We present an hp-adaptive continuous Galerkin (hp-CG) method for approximating eigenvalues of elliptic operators, and demonstrate its utility on a collection of benchmark problems having features seen in many important practical applications—for example, high-contrast discontinuous coefficients giving rise to eigenfunctions with reduced regularity. In this continuation of our benchmark study, we concentrate on providing reliability estimates for assessing eigenfunction/invariant subspace error. In particular, we use these estimates to justify the observed robustness of eigenvalue error estimates in the presence of repeated or clustered eigenvalues. We also indicate a means for obtaining efficiency estimates from the available efficiency est...
International audienceThis paper derives a posteriori error estimates for conforming numerical appro...
We present a-posteriori analysis of higher order finite element approximations (hp-FEM) for quadrati...
We present new residual estimates based on Kato’s square root theorem for spectral approximations of...
A discontinuous Galerkin method, with hp-adaptivity based on the approximate solution of appropriate...
In this paper we present a residual-based a posteriori error estimator for hp-adaptive discontinuous...
In this paper we develop the a posteriori error estimation of hp-adaptive discontinuous Galerkin com...
In this paper we present a residual-based {\em a posteriori} error estimator for $hp$-adaptive disco...
We prove the convergence of an adaptive linear finite element method for computing eigenvalues and e...
We design an adaptive procedure for approximating a selected eigenvalue and its eigen-space for a se...
We present reliable a-posteriori error estimates for hp-adaptive finite element approximations of se...
We present reliable TeX-posteriori error estimates for TeX-adaptive finite element approximations of...
We prove an a-posteriori error estimate for an \(hp\)-adaptive discontinuous Galerkin method for the...
We provide an abstract framework for analyzing discretization error for eigenvalue problems discreti...
In this article we consider the a posteriori error estimation and adaptive mesh refinement of discon...
Gegenstand dieser Arbeit ist die numerische Approximation von Eigenwerten elliptischer Differentialo...
International audienceThis paper derives a posteriori error estimates for conforming numerical appro...
We present a-posteriori analysis of higher order finite element approximations (hp-FEM) for quadrati...
We present new residual estimates based on Kato’s square root theorem for spectral approximations of...
A discontinuous Galerkin method, with hp-adaptivity based on the approximate solution of appropriate...
In this paper we present a residual-based a posteriori error estimator for hp-adaptive discontinuous...
In this paper we develop the a posteriori error estimation of hp-adaptive discontinuous Galerkin com...
In this paper we present a residual-based {\em a posteriori} error estimator for $hp$-adaptive disco...
We prove the convergence of an adaptive linear finite element method for computing eigenvalues and e...
We design an adaptive procedure for approximating a selected eigenvalue and its eigen-space for a se...
We present reliable a-posteriori error estimates for hp-adaptive finite element approximations of se...
We present reliable TeX-posteriori error estimates for TeX-adaptive finite element approximations of...
We prove an a-posteriori error estimate for an \(hp\)-adaptive discontinuous Galerkin method for the...
We provide an abstract framework for analyzing discretization error for eigenvalue problems discreti...
In this article we consider the a posteriori error estimation and adaptive mesh refinement of discon...
Gegenstand dieser Arbeit ist die numerische Approximation von Eigenwerten elliptischer Differentialo...
International audienceThis paper derives a posteriori error estimates for conforming numerical appro...
We present a-posteriori analysis of higher order finite element approximations (hp-FEM) for quadrati...
We present new residual estimates based on Kato’s square root theorem for spectral approximations of...