In this research, a combination of the numerical manifold method (NMM) and boundary
element method (BEM) is presented for solving plane elasticity problems to benefit from the …

Based on the boundary integral equations and stimulated by the work of Young et al.[J
Comput Phys 2005; 209: 290–321], the boundary point method (BPM) is a newly developed …

Since the explicit weight function and polynomial local approximation functions are used in
the high order numerical manifold method (HONMM) with triangular mathematical covers …

The solving equations of numerical manifold method (NMM) used to be formulated by
minimum potential energy principle. For many practical problems, it is difficult to find the …

In this paper, a BEM-based domain meshless method is developed for the analysis of
moderately thick plates modeled by Mindlin's theory which permits the satisfaction of three …

Compared with the finite element method, H 2-regularity in the Galerkin based
approximation to the Kirchhoff thin plate model can be easily realized using either the …

A boundary element method (BEM) approach for the solution of the elastic problem with
geometrical non-linearities is proposed. The geometrical non-linearities that are considered …

Due to its unique feature for both continuous and discontinuous problems, Numerical
Manifold Method (NMM) has made great achievements in many fields in recent years; …

The subject of this study is that of coupling the boundary element method (BEM) and a finite
element-like interpolation procedure for the analysis of elastic bodies undergoing large …

In this paper, a meshless method based on the generalized finite difference method is
proposed for the 2D and 3D anisotropic elliptic interface problem. The method is convenient …