Equidistributed error mesh for problems with exponential boundary layers

The character of convection-dominated, singularly perturbed boundary value problems requires their special numerical treatment in order to guarantee stability and resolve existing layers with acceptable accuracy. In addition to discretization methods particularly developed for this aim, recently mor

The continuous interior penalty (CIP) method for elliptic convection-diffusion problems with characteristic layers on a Shishkin mesh is analysed. The method penalises jumps of the normal derivative across interior edges. We show that it is of the same order of convergence as the streamline diffusio

element edges (cf., for example, [4]), or a tensor product of the one dimensional approximations along element edges In this paper we develop an exponentially fitted finite element method for a singularly perturbed advection-diffusion problem with parallel to coordinate axes (cf., for example, [6])

The main characteristic of Hermite elements is that they include both the nodal values and their tangential derivatives in the functional representation of the field variables. In the present work, this feature is exploited to obtain an inexpensive and reliable error indicator, based on the tangenti