International audienceIn this paper, we present, evaluate and analyse the performance of parallel synchronous Jacobi algorithms by different partitioned procedures including band-row splitting, band-row sparsity pattern splitting and substructuring splitting, when solving sparse large linear systems. Numerical experiments performed on a set of academic 3D Laplace equation and on a real gravity matrices arising from the Chicxulub crater are exhibited, and show the impact of splitting on parallel synchronous iterations when solving sparse large linear systems. The numerical results clearly show the interest of substructuring methods compared to band-row splitting strategies. © 2016 IEEE
The paper deals with parallel approach for the numerical solution of large, sparse, non-symmetric sy...
AbstractThe use of implicit methods for numerically solving stiff systems of differential equations ...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/15...
International audienceIn this paper, we present, evaluate and analyse the performance of parallel sy...
An over view of advanced techniques for solving large sparse linear systems of equations is presente...
International audienceIn this paper, we revisit the Krylov multisplitting algorithm presented in Hua...
This paper describes implementations of eight algorithms of Newton and quasi-Newton type for solving...
In this paper we present the results obtained through the use of a block iterative row-projection me...
A parallel algorithm based on Jacobi iterations is proposed to minimize the augmented Lagrangian fun...
In this review paper, we consider some important developments and trends in algorithm design for t...
International audienceMany scientific applications need to solve very large sparse linear systems in...
The need to solve large sparse linear systems of equations efficiently lies at the heart of many app...
Iterative methods for solving large sparse systems of linear equations are widely used in many HPC a...
We present an overview of parallel direct methods for solving sparse systems of linear equations, fo...
The Jacobi\u2013Davidson (JD) algorithm was recently proposed for evaluating a number of the eigenva...
The paper deals with parallel approach for the numerical solution of large, sparse, non-symmetric sy...
AbstractThe use of implicit methods for numerically solving stiff systems of differential equations ...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/15...
International audienceIn this paper, we present, evaluate and analyse the performance of parallel sy...
An over view of advanced techniques for solving large sparse linear systems of equations is presente...
International audienceIn this paper, we revisit the Krylov multisplitting algorithm presented in Hua...
This paper describes implementations of eight algorithms of Newton and quasi-Newton type for solving...
In this paper we present the results obtained through the use of a block iterative row-projection me...
A parallel algorithm based on Jacobi iterations is proposed to minimize the augmented Lagrangian fun...
In this review paper, we consider some important developments and trends in algorithm design for t...
International audienceMany scientific applications need to solve very large sparse linear systems in...
The need to solve large sparse linear systems of equations efficiently lies at the heart of many app...
Iterative methods for solving large sparse systems of linear equations are widely used in many HPC a...
We present an overview of parallel direct methods for solving sparse systems of linear equations, fo...
The Jacobi\u2013Davidson (JD) algorithm was recently proposed for evaluating a number of the eigenva...
The paper deals with parallel approach for the numerical solution of large, sparse, non-symmetric sy...
AbstractThe use of implicit methods for numerically solving stiff systems of differential equations ...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/15...