A robust WG finite element method for convection–diffusion–reaction equations

摘要

This paper proposes and analyzes a weak Galerkin (WG) finite element method for 2- and 3-dimensional convection–diffusion–reaction problems on conforming or nonconforming polygon/polyhedral meshes. The WG method uses piecewise-polynomial approximations of degrees k(k≥0) for both the scalar function and its trace on the inter-element boundaries. We show that the method is robust in the sense that the derived a priori error estimates is uniform with respect to the coefficients for sufficient smooth true solutions. Numerical experiments confirm the theoretical results.