a posteriori Error estimation for triangular and tetrahedral quadratic elements using interior residuals

## Abstract __A posteriori__ error estimates have had a major impact on adaptive error control for the finite element method. In this paper, we review a relatively new approach to __a posteriori__ error estimation based on residuals and a variational analysis. This approach is distinguished by a di

We present a posteriori error estimators and adaptive methods for the ÿnite element approximation of nonlinear problems and especially elastoplasticity. The main characteristic of the proposed method is the introduction of duality techniques or in other notions the reciprocal theorem. For error esti

Methods for a posteriori error estimation for finite element solutions are well established and widely used in engineering practice for linear boundary value problems. In contrast here we are concerned with finite elasticity and error estimation and adaptivity in this context. In the paper a brief o