An Adaptive Finite Element Method for Magnetohydrodynamics

This paper presents an adaptive ®nite element method to solve forced convective heat transfer. Solutions are obtained in primitive variables using a high-order ®nite element approximation on unstructured grids. Two general-purpose error estimators are developed to analyse ®nite element solutions and

An rh-method, which combines r-and h-methods, is proposed for cost-eective adaptive FE analysis in twodimensional linear elastic problems. Through various numerical test examples, the rh-method is compared with the h-method. From these examples it is concluded that the rh-method has the advantages o

Nonlinear diffusion methods have proved to be powerful methods in the processing of 2D and 3D images. They allow a denoising and smoothing of image intensities while retaining and enhancing edges. As time evolves in the corresponding process, a scale of successively coarser image details is generate

## Abstract We present a discontinuous finite element method for the Kirchhoff plate model with membrane stresses. The method is based on __P__~2~‐approximations on simplices for the out‐of‐plane deformations, using __C__^0^‐continuous approximations. We derive __a posteriori__ error estimates for

An r -adaptive finite-element method based on moving-mesh partial differential equations (PDEs) and an error indicator is presented. The error indicator is obtained by applying a technique developed by Bank and Weiser to elliptic equations which result in this case from temporal discretization of th