Boundary Element Methods in Engineering || Uniform Convergence of Boundary Element Solutions Using the Collocation Methods

In this work, we analyze three available domain decomposition methods. We also establish the convergence conditions. The theoretical analysis provides an interval in which a relaxation parameter has to be chosen in order to achieve convergence. Moreover, it allows the selection of the relaxation par

This paper outlines the use of non-conforming (discontinuous) elements in the collocation boundary element method for solving two-dimensional potential and Poisson type problems. The roots of an orthogonal polynomial (shifted Jacobi polynomial) are used as the collocation points. This results in inc

Convergence results for acoustic boundary element formulations have mainly been presented in the mathematical and numerical literature, and the results do not seem to be widely known among acoustic engineers. In this paper, an overview of some of the literature dealing with convergence of boundary e

The presence of singularities in the integral operators of the boundary element methods requires that the density functions must satisfy certain continuity requirements if the displacements and stresses are to be bounded. Quite often the continuity conditions, particularly on the derivatives of the