from high-level libraries. We show how to use the CUDA add-on in the SLEPc/PETSc libraries to tackle this problem and illustrate our results on a radiative transfer problem in astrophysics. The CUDA-accelerated codes achieve considerable speedups versus the CPU counterparts on the same problem
The solution of (generalized) eigenvalue problems for symmetric or Hermitian matrices is a common su...
[EN] We consider the computation of a few eigenpairs of a generalized eigenvalue problem Ax = lambda...
Abstract—Krylov subspace solvers are often the method of choice when solving sparse linear systems i...
AbstractWe consider the approximation of eigenpairs of large-scale matrices arising from the discret...
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...
AbstractNowadays, GPU computations are playing significant role in supercomputing technologies. This...
In this thesis, we consider the numerical solution of a large eigenvalue problem in which the integr...
This paper describes the software package Cucheb, a GPU implementation of the filtered Lanczos proce...
As modern massively parallel clusters are getting larger with beefier compute nodes, traditional par...
In this paper, we present the StarNEig library for solving dense nonsymmetric standard and generaliz...
Obtaining the eigenvalues and eigenvectors of large matrices is a key problem in electronic structur...
This paper explores the early implementation of high-performance routines for the solution of multip...
This paper explores the early implementation of high- performance routines for the solution of multi...
The original publication is available at www.springerlink.comInternational audienceA wide class of g...
The solution of (generalized) eigenvalue problems for symmetric or Hermitian matrices is a common su...
[EN] We consider the computation of a few eigenpairs of a generalized eigenvalue problem Ax = lambda...
Abstract—Krylov subspace solvers are often the method of choice when solving sparse linear systems i...
AbstractWe consider the approximation of eigenpairs of large-scale matrices arising from the discret...
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...
AbstractNowadays, GPU computations are playing significant role in supercomputing technologies. This...
In this thesis, we consider the numerical solution of a large eigenvalue problem in which the integr...
This paper describes the software package Cucheb, a GPU implementation of the filtered Lanczos proce...
As modern massively parallel clusters are getting larger with beefier compute nodes, traditional par...
In this paper, we present the StarNEig library for solving dense nonsymmetric standard and generaliz...
Obtaining the eigenvalues and eigenvectors of large matrices is a key problem in electronic structur...
This paper explores the early implementation of high-performance routines for the solution of multip...
This paper explores the early implementation of high- performance routines for the solution of multi...
The original publication is available at www.springerlink.comInternational audienceA wide class of g...
The solution of (generalized) eigenvalue problems for symmetric or Hermitian matrices is a common su...
[EN] We consider the computation of a few eigenpairs of a generalized eigenvalue problem Ax = lambda...
Abstract—Krylov subspace solvers are often the method of choice when solving sparse linear systems i...