This paper derives a posteriori error estimates for the mixed numerical approximation of the Laplace eigenvalue problem. We discuss a reconstruction in the standard H 0 1 -conforming space for the primal variable of the mixed Laplace eigenvalue problem and compare it with analogous approaches present in the literature for the corresponding source problem. In the case of Raviart-Thomas finite elements of arbitrary polynomial degree, the resulting error estimator constitutes a guaranteed upper bound for the error and is shown to be local efficient. Our reconstruction is performed locally on a set of vertex patches
This thesis is concerned with the finite element analysis and the a posteriori error estimation for ...
Abstract. Finite element exterior calculus (FEEC) has been developed over the past decade as a frame...
Abstract: We consider the Stokes eigenvalue problem. For the eigenvalues we derive both upper and lo...
This paper derives a posteriori error estimates for the mixed numerical approximation of the Laplace...
International audienceThis paper develops a general framework for a posteriori error estimates in nu...
International audienceThis paper derives a posteriori error estimates for conforming numerical appro...
In this paper, we study an a posteriori error indicator introduced in E. Dari, R.G. Durán, and C. Pa...
In this paper we obtain a priori and a posteriori error estimates for stabilized low-order mixed fin...
This paper deals with a posteriori error estimators for the linear finite element approx-imation of ...
We consider the approximation of eigenvalue problem for the Laplacian by the Crouzeix– Raviart non-c...
Abstract. In this paper we introduce and analyze an a posteriori error estimator for the linear fini...
In this paper,we present an a posteriori error analysis for mixed finite element approximation of co...
AbstractIn this paper, we present an a posteriori error analysis for mixed finite element approximat...
We consider an adaptive finite element method (AFEM) for the Laplace eigenvalue problem in bounded p...
This paper discusses the nonconforming rotated Q1 finite element computable upper bound a posteriori...
This thesis is concerned with the finite element analysis and the a posteriori error estimation for ...
Abstract. Finite element exterior calculus (FEEC) has been developed over the past decade as a frame...
Abstract: We consider the Stokes eigenvalue problem. For the eigenvalues we derive both upper and lo...
This paper derives a posteriori error estimates for the mixed numerical approximation of the Laplace...
International audienceThis paper develops a general framework for a posteriori error estimates in nu...
International audienceThis paper derives a posteriori error estimates for conforming numerical appro...
In this paper, we study an a posteriori error indicator introduced in E. Dari, R.G. Durán, and C. Pa...
In this paper we obtain a priori and a posteriori error estimates for stabilized low-order mixed fin...
This paper deals with a posteriori error estimators for the linear finite element approx-imation of ...
We consider the approximation of eigenvalue problem for the Laplacian by the Crouzeix– Raviart non-c...
Abstract. In this paper we introduce and analyze an a posteriori error estimator for the linear fini...
In this paper,we present an a posteriori error analysis for mixed finite element approximation of co...
AbstractIn this paper, we present an a posteriori error analysis for mixed finite element approximat...
We consider an adaptive finite element method (AFEM) for the Laplace eigenvalue problem in bounded p...
This paper discusses the nonconforming rotated Q1 finite element computable upper bound a posteriori...
This thesis is concerned with the finite element analysis and the a posteriori error estimation for ...
Abstract. Finite element exterior calculus (FEEC) has been developed over the past decade as a frame...
Abstract: We consider the Stokes eigenvalue problem. For the eigenvalues we derive both upper and lo...