An a Posteriori Error Estimator for Two-Body Contact Problems on Non-Matching Meshes

In this paper, we consider the unilateral contact problem between elastic bodies. We propose an error estimator based on the concept of error in the constitutive relation in order to evaluate the ®nite element approximation involving matching and non-matching meshes on the contact zone. The determin

## Abstract A singularly perturbed convection–diffusion problem in two and three space dimensions is discretized using the streamline upwind Petrov Galerkin (SUPG) variant of the finite element method. The dominant convection frequently gives rise to solutions with layers; hence anisotropic finite

We develop and test a 6th-order Richardson extrapolation scheme as an error estimator for reaction± diusion problems. Supporting numerical experiments are presented.

We stud here a finite volume scheme for a diffusion-convection equation on an open bounded set presented along with the geometrical assumptions on the mesh. An error estimate of order h on the discrete L2 norm is obtained, where h denotes the "size" of the mesh. The proof uses an estimate of order h