Absorbing boundary conditions for the Helmholtz equation using Gauss-Legendre quadrature reduced integrations

Abstract

We introduce a new class of absorbing boundary conditions (ABCs) for the Helmholtz equation. The proposed ABCs are obtained by using L discrete layers and the QN Lagrange finite element in conjunction with the N-point Gauss-Legendre quadrature reduced integration rule in a specific formulation of perfectly matched layers. The proposed ABCs are classified by a tuple (L,N), and achieve reflection error of order O(R2LN) for some R<1. The new ABCs generalise the perfectly matched discrete layers proposed by Guddati and Lim [Int. J. Numer. Meth. Engng 66 (6) (2006) 949-977], including them as type (L,1). An analysis of the proposed ABCs is performed motivated by the work of Ainsworth [J. Comput. Phys. 198 (1) (2004) 106-130]. The new ABCs facilitate numerical implementations of the Helmholtz problem with ABCs if QN finite elements are used in the physical domain as well as give more insight into this field for the further advancement.