The solution of large linear problems is one of the most time consuming kernels in many numerical simulations. On the one hand, the computational linear algebra community has developed several high performance linear solvers that only require algebraic information (the matrix K and its associated right-hand side f) to compute the solution x such that Kx = f. On the other hand, the Domain Decomposition (DD) community has developed many efficient and robust methods in the last decades, that take into account the underlying partial differential equation and the geometry to accelerate the solution of such problems. In this thesis, both approaches are combined: an analysis of coarse correction for abstract Schwarz (aS) DD solvers is proposed, le...
International audienceIn this paper we present a multilevel preconditioner based on overlapping Schw...
This thesis presents a set of numerical schemes that aim at solving large linear systems on parallel...
International audienceWe consider the solving of linear systems arising from porous media flow simul...
The solution of large linear problems is one of the most time consuming kernels in many numerical si...
The solution of large linear problems is one of the most time consuming kernels in many numerical si...
La résolution de grands systèmes linéaires est une des étapes les plus consommatrices en temps des s...
This thesis introduces a unified framework for various domain decomposition methods:those with overl...
The objective of this thesis is to use domain decomposition methods to develop new efficient methods...
International audienceThe solution of large sparse linear systems is one of the most time consuming ...
L'objectif de cette thèse est de concevoir des méthodes de décomposition de domaine qui sont robuste...
This thesis presents a work on iterative methods for solving linear systems that aim at reducing the...
This thesis presents a set of routines that aim at solving large linear systems on parallel computer...
In this paper, we present an hybrid solver for linear systems that combines a Krylov subspace method...
International audienceIn this paper we present a multilevel preconditioner based on overlapping Schw...
This thesis presents a set of numerical schemes that aim at solving large linear systems on parallel...
International audienceWe consider the solving of linear systems arising from porous media flow simul...
The solution of large linear problems is one of the most time consuming kernels in many numerical si...
The solution of large linear problems is one of the most time consuming kernels in many numerical si...
La résolution de grands systèmes linéaires est une des étapes les plus consommatrices en temps des s...
This thesis introduces a unified framework for various domain decomposition methods:those with overl...
The objective of this thesis is to use domain decomposition methods to develop new efficient methods...
International audienceThe solution of large sparse linear systems is one of the most time consuming ...
L'objectif de cette thèse est de concevoir des méthodes de décomposition de domaine qui sont robuste...
This thesis presents a work on iterative methods for solving linear systems that aim at reducing the...
This thesis presents a set of routines that aim at solving large linear systems on parallel computer...
In this paper, we present an hybrid solver for linear systems that combines a Krylov subspace method...
International audienceIn this paper we present a multilevel preconditioner based on overlapping Schw...
This thesis presents a set of numerical schemes that aim at solving large linear systems on parallel...
International audienceWe consider the solving of linear systems arising from porous media flow simul...