A high accuracy nonconforming finite element scheme for Helmholtz transmission eigenvalue problem

Abstract

In this paper, we consider a cubic H2 nonconforming finite element scheme Bh03 which does not correspond to a locally defined finite element with Ciarlet's triple but admit a set of local basis functions. For the first time, we deduce and write out the expression of basis functions explicitly. Distinguished from the most nonconforming finite element methods, (δh·,h·) with non-constant coefficient δ>0 is coercive on the nonconforming Bh03 space which makes it robust for numerical discretization. For fourth order eigenvalue problem, the Bh03 scheme can provide O(h2) approximation for the eigenspace in energy norm and O(h4) approximation for the eigenvalues. We test the Bh03 scheme on the vary-coefficient bi-Laplace source and eigenvalue problem, further, transmission eigenvalue problem. Finally, numerical examples are presented to demonstrate the effectiveness of the proposed scheme.