Finite elements for exterior problems using integral equations

The problem of elastic-fluid scattering is studied by combined integral equations for the exterior acoustic fluid and finite element methods for the elastic structure. These yield reduced problems over filile dommins. Tho woll-known dilficully with exterion integrnl equation methods at critical freq

## Abstract We consider a coupled finite element (fe)–boundary element (be) approach for three‐dimensional magnetic field problems. The formulation is based on a vector potential in a bounded domain (fe) and a scalar potential in an unbounded domain (be). We describe a coupled variational problem y

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

A ÿnite element constructed on the basis of boundary integral equations is proposed. This element has a exible shape and arbitrary number of nodes. It also has good approximation properties. A procedure of constructing an element sti ness matrix is demonstrated ÿrst for one-dimensional case and then