International audienceSolving large sparse linear systems is essential in numerous scientific domains. Several algorithms, based on direct or iterative methods, have been developed for parallel architectures. On distributed grids consisting of processors located in distant geographical sites, their performance may be unsatisfactory because they suffer from too many synchronizations and communications. The GREMLINS code has been developed for solving large sparse linear systems on distributed grids. It implements the multisplitting method that consists in splitting the original linear system into several subsystems that can be solved independently. In this paper, the performance of the GREMLINS code obtained with several libraries for solvin...
This paper evaluates portable software packages for the iterative solution of very large sparse lin...
The need to solve large sparse linear systems of equations efficiently lies at the heart of many app...
It is important to have a fast, robust and scalable algorithm to solve a sparse linear system AX=B. ...
International audienceTraditional largesparselinearsolvers are not suited in agrid computing environ...
International audienceMany scientific applications need to solve very large sparse linear systems in...
International audienceIn this paper, we show how to solve large sparse linear systems in a grid envi...
In this paper we describe an efficient iterative algorithm for solving large sparse linear systems o...
Iterative methods for solving large sparse systems of linear equations are widely used in many HPC a...
International audienceGrid computing focuses on making use of a very large amount of resources from ...
International audienceIn this paper, we revisit the Krylov multisplitting algorithm presented in Hua...
Solution of large sparse linear systems is frequently the most time consuming operation in computati...
. The efficiency of solving sparse linear systems on parallel processors and more complex multiclust...
The paper deals with parallel approach for the numerical solution of large, sparse, non-symmetric sy...
Abstract Efficiently solving large sparse linear systems on loosely coupled net-works of computers i...
This paper provides a comprehensive study and comparison of two state-of-the-art direct solvers for ...
This paper evaluates portable software packages for the iterative solution of very large sparse lin...
The need to solve large sparse linear systems of equations efficiently lies at the heart of many app...
It is important to have a fast, robust and scalable algorithm to solve a sparse linear system AX=B. ...
International audienceTraditional largesparselinearsolvers are not suited in agrid computing environ...
International audienceMany scientific applications need to solve very large sparse linear systems in...
International audienceIn this paper, we show how to solve large sparse linear systems in a grid envi...
In this paper we describe an efficient iterative algorithm for solving large sparse linear systems o...
Iterative methods for solving large sparse systems of linear equations are widely used in many HPC a...
International audienceGrid computing focuses on making use of a very large amount of resources from ...
International audienceIn this paper, we revisit the Krylov multisplitting algorithm presented in Hua...
Solution of large sparse linear systems is frequently the most time consuming operation in computati...
. The efficiency of solving sparse linear systems on parallel processors and more complex multiclust...
The paper deals with parallel approach for the numerical solution of large, sparse, non-symmetric sy...
Abstract Efficiently solving large sparse linear systems on loosely coupled net-works of computers i...
This paper provides a comprehensive study and comparison of two state-of-the-art direct solvers for ...
This paper evaluates portable software packages for the iterative solution of very large sparse lin...
The need to solve large sparse linear systems of equations efficiently lies at the heart of many app...
It is important to have a fast, robust and scalable algorithm to solve a sparse linear system AX=B. ...