个人信息Personal Information
教授
博士生导师
硕士生导师
任职 : 国家重大专项专家组成员、教育部热防护专业组组长、国际华人计算力学协会理事、中国航空学会理事、中国航空学会强度与设计专业委员会委员、国际边界单元法协会会员、教育部高等学校航空航天类专业教学指导委员会委员
性别:男
毕业院校:Glasgow University
学位:博士
所在单位:力学与航空航天学院
办公地点:海宇楼403A
联系方式:0411-84706332
电子邮箱:xwgao@dlut.edu.cn
A novel element differential method for solid mechanical problems using isoparametric triangular and tetrahedral elements
点击次数:
论文类型:期刊论文
发表时间:2019-12-01
发表刊物:COMPUTERS & MATHEMATICS WITH APPLICATIONS
收录刊物:EI、SCIE
卷号:78
期号:11
页面范围:3563-3585
ISSN号:0898-1221
关键字:Element differential method (EDM); Element collocation method; Triangular and tetrahedral element; Strong formulation; New shape functions
摘要:A novel strong form numerical method, Element Differential Method (EDM), is developed to solve geometrically complex mechanics problems based on triangular or tetrahedral meshes. The discretization of the structure under investigation has been based on Lagrange isoparametric quadrilateral or hexahedral elements while applying EDM. In this paper, a new family of isoparametric triangular and tetrahedral elements with a central node is proposed for EDM. A set of shape functions with analytical expressions for their first and second order partial derivatives is constructed for these triangular and tetrahedral elements, respectively. Moreover, a new element collocation scheme is proposed to establish a system of equations directly from the governing differential equations for internal nodes and traction-equilibrium equations for nodes on edges of an element. In this collocation scheme, no variational principles or virtual energy principles are required to set up the solution scheme, while no integration is needed when forming the coefficients of the system of equations. Numerical examples including standard patch tests and more practical problems are given to demonstrate the correctness of the constructed elements and the efficiency of the proposed element collocation method. (C) 2019 Elsevier Ltd. All rights reserved.