Conforming and non-conforming virtual element methods for the biharmonic Steklov eigenvalue problem with minimum regularity

Abstract

In this work, we analyze the conforming and C0-non-conforming Virtual Element Method for a fourth-order Steklov eigenvalue problem on a generally shaped, possibly nonconvex, polygonal domain. By employing an enriching operator, we derive the convergence analysis using the discrete H2 seminorm, and the H1 and L2 norms. We use the Babuška--Osborn spectral theory BO to prove that the numerical scheme approximates the spectrum without introducing any spurious eigenvalue. Moreover, we derive the optimal order of convergence for eigenfunctions and double order for eigenvalues. We assess the performance of the method on several numerical tests using different families of polygonal meshes.