We design a distributed-memory randomized structured multifrontal solver for large sparse matrices. Two layers of hierarchical tree parallelism are used. A sequence of innovative parallel methods are developed for randomized structured frontal matrix operations, structured update matrix computation, skinny extend-add operation, selected entry extraction from structured matrices, etc. Several strategies are proposed to reuse computations and reduce communications. Unlike an earlier parallel structured multifrontal method that still involves large dense intermediate matrices, our parallel solver performs the major operations in terms of skinny matrices and fully structured forms. It thus significantly enhances the efficiency and scalability. ...
This dissertation presents several fast and stable algorithms for both dense and sparse matrices bas...
Nous nous intéressons à la résolution de systèmes linéaires creux de très grande taille par des méth...
This paper provides a comprehensive study and comparison of two state-of-the-art direct solvers for ...
We present a sparse linear system solver that is based on a multifrontal variant of Gaussian elimina...
We present a sparse linear system solver that is based on a multifrontal variant of Gaussian elimina...
The dissertation presents some fast direct solvers and efficient preconditioners mainly for sparse m...
International audienceDirect methods for the solution of sparse systems of linear equations of the f...
We consider several issues involved in the solution of sparse symmetric positive definite system b...
Gary Kumfert and Alex Pothen have improved the quality and run time of two ordering algorithms for m...
We consider the solution of both symmetric and unsymmetric systems of sparse linear equations. A new...
Direct methods for the solution of sparse systems of linear equations are used in a wide range of nu...
SuiteSparseQR is a sparse multifrontal QR factorization algorithm. Dense matrix methods within each ...
We consider the solution of large sparse linear systems by means of direct factorization based on a ...
We present a distributed-memory library for computations with dense structured matrices. A matrix is...
To solve sparse systems of linear equations, multifrontal methods rely on dense partial LU decomposi...
This dissertation presents several fast and stable algorithms for both dense and sparse matrices bas...
Nous nous intéressons à la résolution de systèmes linéaires creux de très grande taille par des méth...
This paper provides a comprehensive study and comparison of two state-of-the-art direct solvers for ...
We present a sparse linear system solver that is based on a multifrontal variant of Gaussian elimina...
We present a sparse linear system solver that is based on a multifrontal variant of Gaussian elimina...
The dissertation presents some fast direct solvers and efficient preconditioners mainly for sparse m...
International audienceDirect methods for the solution of sparse systems of linear equations of the f...
We consider several issues involved in the solution of sparse symmetric positive definite system b...
Gary Kumfert and Alex Pothen have improved the quality and run time of two ordering algorithms for m...
We consider the solution of both symmetric and unsymmetric systems of sparse linear equations. A new...
Direct methods for the solution of sparse systems of linear equations are used in a wide range of nu...
SuiteSparseQR is a sparse multifrontal QR factorization algorithm. Dense matrix methods within each ...
We consider the solution of large sparse linear systems by means of direct factorization based on a ...
We present a distributed-memory library for computations with dense structured matrices. A matrix is...
To solve sparse systems of linear equations, multifrontal methods rely on dense partial LU decomposi...
This dissertation presents several fast and stable algorithms for both dense and sparse matrices bas...
Nous nous intéressons à la résolution de systèmes linéaires creux de très grande taille par des méth...
This paper provides a comprehensive study and comparison of two state-of-the-art direct solvers for ...