Numerical integration schemes for the BEM solution of hypersingular integral equations

In this paper a procedure to solve the identiÿcation inverse problems for two-dimensional potential ÿelds is presented. The procedure relies on a boundary integral equation (BIE) for the variations of the potential, ux, and geometry. This equation is a linearization of the regular BIE for small chan

We consider hypersingular integral formulation of some elasticity and potential boundary value problems on 2-D domains. In particular, we consider all integrals whose evaluation is required when the equations are solved by a Galerkin BEM based on piecewise polynomial approximants of arbitrary local

A numerical method is presented that solves the multicenter Kohn᎐Sham equations. The method couples the resolution of the integral form of the equation at a given energy with an iterative search for the eigenvalues. The validity of the method is checked by comparing some test calculations for diatom

The general framework of the paper deals with the finite element modelling of mechanical problems involving viscous materials such as bitumen or bituminous concrete. Its aim is to present a second-orderaccurate discrete scheme which remains unconditionally superstable when used for the time discreti

This study presents an extension of the piecewise quadratic polynomial technique to solve singular integral equations with logarithmic-and Hadamard-type singularities. For completeness and continuity, the evaluation of the weights for logarithmic-, Cauchy-and Hadamard-type singularities are given ex

This work presents a multi-domain decomposition integral equation method for the numerical solution of domain dominant problems, for which it is known that the standard Boundary Element Method (BEM) is in disadvantage in comparison with classical domain schemes, such as Finite Di erence (FDM) and Fi