The convergence and optimality of adaptive mixed finite element methods for the Poisson equation are established in this paper. The main difficulty for mixed finite element methods is the lack of minimization principle and thus the failure of orthogonality. A quasi-orthogonality property is proved using the fact that the error is orthogonal to the divergence free subspace, while the part of the error that is not divergence free can be bounded by the data oscillation using a discrete stability result. This discrete stability result is also used to get a localized discrete upper bound which is crucial for the proof of the optimality of the adaptive approximation.Mathematics, AppliedSCI(E)0ARTICLE26535-537
We study a non standard mixed formulation of the Poisson problem, sometimes known as dual mixed form...
A new minimization principle for the Poisson equation using two variables – the solution and the g...
Abstract. Least-squares finite element methods for first-order formulations of the Poisson equation ...
ABSTRACT. The convergence and optimality of adaptive mixed finite element methods for the Poisson eq...
Abstract. The convergence of an adaptive mixed finite element method for general second order linear...
International audienceWe prove convergence and optimal complexity of an adaptive mixed finite elemen...
Recently, we devised an approach to a posteriori error analysis, which clarifies the role of oscilla...
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In this article, the convergence of an adaptive mixed finite element method for general second-order...
For the planar Navier–Lamé equation in mixed form with symmetric stress tensors, we prove the unifor...
In this paper, we prove that the standard adaptive finite element method with a (modified) maximum m...
Abstract. In this paper, we introduce and analyze a simple adaptive finite element method for second...
We analyze the simplest and most standard adaptive finite element method (AFEM), with any polynomial...
In this paper, we establish optimal convergence rates for an adaptive mixed finite element method fo...
We study a non standard mixed formulation of the Poisson problem, sometimes known as dual mixed form...
A new minimization principle for the Poisson equation using two variables – the solution and the g...
Abstract. Least-squares finite element methods for first-order formulations of the Poisson equation ...
ABSTRACT. The convergence and optimality of adaptive mixed finite element methods for the Poisson eq...
Abstract. The convergence of an adaptive mixed finite element method for general second order linear...
International audienceWe prove convergence and optimal complexity of an adaptive mixed finite elemen...
Recently, we devised an approach to a posteriori error analysis, which clarifies the role of oscilla...
AbstractThis paper aims first at a simultaneous axiomatic presentation of the proof of optimal conve...
In this paper, an adaptive ¯nite element method is constructed\ud for solving elliptic equations tha...
In this article, the convergence of an adaptive mixed finite element method for general second-order...
For the planar Navier–Lamé equation in mixed form with symmetric stress tensors, we prove the unifor...
In this paper, we prove that the standard adaptive finite element method with a (modified) maximum m...
Abstract. In this paper, we introduce and analyze a simple adaptive finite element method for second...
We analyze the simplest and most standard adaptive finite element method (AFEM), with any polynomial...
In this paper, we establish optimal convergence rates for an adaptive mixed finite element method fo...
We study a non standard mixed formulation of the Poisson problem, sometimes known as dual mixed form...
A new minimization principle for the Poisson equation using two variables – the solution and the g...
Abstract. Least-squares finite element methods for first-order formulations of the Poisson equation ...