Results 141 to 150 of about 18,760 (165)
Some of the next articles are maybe not open access.
Analyzing 2D temperature field problems in the improved element-free Galerkin method
2011 International Conference on Multimedia Technology, 2011This paper presents an improved moving least-square (IMLS) approximation in which the orthogonal function system with a weight function is used as the basis function. The IMLS approximation has a greater computational efficiency and precision than the existing MLS, and does not lead to an ill-conditioned system of equations.
null Yufeng Zhao +3 more
openaire +1 more source
An improved interpolating dimension splitting element-free Galerkin method for 3D wave equations
Engineering Analysis with Boundary Elements, 2022zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Meng, Zhijuan, Chi, Xiaofei
openaire +1 more source
Analysis of thermo-elastic problems using the improved element-free Galerkin method
Computational and Applied Mathematics, 2016zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Debbabi, Imen, BelhadjSalah, Hédi
openaire +1 more source
Analyzing three-dimensional potential problems with the improved element-free Galerkin method
Computational Mechanics, 2009zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Zhang, Zan, Zhao, Peng, Liew, K. M.
openaire +2 more sources
Analysis of the generalized Camassa and Holm equation with the improved element-free Galerkin method
Chinese Physics B, 2013In this paper, we analyze the generalized Camassa and Holm (CH) equation by the improved element-free Galerkin (IEFG) method. By employing the improved moving least-square (IMLS) approximation, we derive the formulas for the generalized CH equation with the IEFG method.
Rong-Jun Cheng, Qi Wei
openaire +1 more source
Improved integration scheme for the second-order consistent element-free Galerkin method
Engineering Analysis with Boundary Elements, 2019zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Wang, Bingbing +2 more
openaire +2 more sources
An improved stabilized element-free Galerkin method for solving steady Stokes flow problems
Applied Mathematics and ComputationzbMATH Open Web Interface contents unavailable due to conflicting licenses.
Feng-Xin Sun, Jufeng Wang, Ying Xu
openaire +2 more sources
Chinese Physics B, 2015
In this paper, based on the conjugate of the complex basis function, a new complex variable moving least-squares approximation is discussed. Then using the new approximation to obtain the shape function, an improved complex variable element-free Galerkin (ICVEFG) method is presented for two-dimensional (2D) elastoplasticity problems.
Yu-Min Cheng +3 more
openaire +1 more source
In this paper, based on the conjugate of the complex basis function, a new complex variable moving least-squares approximation is discussed. Then using the new approximation to obtain the shape function, an improved complex variable element-free Galerkin (ICVEFG) method is presented for two-dimensional (2D) elastoplasticity problems.
Yu-Min Cheng +3 more
openaire +1 more source
Engineering Analysis with Boundary Elements, 2020
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Yajie Deng +4 more
openaire +1 more source
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Yajie Deng +4 more
openaire +1 more source
Chinese Physics B, 2017
We first give a stabilized improved moving least squares (IMLS) approximation, which has better computational stability and precision than the IMLS approximation. Then, analysis of the improved element-free Galerkin method is provided theoretically for both linear and nonlinear elliptic boundary value problems.
Yao-Zong Tang, Xiao-Lin Li
openaire +1 more source
We first give a stabilized improved moving least squares (IMLS) approximation, which has better computational stability and precision than the IMLS approximation. Then, analysis of the improved element-free Galerkin method is provided theoretically for both linear and nonlinear elliptic boundary value problems.
Yao-Zong Tang, Xiao-Lin Li
openaire +1 more source