Analytical removal of singularities and one-dimensional integration of three-dimensional boundary element method kernels

In the paper, an ~vestigation into the stress intensity factors of mixed-mode three dimensional crack problem is studied. In the method presented in the paper, the number of elements and nodes can be decreased greatly while computational accuracy and efficiency increase, the continuous functions of

In the paper, a new kind of stress singular element is introduced for crack problems. This kind of element is more simple and widely used than those presented before. In the paper, a cube with embedded circular crack and a first kind Benchmark problem are studied. The study shows that using quarter-

The purpose of this paper is to point out that in most practical situations, the Neumann kernel of two-dimensional potential theory is an analytic function of its arguments. Consequently, standard quadrature methods may normally be used for all element integrals in boundary element collocation metho

An advanced implementation of the direct boundary element method applicable to transient problems involving threedimensional solids of arbitrary shape and connectivity is presented. The work first focuses on the formulation of the method, followed by a discussion of the fundamental singular solution