Weak discrete maximum principle and L∞ analysis of the DG method for the Poisson equation on a polygonal domain

Abstract

We derive several L∞ error estimates for the symmetric interior penalty (SIP) discontinuous Galerkin (DG) method applied to the Poisson equation in a two-dimensional polygonal domain. Both local and global estimates are examined. The weak maximum principle (WMP) for the discrete harmonic function is also established. We prove our L∞ estimates using this WMP and several W2,p and W1,1 estimates for the Poisson equation. Numerical examples to validate our results are also presented.