A Mixed Discontinuous Galerkin Method for Linear Elasticity with Strongly Imposed Symmetry

Abstract

In this paper, we study a mixed discontinuous Galerkin (MDG) method to solve linear elasticity problem with arbitrary order discontinuous finite element spaces in d-dimension (d=2,3). This method uses polynomials of degree k+1 for the stress and of degree k for the displacement (k≥ 0). The mixed DG scheme is proved to be well-posed under proper norms. Specifically, we prove that, for any k ≥ 0, the H( div)-like error estimate for the stress and L2 error estimate for the displacement are optimal. We further establish the optimal L2 error estimate for the stress provided that the Pk+2-Pk+1-1 Stokes pair is stable and k ≥ d. We also provide numerical results of MDG showing that the orders of convergence are actually sharp.