A robust DPG method for singularly perturbed reaction-diffusion problems

Abstract

We present and analyze a discontinuous Petrov-Galerkin method with optimal test functions for a reaction-dominated diffusion problem in two and three space dimensions. We start with an ultra-weak formulation that comprises parameters α, β to allow for general -dependent weightings of three field variables ( being the small diffusion parameter). Specific values of α and β imply robustness of the method, that is, a quasi-optimal error estimate with a constant that is independent of . Moreover, these values lead to a norm for the field variables that is known to be balanced in for model problems with typical boundary layers. Several numerical examples underline our theoretical estimates and reveal stability of approximations even for very small .