A posteriori error estimation based on the superconvergent Recovery by Compatibility in Patches

In this paper we investigate an approach for a posteriori error estimation based on recovery of an improved stress ÿeld. The qualitative properties of the recovered stress ÿeld necessary to obtain a conservative error estimator, i.e. an upper bound on the true error, are given. A speciÿc procedure f

This is the second in a series of two papers in which the patch recovery technique proposed by Zienkiewicz and Zhu [I-3] is analyzed. In the first paper [4], we have shown that the recovered derivative by the least-squares titting is superconvergent for the two-point boundary value problems. In the

In this paper, we derive recovery type superconvergence analysis and a posteriori error estimates for the finite element approximation of the distributed optimal control governed by Stokes equations. We obtain superconvergence results and asymptotically exact a posteriori error estimates by applying

We consider some (anisotropic and piecewise constant) diffusion problems in domains of R 2 , approximated by a discontinuous Galerkin method with polynomials of any fixed degree. We propose an a posteriori error estimator based on gradient recovery by averaging. It is shown that this estimator gives