![Loading...](https://link.springer.com/static/c4a417b97a76cc2980e3c25e2271af3129e08bbe/images/pdf-preview/spacer.gif)
-
Article
Response: Discussion of “a new approach to determine weight functions from bueckner's fundamental field by the superposition technique,” by M.H. Aliabadi and D.P. Rooke
-
Article
On the evaluation of hyper-singular integrals arising in the boundary element method for linear elasticity
The boundary element method (BEM) for linear elasticity in its curent usage is based on the boundary integral equation for displacements. The stress field in the interior of the body is computed by differentiatin...
-
Article
A new approach to determine weight functions from Bueckner's fundamental field by the superposition technique
-
Article
Non-hyper-singular integral-representations for velocity (displacement) gradients in elastic/plastic solids (small or finite deformations)
Integral representations for deformation (velocity) gradients in elastic or elastic-plastic solids undergoing small or large deformations are presented. Compared to the cases wherein direct differentiation of ...
-
Chapter and Conference Paper
Evaluation of K-Factors and Weight Functions for 2-D Mixed-Mode Multiple Cracks by the Boundary Element Alternating Method
The concept of the Schwartz-Neumann alternating method [1,2], in conjunction with the boundary element method to solve for the stresses in an uncracked body, and an analytical solution for an embedded 2-D crack s...
-
Chapter and Conference Paper
Non-Hyper-Singular Integral-Representations for Velocity (Displacement) Gradients in Elastic/Plastic Solids Undergoing Small or Finite Deformations
New integral representations for deformation (velocity) gradients in elastic or elasto-plastic solids undergoing small or large deformations are presented. Compared to the cases wherein direct differentiation ...
-
Chapter and Conference Paper
Some Recent Developments in Finite-Strain Elastoplasticity Using the Field Boundary Element Method
A new boundary integral equation is derived directly for velocity gradients in a finite strain elasto-plastic solid. These integral equations for velocity gradients do not involve hyper-singularities (when the...