张洪武

个人信息Personal Information

教授

博士生导师

硕士生导师

性别:男

毕业院校:德国汉诺威大学

学位:博士

所在单位:力学与航空航天学院

学科:工程力学. 计算力学. 生物与纳米力学

电子邮箱:zhanghw@dlut.edu.cn

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Quadratically consistent one-point (QC1) integration for three-dimensional element-free Galerkin method

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论文类型:期刊论文

发表时间:2016-07-01

发表刊物:FINITE ELEMENTS IN ANALYSIS AND DESIGN

收录刊物:SCIE、EI

卷号:114

页面范围:22-38

ISSN号:0168-874X

关键字:Meshfree/meshless; Element-free Galerkin (EFG); One-point integration; Three-dimensional; Hu-Washizu; Consistency

摘要:A stable and efficient integration scheme which evaluates the Galerkin weak form only at the centers of background tetrahedral elements (cells) for three-dimensional element-free Galerkin method with quadratic approximation is proposed. The derivation of the method is based on the Hu-Washizu three field variational principle and the orthogonality condition between stress and strain difference is satisfied by correcting the nodal derivatives at quadrature points with Taylor series expansion technique. The consistency of such corrected derivatives is theoretically proved. Numerical experiments validate that the proposed method can exactly pass linear and quadratic patch tests. Therefore, it is named as quadratically consistent one-point (QC1) integration. The superiority of the proposed QC1 than other integration schemes for three-dimensional element-free Galerkin methods in accuracy, convergence, efficiency and stability is sufficiently demonstrated by several 3D examples. (C) 2016 Elsevier B.V. All rights reserved.