A new insight into the analysis of plane elasticity with coupling of numerical manifold and boundary element methods
H Dehghanzadeh-Najmabad… - … Analysis with Boundary …, 2021 - Elsevier
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 …
element method (BEM) is presented for solving plane elasticity problems to benefit from the …
Boundary point method for linear elasticity using constant and quadratic moving elements
H Ma, J Zhou, QH Qin - Advances in Engineering Software, 2010 - Elsevier
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 …
Comput Phys 2005; 209: 290–321], the boundary point method (BPM) is a newly developed …
Static and dynamic analysis of plane elasticity using complex Fourier manifold method based on numerical improvement of Gauss–Legendre quadrature techniques
M Kamalodini, S Hamzehei-Javaran… - Engineering Analysis with …, 2022 - Elsevier
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 high order numerical manifold method (HONMM) with triangular mathematical covers …
Numerical manifold method from mathematical theory and its application
LI Shu-chen, LI Shu-cai, Z Jing-wei… - Engineering …, 2007 - engineeringmechanics.cn
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 …
minimum potential energy principle. For many practical problems, it is difficult to find the …
A BEM-based domain meshless method for the analysis of Mindlin plates with general boundary conditions
B Chinnaboon, S Chucheepsakul… - Computer methods in …, 2011 - Elsevier
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 …
moderately thick plates modeled by Mindlin's theory which permits the satisfaction of three …
The MLS based numerical manifold method for bending analysis of thin plates on elastic foundations
S Zhao, H Kong, H Zheng - Engineering Analysis with Boundary Elements, 2023 - Elsevier
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 …
approximation to the Kirchhoff thin plate model can be easily realized using either the …
2D analysis for geometrically non-linear elastic problems using the BEM
I Prieto, AL Ibán, JA Garrido - Engineering analysis with boundary elements, 1999 - Elsevier
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 …
geometrical non-linearities is proposed. The geometrical non-linearities that are considered …
Three-dimensional MLS-based numerical manifold method for static and dynamic analysis
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; …
Manifold Method (NMM) has made great achievements in many fields in recent years; …
[图书][B] Geometrically nonlinear analysis for an elastic body by the boundary element method
FC Shiue - 1989 - search.proquest.com
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 …
element-like interpolation procedure for the analysis of elastic bodies undergoing large …
A meshless method based on the generalized finite difference method for 2D and 3D anisotropic elliptic interface problems
R Mu, L Song, Q Qin - Engineering Analysis with Boundary Elements, 2024 - Elsevier
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 …
proposed for the 2D and 3D anisotropic elliptic interface problem. The method is convenient …