Add to ORKGWe propose an a posteriori error estimator for high-order p- or hp-finite element discretizations of selfadjoint linear elliptic eigenvalue problems that is appropriate for estimating the error in the approximation of an eigenvalue cluster and the corresponding invariant subspace. The estimator is based on the computation of approximate error functions in a space that complements the one in which the approximate eigenvectors were computed. These error functions are used to construct estimates of collective measures of error, such as the Hausdorff distance between the true and approximate clusters of eigenvalues, and the subspace gap between the corresponding true and approximate invariant subspaces. Numerical experiments demonstrate the pra...
We develop a new reduced basis (RB) method for the rapid and reliable approximation of parametrized ...
In this paper we present a residual-based {\em a posteriori} error estimator for $hp$-adaptive disco...
We provide an abstract framework for analyzing discretization error for eigenvalue problems discreti...
We propose an a posteriori error estimator for high-order p- or hp-finite element discretizations o...
This paper deals with a posteriori error estimators for the linear finite element approx-imation of ...
International audienceThis paper presents a posteriori error estimates for conforming numerical appr...
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...
SIGLEAvailable from TIB Hannover: RR 1606(2001,8) / FIZ - Fachinformationszzentrum Karlsruhe / TIB -...
We develop a new reduced basis (RB) method for the rapid and reliable approximation of parametrized ...
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 derive new a posteriori error estimates for the finite element solution of an elliptic eigenvalue...
We present reliable a-posteriori error estimates for hp-adaptive finite element approximations of se...
Abstract. In this paper we introduce and analyze an a posteriori error estimator for the linear fini...
We develop a new reduced basis (RB) method for the rapid and reliable approximation of parametrized ...
In this paper we present a residual-based {\em a posteriori} error estimator for $hp$-adaptive disco...
We provide an abstract framework for analyzing discretization error for eigenvalue problems discreti...
We propose an a posteriori error estimator for high-order p- or hp-finite element discretizations o...
This paper deals with a posteriori error estimators for the linear finite element approx-imation of ...
International audienceThis paper presents a posteriori error estimates for conforming numerical appr...
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...
SIGLEAvailable from TIB Hannover: RR 1606(2001,8) / FIZ - Fachinformationszzentrum Karlsruhe / TIB -...
We develop a new reduced basis (RB) method for the rapid and reliable approximation of parametrized ...
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 derive new a posteriori error estimates for the finite element solution of an elliptic eigenvalue...
We present reliable a-posteriori error estimates for hp-adaptive finite element approximations of se...
Abstract. In this paper we introduce and analyze an a posteriori error estimator for the linear fini...
We develop a new reduced basis (RB) method for the rapid and reliable approximation of parametrized ...
In this paper we present a residual-based {\em a posteriori} error estimator for $hp$-adaptive disco...
We provide an abstract framework for analyzing discretization error for eigenvalue problems discreti...