International audienceThis paper develops a posteriori estimates for domain decomposition methods with optimized Robin transmission conditions on the interface between subdomains. We choose to demonstrate the methodology for mixed formulations, with a lowest-order Raviart–Thomas–Nédélec discretization, often used for heterogeneous and anisotropic porous media diffusion problems. Our estimators allow to distinguish the spatial discretization and the domain decomposition error components. We propose an adaptive domain decomposition algorithm wherein the iterations are stopped when the domain decomposition error does not affect significantly the overall error. Two main goals are thus achieved. First, a guaranteed bound on the overall error is ...
International audienceWe consider the solving of linear systems arising from porous media flow simul...
Optimized Schwarz methods are iterative domain decomposition procedures with greatly improved conver...
International audienceThis paper is concerned with the numerical solution of porous-media flow and t...
International audienceThis paper develops a posteriori estimates for domain decomposition methods wi...
We propose and analyze a posteriori estimates for global-in-time, nonoverlapping domain decompositio...
International audienceWe propose and analyse a posteriori estimates for global-in-time, nonoverlappi...
Cette thèse développe des estimations d’erreur a posteriori et critères d’arrêt pour les méthodes de...
International audienceWe consider two-phase flow in a porous medium composed of two different rock t...
This work contributes to the developpement of a posteriori error estimates and stopping criteria for...
The simulation of processes in highly heterogeneous media comes with many challenges. In particular ...
International audienceThis paper develops a posteriori estimates for global-in-time, nonoverlapping ...
We define optimal interface conditions for the additive Schwarz method (ASM) in the sense that conve...
We design and analyze a Schwarz waveform relaxation algorithm for domain decomposition of advection-...
International audienceWe consider the solving of linear systems arising from porous media flow simul...
Optimized Schwarz methods are iterative domain decomposition procedures with greatly improved conver...
International audienceThis paper is concerned with the numerical solution of porous-media flow and t...
International audienceThis paper develops a posteriori estimates for domain decomposition methods wi...
We propose and analyze a posteriori estimates for global-in-time, nonoverlapping domain decompositio...
International audienceWe propose and analyse a posteriori estimates for global-in-time, nonoverlappi...
Cette thèse développe des estimations d’erreur a posteriori et critères d’arrêt pour les méthodes de...
International audienceWe consider two-phase flow in a porous medium composed of two different rock t...
This work contributes to the developpement of a posteriori error estimates and stopping criteria for...
The simulation of processes in highly heterogeneous media comes with many challenges. In particular ...
International audienceThis paper develops a posteriori estimates for global-in-time, nonoverlapping ...
We define optimal interface conditions for the additive Schwarz method (ASM) in the sense that conve...
We design and analyze a Schwarz waveform relaxation algorithm for domain decomposition of advection-...
International audienceWe consider the solving of linear systems arising from porous media flow simul...
Optimized Schwarz methods are iterative domain decomposition procedures with greatly improved conver...
International audienceThis paper is concerned with the numerical solution of porous-media flow and t...