A Galerkin boundary contour method for two-dimensional linear elasticity

This paper presents a further development of the boundary contour method. The boundary contour method is extended to cover the traction boundary integral equation. A traction boundary contour method is proposed for linear elastostatics. The formulation of traction boundary contour method is regular

A formulation for computing first-order shape design sensitivities in two-dimensional (2-D) linear elastostatics by the boundary contour method (BCM), along with a numerical implementation using quadratic boundary elements, is presented in this paper. Here, the direct differentiation approach is ana

This paper presents a further development of the Boundary Node Method "BNM# for 1!D linear elasticity[ In this work\ the Boundary Integral Equations "BIE# for linear elasticity have been coupled with Moving Least Square "MLS# interpolants^this procedure exploits the mesh!less attributes of the MLS a

This paper presents new formulations for computing stresses as well as their sensitivities in two-dimensional (2-D) linear elasticity by the Boundary Contour Method (BCM). Contrary to previous work (e.g. Reference 1), the formulations presented here are established directly from the boundary contour