An Extended Galerkin Analysis for Elliptic Problems

Abstract

A general analysis framework is presented in this paper for many different types of finite element methods (including various discontinuous Galerkin methods). For second order elliptic equation, this framework employs 4 different discretization variables, uh, ph, uh and ph, where uh and ph are for approximation of u and p=-α ∇ u inside each element, and uh and ph are for approximation of residual of u and p · n on the boundary of each element. The resulting 4-field discretization is proved to satisfy inf-sup conditions that are uniform with respect to all discretization and penalization parameters. As a result, most existing finite element and discontinuous Galerkin methods can be analyzed using this general framework by making appropriate choices of discretization spaces and penalization parameters.