Adaptive VEM: Stabilization-Free A Posteriori Error Analysis and Contraction Property

TL;DR

This paper develops a mathematically rigorous a posteriori error analysis for Adaptive Virtual Element Methods (AVEMs) on 2D triangular meshes with hanging nodes, removing the stabilization term's influence and proving contraction properties.

Contribution

It introduces stabilization-free a posteriori error bounds for AVEMs and establishes a contraction property, advancing the theoretical understanding of VEMs.

Findings

Stabilization term can be made arbitrarily small with large enough stabilization parameter.

Stabilization-free upper and lower bounds for the energy error are derived.

Contraction property between consecutive AVEM iterations is proven for piecewise constant data.

Abstract

In the present paper we initiate the challenging task of building a mathematically sound theory for Adaptive Virtual Element Methods (AVEMs). Among the realm of polygonal meshes, we restrict our analysis to triangular meshes with hanging nodes in 2d -- the simplest meshes with a systematic refinement procedure that preserves shape regularity and optimal complexity. A major challenge in the a posteriori error analysis of AVEMs is the presence of the stabilization term, which is of the same order as the residual-type error estimator but prevents the equivalence of the latter with the energy error. Under the assumption that any chain of recursively created hanging nodes has uniformly bounded length, we show that the stabilization term can be made arbitrarily small relative to the error estimator provided the stabilization parameter of the scheme is sufficiently large. This quantitative estimate leads to stabilization-free upper and lower a posteriori bounds for the energy error. This novel and crucial property of VEMs hinges on the largest subspace of continuous piecewise linear functions and the delicate interplay between its coarser scales and the finer ones of the VEM space. An important consequence for piecewise constant data is a contraction property between consecutive loops of AVEMs, which we also prove. Our results apply to $H^1$-conforming (lowest order) VEMs of any kind, including the classical and enhanced VEMs.