International audienceTo solve sparse systems of linear equations, multifrontal methods rely on dense partial LU decompositions of so-called frontal matrices; we consider a parallel asynchronous setting in which several frontal matrices can be factored simultaneously.In this context, to address performance and scalability issues of acyclic pipelined asynchronous factorization kernels, we study models to revisit properties of left and right-looking variants of partial \(LU\) decompositions, study the use of several levels of blocking, before focusing on communication issues.The general purpose sparse solver MUMPS has been modified to implement the proposed algorithms and confirm the properties demonstrated by the models
International audienceABSTRACT The memory usage of sparse direct solvers can be the bottleneck to so...
International audienceThe memory usage of sparse direct solvers can be the bottleneck to solve large...
We present a sparse linear system solver that is based on a multifrontal variant of Gaussian elimina...
International audienceTo solve sparse systems of linear equations, multifrontal methods rely on dens...
We consider the solution of both symmetric and unsymmetric systems of sparse linear equations. A new...
Sparse matrix factorization algorithms are typically characterized by irregular memory access patter...
International audienceWe describe how to enhance parallelism in an asynchronous distributed-memory e...
We consider several issues involved in the solution of sparse symmetric positive definite system b...
This paper provides a comprehensive study and comparison of two state-of-the-art direct solvers for ...
Systems of linear equations arise at the heart of many scientific and engineering applications. Many...
We consider the solution of very large sparse systems of linear equations on parallel architectures....
(eng) The memory usage of sparse direct solvers can be the bottleneck to solve large-scale problems ...
We study, using analytic models and simulation, the performance of the multifrontal methods on distr...
The memory usage of sparse direct solvers can be the bottleneck to solve large-scale problems involv...
We present a sparse linear system solver that is based on a multifrontal variant of Gaussian elimina...
International audienceABSTRACT The memory usage of sparse direct solvers can be the bottleneck to so...
International audienceThe memory usage of sparse direct solvers can be the bottleneck to solve large...
We present a sparse linear system solver that is based on a multifrontal variant of Gaussian elimina...
International audienceTo solve sparse systems of linear equations, multifrontal methods rely on dens...
We consider the solution of both symmetric and unsymmetric systems of sparse linear equations. A new...
Sparse matrix factorization algorithms are typically characterized by irregular memory access patter...
International audienceWe describe how to enhance parallelism in an asynchronous distributed-memory e...
We consider several issues involved in the solution of sparse symmetric positive definite system b...
This paper provides a comprehensive study and comparison of two state-of-the-art direct solvers for ...
Systems of linear equations arise at the heart of many scientific and engineering applications. Many...
We consider the solution of very large sparse systems of linear equations on parallel architectures....
(eng) The memory usage of sparse direct solvers can be the bottleneck to solve large-scale problems ...
We study, using analytic models and simulation, the performance of the multifrontal methods on distr...
The memory usage of sparse direct solvers can be the bottleneck to solve large-scale problems involv...
We present a sparse linear system solver that is based on a multifrontal variant of Gaussian elimina...
International audienceABSTRACT The memory usage of sparse direct solvers can be the bottleneck to so...
International audienceThe memory usage of sparse direct solvers can be the bottleneck to solve large...
We present a sparse linear system solver that is based on a multifrontal variant of Gaussian elimina...