Mapped infinite elements for exterior wave problems

This paper describes a family of axisymmetric, spheroidal 'wave envelope' elements for modelling exterior wave problems. They are of variable radial order and can be used to represent steady and transient wave fields. The formulation is presented for the axisymmetric case using elements which are ba

Variable order mapped in"nite wave envelope elements are developed for "nite-element modelling (FEM) of acoustic radiation in a uniformly moving medium. These elements can be used as a non-re#ecting boundary condition for computations on an in"nite domain in which a radiating body is immersed in a m

A finite element scheme is devised for the solution of nonlinear time-dependent exterior wave problems. The two-dimensional nonlinear scalar (Klein-Gordon) wave equation is taken as a model to illustrate the method. The governing equation is first discretized in time, leading to a time-stepping sche

Two drawbacks exist with the infinite elements used for simulating the unbounded domains of semi-infinite problems. The first is the lack of an adequate measure for calculating the decay parameter. The second is the frequency-dependent characteristic of the finite/infinite element mesh used for deri