Discrete reliability for high-order Crouzeix--Raviart finite elements

Abstract

In this paper, the adaptive numerical solution of a 2D Poisson model problem by Crouzeix-Raviart elements (*CRk *FEM) of arbitrary odd degree k≥1 is investigated. The analysis is based on an established, abstract theoretical framework: the axioms of adaptivity imply optimal convergence rates for the adaptive algorithm induced by a residual-type a posteriori error estimator. Here, we introduce the error estimator for the *CRk *FEM discretization and our main theoretical result is the proof ot Axiom 3: discrete reliability. This generalizes results for adaptive lowest order *CR1 *FEM in the literature. For this analysis, we introduce and analyze new local quasi-interpolation operators for *CRk *FEM which are key for our proof of discrete reliability. We present the results of numerical experiments for the adaptive version of *CRk *FEM for some low and higher (odd) degrees k≥1 which illustrate the optimal convergence rates for all considered values of k.