H1-Stability of the L2-Projection onto Finite Element Spaces on Adaptively Refined Quadrilateral Meshes

Abstract

The L2-orthogonal projection h:L2()→Vh onto a finite element (FE) space Vh is called H1-stable iff \|∇h u\|L2()≤ C\|u\|H1(), for any u∈ H1() with a positive constant C≠ C(h) independent of the mesh size h>0. In this work, we discuss local criteria for the H1-stability of adaptively refined meshes. We show that adaptive refinement strategies for quadrilateral meshes in 2D (Q-RG and Q-RB), introduced originally in Bank et al. 1982 and Kobbelt 1996, are H1-stable for FE spaces of polynomial degree p=2,…,9.