International audienceThis work proposes an \textit{a priori} error estimate of a multiscale finite element method to solve convection-diffusion problems where both velocity and diffusion coefficient exhibit strong variations at a scale which is much smaller than the domain of resolution. In that case, classical discretization methods, used at the scale of the heterogeneities, turn out to be too costly. Our method, introduced in~\cite{ECCOMAS}, aims at solving this kind of problems on coarser grids with respect to the size of the heterogeneities by means of particular basis functions. These basis functions are defined using cell problems and are designed to reproduce the variations of the solution on an underlying fine grid. Since all cell ...
Long simulation times in climate sciences typically require coarse grids due to computational constr...
This thesis develops strategies for a posteriori error control of discretization and model errors, a...
We introduce a numerical homogenization method based on a discontinuous Galerkin finite element hete...
International audienceThis work proposes an \textit{a priori} error estimate of a multiscale finite ...
This work deals with the study and the implementation of a multiscale finite element method for the ...
This article presents a general framework to estimate the pointwise error of linear partial differen...
We present an "a posteriori" error analysis in quantities of interest for elliptic homogenization pr...
A discontinuous Galerkin finite element heterogeneous multiscale method is proposed for advection-di...
We give an overview of different methods for solving highly heterogeneous elliptic problems with mul...
We derive fully computable a posteriori error estimates for vertex-centered finite volume-type discr...
Abstract. Heterogeneous multiscale methods have been introduced by E and Engquist [Com-mun. Math. Sc...
In this thesis we develop and analyze the performance ofadaptive finite element methods for multiphy...
International audienceWe derive in this paper a posteriori error estimates for discretizations of co...
The multiscale finite element method (MsFEM) is developed in the vein of the Crouzeix--Raviart eleme...
International audienceWe derive fully computable a posteriori error estimates for vertex-centered fi...
Long simulation times in climate sciences typically require coarse grids due to computational constr...
This thesis develops strategies for a posteriori error control of discretization and model errors, a...
We introduce a numerical homogenization method based on a discontinuous Galerkin finite element hete...
International audienceThis work proposes an \textit{a priori} error estimate of a multiscale finite ...
This work deals with the study and the implementation of a multiscale finite element method for the ...
This article presents a general framework to estimate the pointwise error of linear partial differen...
We present an "a posteriori" error analysis in quantities of interest for elliptic homogenization pr...
A discontinuous Galerkin finite element heterogeneous multiscale method is proposed for advection-di...
We give an overview of different methods for solving highly heterogeneous elliptic problems with mul...
We derive fully computable a posteriori error estimates for vertex-centered finite volume-type discr...
Abstract. Heterogeneous multiscale methods have been introduced by E and Engquist [Com-mun. Math. Sc...
In this thesis we develop and analyze the performance ofadaptive finite element methods for multiphy...
International audienceWe derive in this paper a posteriori error estimates for discretizations of co...
The multiscale finite element method (MsFEM) is developed in the vein of the Crouzeix--Raviart eleme...
International audienceWe derive fully computable a posteriori error estimates for vertex-centered fi...
Long simulation times in climate sciences typically require coarse grids due to computational constr...
This thesis develops strategies for a posteriori error control of discretization and model errors, a...
We introduce a numerical homogenization method based on a discontinuous Galerkin finite element hete...