The structure of the boundary element matrix for the three-dimensional Dirichlet problem in elasticity

## Dedicated to G. C. Hsiao on the occasion of his 60th birthday The two-dimensional frictionless contact problem of linear isotropic elasticity in the half-space is treated as a boundary variational inequality involving the Poincare-Steklov operator and discretized by linear boundary elements. Qua

The boundary node method (BNM) is developed in this paper for solving potential problems in three dimensions. The BNM represents a coupling between boundary integral equations (BIE) and moving least-squares (MLS) interpolants. The main idea here is to retain the dimensionality advantage of the forme

In this paper a general boundary element formulation for the three-dimensional elastoplastic analysis of cracked bodies is presented. The non-linear formulation is based on the Dual Boundary Element Method. The continuity requirements of the field variables are fulfilled by a discretization strategy

In this paper, we extend the method of auxiliary mapping (MAM), introduced by BabuÄ ska and Oh, to three dimensions so that the extended MAM (3-D MAM) can e ectively handle three-dimensional elliptic problems containing the singularities caused by the non-smooth domains. There are three type of sing

In this paper we present a study of the performance of sparse iterative solvers regarding the resolution of three-dimensional and non-linear problems encountered in soil/structure interaction. It is composed of two parts. In the "rst one, we present brie#y iterative methods and preconditioners used

An iterative procedure is described for the finite-element solution of scalar scattering problems in unbounded domains. The scattering objects may have multiple connectivity, may be of different materials or with different boundary conditions. A fictitious boundary enclosing all the objects involved