Babuška-Osborn techniques in discontinuous Galerkin methods: L2-norm error estimates for unstructured meshes

Abstract

We prove the inf-sup stability of the interior penalty class of discontinuous Galerkin schemes in unbalanced mesh-dependent norms, under a mesh condition allowing for a general class of meshes, which includes many examples of geometrically graded element neighbourhoods. The inf-sup condition results in the stability of the interior penalty Ritz projection in L2 as well as, for the first time, quasi-best approximations in the L2-norm which in turn imply a priori error estimates that do not depend on the global maximum meshsize in that norm. Some numerical experiments are also given.