Weak discrete maximum principle of finite element methods in convex polyhedra

Abstract

We prove that the Galerkin finite element solution uh of the Laplace equation in a convex polyhedron , with a quasi-uniform tetrahedral partition of the domain and with finite elements of polynomial degree r 1, satisfies the following weak maximum principle: align* \|uh\|L∞() C\|uh\|L∞(∂ ) , align* with a constant C independent of the mesh size h. By using this result, we show that the Ritz projection operator Rh is stable in L∞ norm uniformly in h for r≥ 2, i.e. align* \|Rhu\|L∞() C\|u\|L∞() . align* Thus we remove a logarithmic factor appearing in the previous results for convex polyhedral domains.