Boundary elements for half-space problems via fundamental solutions: A three-dimensional analysis

The finite element (FE) solutions of a general elliptic equation -div([a ij ] • ∇u) + u = f in an exterior domain , which is the complement of a bounded subset of R 3 , is considered. The most common approach to deal with exterior domain problems is truncating an unbounded subdomain ∞ , so that the

## Abstract A fundamental‐solution‐less boundary element method, the scaled boundary finite‐element method, has been developed recently for exterior wave problems. In this method, only the boundary is discretized yielding a reduction of the spatial dimension by one, but no fundamental solution is n

## Abstract In this work a fast solver for large‐scale three‐dimensional elastodynamic crack problems is presented, implemented, and tested. The dual boundary element method in the Laplace transform domain is used for the accurate dynamic analysis of cracked bodies. The fast solution procedure is b

In this paper, the boundary element method (BEM) is used to model acoustic radiation and scattering from bodies of arbitrary shape in close proximity of an infinite plane that has a general impedance boundary condition. A new half-space Green's function for positive reactance boundary conditions is

The emergence of non-linear dynamics in cavity mixing is examined using the boundary element method (BEM). The method is implemented for the simulation of three-dimensional transient creeping flow of Newtonian or linear viscoelastic fluids of the Jeffreys type. A boundary only formulation in the tim