In this article we analyze a subdomain residual error estimator for finite element approximations of elliptic problems. It is obtained by solving local problems on patches of elements in weighted spaces and provides an upper bound on the energy norm of the error when the local problems are solved in sufficiently enriched discrete spaces. A guaranteed lower bound on the error is also derived by a simple postprocess of the solutions to the local problems. Numerical tests show very good effectivity indices for both the upper and lower bounds and a strong reliability of this estimator even for coarse meshes
Abstract. We prove local a posteriori error estimates for pointwise gradi-ent errors in finite eleme...
We derive computable error estimates for finite element approximations of linear elliptic partial di...
Abstract. Local energy error estimates for the finite element method for el-liptic problems were ori...
In this article we analyze a subdomain residual error estimator for finite element approximations of...
We consider an adaptive finite element method (AFEM) for obstacle problems associated with linear se...
Abstract. Let u e H be the exact solution of a given selfadjoint elliptic boundary value problem, wh...
A posteriori error estimators are derived for linear finite element approximations to elliptic obsta...
A new residual type estimator based on projections of the error on subspaces of locally-supported fu...
For a nonconforming finite element approximation of an elliptic model problem, we propose a posterio...
We propose an adaptive finite element algorithm to approximate solutions of elliptic problems whose ...
AbstractIn this paper, we study a new approach in a posteriori error estimation, in which the numeri...
linear elliptic problem. Abstract. The error of the finite element solution of linear elliptic probl...
The error of the finite element solution of linear elliptic problems can be estimated a posteriori b...
We establish in this paper sharp error estimates of residual type for finite element approximation t...
One of the main tools in the proof of residual-based a posteriori error estimates is a quasi-interp...
Abstract. We prove local a posteriori error estimates for pointwise gradi-ent errors in finite eleme...
We derive computable error estimates for finite element approximations of linear elliptic partial di...
Abstract. Local energy error estimates for the finite element method for el-liptic problems were ori...
In this article we analyze a subdomain residual error estimator for finite element approximations of...
We consider an adaptive finite element method (AFEM) for obstacle problems associated with linear se...
Abstract. Let u e H be the exact solution of a given selfadjoint elliptic boundary value problem, wh...
A posteriori error estimators are derived for linear finite element approximations to elliptic obsta...
A new residual type estimator based on projections of the error on subspaces of locally-supported fu...
For a nonconforming finite element approximation of an elliptic model problem, we propose a posterio...
We propose an adaptive finite element algorithm to approximate solutions of elliptic problems whose ...
AbstractIn this paper, we study a new approach in a posteriori error estimation, in which the numeri...
linear elliptic problem. Abstract. The error of the finite element solution of linear elliptic probl...
The error of the finite element solution of linear elliptic problems can be estimated a posteriori b...
We establish in this paper sharp error estimates of residual type for finite element approximation t...
One of the main tools in the proof of residual-based a posteriori error estimates is a quasi-interp...
Abstract. We prove local a posteriori error estimates for pointwise gradi-ent errors in finite eleme...
We derive computable error estimates for finite element approximations of linear elliptic partial di...
Abstract. Local energy error estimates for the finite element method for el-liptic problems were ori...