A linear analytical boundary element method (BEM) for 2D homogeneous potential problems

This paper reports an implementation of a Boundary Element Method dealing with two-dimensional inhomogeneous potential problems. This method avoids the tedious calculation of the domain integral contributions to the boundary integral equations. This is achieved by applying approximate particular sol

In this paper the efficiency of the boundary element method (BEM) for the solution of potential and wave propagation problems using BEM-subregions is examined. It will be shown, that the commonly used u-q-continuity technique for the coupling of BEM-subregions, does not always improve the accuracy o

Phase change problems are of practical importance and can be found in a wide range of engineering applications. In the present paper, two proposed numerical algorithms are developed; the first one is general for phase change problems, while the second one is for ablation problems. The boundary eleme

Atmtract. This Imper describes & technique fo¢ the solution of non-linem" boundary value problems in one dlmendon baaed on the boundary dement method. The nonlinearity is handled by a quasilinem-ization over subintervals or dements within the main domain. The weighting functlmm used are the solution