Clusters of workstations have become a cost-effective means of performing scientific computations. However, large network latencies, resource sharing, and heterogeneity found in networks of clusters and Grids can impede the performance of applications not specifically tailored for use in such environments. A typical example is the traditional fine grain implementations of Krylov-like iterative methods, a central component in many scientific applications. To exploit the potential of these environments, advances in networking technology must be complemented by advances in parallel algorithmic design. In this paper, we present an algorithmic technique that increases the granularity of parallel, block iterative methods by inducing additional wo...
Abstract Efficiently solving large sparse linear systems on loosely coupled net-works of computers i...
Efficient solution of partial differential equations require a match between the algorithm and the t...
Most computational work in Jacobi-Davidson [9], an iterative method for large scale eigenvalue probl...
Iterative solvers for eigenvalue problems are often the only means of computing the extremal eigenva...
Parallel iterative solvers are often the only means of solving large linear systems and eigenproblem...
Clusters of homogeneous workstations built around fast networks have become popular means of solving...
Block variants of the Jacobi-Davidson method for computing a few extreme eigenpairs of a large spars...
We investigate a block Jacobi-Davidson method for computing a few exterior eigenpairs of a large spa...
This thesis deals with the computation of a small set of exterior eigenvalues of a given large spar...
Sparse matrix operations dominate the cost of many scientific applications. In parallel, the perform...
The complexity of the latest HPC architectures increasingly limits the productivity of researchers i...
A major challenge in undertaking high resolution numerical simulations for engineering problems come...
Efficient solution of partial differential equations require a match between the algorithm and the t...
The solution of elliptic partial differential equations is a common performance bottleneck in scient...
Block variants of the Jacobi-Davidson method for computing a few eigenpairs of a large sparse matrix...
Abstract Efficiently solving large sparse linear systems on loosely coupled net-works of computers i...
Efficient solution of partial differential equations require a match between the algorithm and the t...
Most computational work in Jacobi-Davidson [9], an iterative method for large scale eigenvalue probl...
Iterative solvers for eigenvalue problems are often the only means of computing the extremal eigenva...
Parallel iterative solvers are often the only means of solving large linear systems and eigenproblem...
Clusters of homogeneous workstations built around fast networks have become popular means of solving...
Block variants of the Jacobi-Davidson method for computing a few extreme eigenpairs of a large spars...
We investigate a block Jacobi-Davidson method for computing a few exterior eigenpairs of a large spa...
This thesis deals with the computation of a small set of exterior eigenvalues of a given large spar...
Sparse matrix operations dominate the cost of many scientific applications. In parallel, the perform...
The complexity of the latest HPC architectures increasingly limits the productivity of researchers i...
A major challenge in undertaking high resolution numerical simulations for engineering problems come...
Efficient solution of partial differential equations require a match between the algorithm and the t...
The solution of elliptic partial differential equations is a common performance bottleneck in scient...
Block variants of the Jacobi-Davidson method for computing a few eigenpairs of a large sparse matrix...
Abstract Efficiently solving large sparse linear systems on loosely coupled net-works of computers i...
Efficient solution of partial differential equations require a match between the algorithm and the t...
Most computational work in Jacobi-Davidson [9], an iterative method for large scale eigenvalue probl...