International audienceThis paper extends explicit a posteriori error estimators based on the variational multiscale theory to systems of equations. In particular, the emphasis is placed on flow problems: the Euler and Navier–Stokes equations. Three error estimators are proposed: the standard, the naive and the upper bound. Numerical results show that with a very economical algorithm the attained global and local efficiencies for the naive approach are reasonably close to unity whereas the standard and upper bound approaches give, respectively, approximate lower and higher error estimates
We give an overview of different methods for solving highly heterogeneous elliptic problems with mul...
AbstractA posteriori estimates for mixed finite element discretizations of the Navier–Stokes equatio...
In this thesis we present a new adaptive multiscale method for solving elliptic partial differential...
A-posteriori error estimation of convection-dominated and hyperbolic flow problems remains one of th...
Abstract. A-posteriori error estimation of convection-dominated and hyperbolic flow problems remains...
Abstract. In this paper, an explicit a posteriori error estimator is developed for second and fourth...
This article investigates an explicit a-posteriori error estimator for the finite element approximat...
In this work an explicit a posteriori error estimator for the steady incompressible Navier–Stokes eq...
This article presents a general framework to estimate the pointwise error of linear partial differen...
International audienceThis work is motivated by the success of the anisotropic adaptive finite eleme...
This thesis is focused on the development and numerical justification of a modern computational meth...
The paper presents finite element error estimates of a variational multiscale method (VMS) for the i...
The papers included in the thesis are focused on functional type a posteriori error estimates for t...
A posteriori error estimate for the Navier-Stokes equations is applied to fluid flow in a domain wit...
International audienceIn this work, we present a new a posteriori error estimator based on the Varia...
We give an overview of different methods for solving highly heterogeneous elliptic problems with mul...
AbstractA posteriori estimates for mixed finite element discretizations of the Navier–Stokes equatio...
In this thesis we present a new adaptive multiscale method for solving elliptic partial differential...
A-posteriori error estimation of convection-dominated and hyperbolic flow problems remains one of th...
Abstract. A-posteriori error estimation of convection-dominated and hyperbolic flow problems remains...
Abstract. In this paper, an explicit a posteriori error estimator is developed for second and fourth...
This article investigates an explicit a-posteriori error estimator for the finite element approximat...
In this work an explicit a posteriori error estimator for the steady incompressible Navier–Stokes eq...
This article presents a general framework to estimate the pointwise error of linear partial differen...
International audienceThis work is motivated by the success of the anisotropic adaptive finite eleme...
This thesis is focused on the development and numerical justification of a modern computational meth...
The paper presents finite element error estimates of a variational multiscale method (VMS) for the i...
The papers included in the thesis are focused on functional type a posteriori error estimates for t...
A posteriori error estimate for the Navier-Stokes equations is applied to fluid flow in a domain wit...
International audienceIn this work, we present a new a posteriori error estimator based on the Varia...
We give an overview of different methods for solving highly heterogeneous elliptic problems with mul...
AbstractA posteriori estimates for mixed finite element discretizations of the Navier–Stokes equatio...
In this thesis we present a new adaptive multiscale method for solving elliptic partial differential...