A finite element method for the double-layer potential solutions of the Neumann exterior problem

## Abstract The numerical solution of the Neumann problem of the wave equation on unbounded three‐dimensional domains is calculated using the convolution quadrature method for the time discretization and a Galerkin boundary element method for the spatial discretization. The mathematical analysis th

In this article, we present a new numerical method for solving the steady Oseen equations in an unbounded plane domain. The technique consists in coupling the boundary integral and the finite element methods. An artificial smooth boundary is introduced separating an interior inhomogeneons region fro

The combined scheme of jinite elements and finite d@rences, which was dweloped by Yano and already succes.$ully applied to the two-dimensional Laplace equation, is applied to axisymmetric e.wterior$eldproblems, as studied by Wong and Ciric. In order to illustrate the validity of the proposed techniq

A priori error estimates in the H 1 -and L 2 -norms are established for the finite element method applied to the exterior Helmholtz problem, with modified Dirichlet-to-Neumann (MDtN) boundary condition. The error estimates include the effect of truncation of the MDtN boundary condition as well as th