In this paper, we develop an a posteriori error analysis for the stationary Stokes-Darcy coupled problem approximated by conforming the finite element method on isotropic meshes in ℝd, d∈2,3. The approach utilizes a new robust stabilized fully mixed discretization. The a posteriori error estimate is based on a suitable evaluation on the residual of the finite element solution plus the stabilization terms. It is proven that the a posteriori error estimate provided in this paper is both reliable and efficient
Abstract. In this paper, we consider mixed finite elements discretizations of a class of Quasi-Newto...
This work aims to introduce and analyze an adaptive stabilized finite element method to solve a nonl...
In this paper, we develop the a posteriori error estimation of mixed discontinuous Galerkin finite e...
We develop an a posteriori error analysis of residual type of a stabilized mixed finite element meth...
Abstract. In this paper we analyze a mixed finite element method for the coupling of fluid flow with...
The paper presents a posteriori error estimators for the stationary Stokes problem. We consider anis...
International audienceThe paper presents a posteriori error estimators for the stationary Stokes pro...
We develop the a posteriori error analysis for a mixed finite element method applied to the coupling...
A number of techniques, used as remedy to the instability of the Galerkin finite element formulation...
AbstractA posteriori estimates for mixed finite element discretizations of the Navier–Stokes equatio...
We develop the a posteriori error analysis for a mixed finite element method applied to the couplin...
Abstract. In this work, a numerical solution of the incompressible Navi-er-Stokes equations is propo...
The practical implementation of the lowest-order Pl - P0 (linear velocity, constant pressure) finite...
In this work, we develop an a posteriori error analysis of a conforming mixed finite element method ...
The implementation of quadratic velocity, linear pressure finite element approximation methods ...
Abstract. In this paper, we consider mixed finite elements discretizations of a class of Quasi-Newto...
This work aims to introduce and analyze an adaptive stabilized finite element method to solve a nonl...
In this paper, we develop the a posteriori error estimation of mixed discontinuous Galerkin finite e...
We develop an a posteriori error analysis of residual type of a stabilized mixed finite element meth...
Abstract. In this paper we analyze a mixed finite element method for the coupling of fluid flow with...
The paper presents a posteriori error estimators for the stationary Stokes problem. We consider anis...
International audienceThe paper presents a posteriori error estimators for the stationary Stokes pro...
We develop the a posteriori error analysis for a mixed finite element method applied to the coupling...
A number of techniques, used as remedy to the instability of the Galerkin finite element formulation...
AbstractA posteriori estimates for mixed finite element discretizations of the Navier–Stokes equatio...
We develop the a posteriori error analysis for a mixed finite element method applied to the couplin...
Abstract. In this work, a numerical solution of the incompressible Navi-er-Stokes equations is propo...
The practical implementation of the lowest-order Pl - P0 (linear velocity, constant pressure) finite...
In this work, we develop an a posteriori error analysis of a conforming mixed finite element method ...
The implementation of quadratic velocity, linear pressure finite element approximation methods ...
Abstract. In this paper, we consider mixed finite elements discretizations of a class of Quasi-Newto...
This work aims to introduce and analyze an adaptive stabilized finite element method to solve a nonl...
In this paper, we develop the a posteriori error estimation of mixed discontinuous Galerkin finite e...