孟兆良

个人信息Personal Information

副教授

硕士生导师

性别:男

毕业院校:大连理工大学

学位:博士

所在单位:数学科学学院

学科:计算数学

电子邮箱:mzhl@dlut.edu.cn

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New nonconforming finite elements on arbitrary convex quadrilateral meshes

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论文类型:期刊论文

第一作者:Zhou, Xinchen

通讯作者:Meng, ZL (reprint author), Dalian Univ Technol, Sch Math Sci, Dalian 116024, Peoples R China.

合写作者:Meng, Zhaoliang,Luo, Zhongxuan

发表时间:2016-04-01

发表刊物:JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS

收录刊物:SCIE、EI

卷号:296

页面范围:798-814

ISSN号:0377-0427

关键字:Arbitrary convex quadrilateral; Edge moment constraint; Nonconforming finite element; Degrees of freedom; Optimal error estimate

摘要:In this paper, we construct new nonconforming finite elements on the meshes consisting of arbitrary convex quadrilaterals, especially for the quadratic and cubic cases. For each case, we first define a quadrilateral element that adopts edge moments as the degrees of freedom (DoFs), and then enforce a linear constraint on this element. We have, for the quadratic case, eight degrees of freedom per element and, for the cubic case, eleven DoFs per element, respectively. The dimensions and the bases of different types for the global finite element spaces are provided. We consider the approximations of two-dimensional second order elliptic problems for both of these elements. Error estimates with optimal convergence order in both broken H-1 norm and L-2 norm are given. Moreover, we consider the discretization of the Stokes equations adopting our quadratic element to approximate each component of the velocity, along with piecewise discontinuous P-1 element for the pressure. This mixed scheme is stable and optimal error estimates both for the velocity and the pressure are also achieved. Numerical examples verify our theoretical analysis. (C) 2015 Elsevier B.V. All rights reserved.