Nonconforming Virtual Element Method for 2m-th Order Partial Differential Equations in Rn with m>n

Abstract

The Hm-nonconforming virtual elements of any order k on any shape of polytope in Rn with constraints m>n and k≥ m are constructed in a universal way. A generalized Green's identity for Hm inner product with m>n is derived, which is essential to devise the Hm-nonconforming virtual elements. By means of the local Hm projection and a stabilization term using only the boundary degrees of freedom, the Hm-nonconforming virtual element methods are proposed to approximate solutions of the m-harmonic equation. The norm equivalence of the stabilization on the kernel of the local Hm projection is proved by using the bubble function technique, the Poincar\'e inquality and the trace inequality, which implies the well-posedness of the virtual element methods. The optimal error estimates for the Hm-nonconforming virtual element methods are achieved from an estimate of the weak continuity and the error estimate of the canonical interpolation. Finally, the implementation of the nonconforming virtual element method is discussed.