We introduce an adaptive domain decomposition (DD) method for solving saddle point problems defined as a block two by two matrix. The algorithm does not require any knowledge of the constrained space. We assume that all sub matrices are sparse and that the diagonal blocks are the sum of positive semi definite matrices. The latter assumption enables the design of adaptive coarse space for DD methods
In this article, different nonlinear domain decomposition methods are applied to nonlinear problems ...
The factorization method presented in this paper takes advantage of the special structures and prope...
In this article, different nonlinear domain decomposition methods are applied to nonlinear problems ...
We introduce an adaptive element-based domain decomposition (DD) method for solving saddle point pro...
International audienceScalability of parallel solvers for problems with high heterogeneities relies ...
Coarse grid correction is a key ingredient in order to have scalable domain decomposition methods. I...
Saddle point problems arise frequently in many applications in science and engineering, including co...
Domain decomposition methods are robust and parallel scalable, preconditioned iterative algorithms f...
In this thesis, we consider the problem of solving large and sparse linear systems of saddle point t...
International audienceWe consider the solving of linear systems arising from porous media flow simul...
AbstractWithin the FETI domain decomposition method applied to nonsymmetric linear systems, a generi...
Three domain decomposition methods for saddle point problems are introduced and compared. The first ...
International audienceIn this paper we present a class of robust and fully algebraic two-level preco...
Three domain decomposition methods for saddle point problems are introduced and compared. The first ...
Coarse-grid correction is a key ingredient of scalable domain decomposition methods. In this work we...
In this article, different nonlinear domain decomposition methods are applied to nonlinear problems ...
The factorization method presented in this paper takes advantage of the special structures and prope...
In this article, different nonlinear domain decomposition methods are applied to nonlinear problems ...
We introduce an adaptive element-based domain decomposition (DD) method for solving saddle point pro...
International audienceScalability of parallel solvers for problems with high heterogeneities relies ...
Coarse grid correction is a key ingredient in order to have scalable domain decomposition methods. I...
Saddle point problems arise frequently in many applications in science and engineering, including co...
Domain decomposition methods are robust and parallel scalable, preconditioned iterative algorithms f...
In this thesis, we consider the problem of solving large and sparse linear systems of saddle point t...
International audienceWe consider the solving of linear systems arising from porous media flow simul...
AbstractWithin the FETI domain decomposition method applied to nonsymmetric linear systems, a generi...
Three domain decomposition methods for saddle point problems are introduced and compared. The first ...
International audienceIn this paper we present a class of robust and fully algebraic two-level preco...
Three domain decomposition methods for saddle point problems are introduced and compared. The first ...
Coarse-grid correction is a key ingredient of scalable domain decomposition methods. In this work we...
In this article, different nonlinear domain decomposition methods are applied to nonlinear problems ...
The factorization method presented in this paper takes advantage of the special structures and prope...
In this article, different nonlinear domain decomposition methods are applied to nonlinear problems ...