J4 ›› 2011, Vol. 49 ›› Issue (02): 159-163.

• 数学 •    下一篇

Lagrange三次有限体积元法的超收敛现象

丁玉琼1, 左平2   

  1. 1. 吉林大学 数学研究所, 长春 130012|2. 空军航空大学 基础部, 长春 130022
  • 收稿日期:2010-08-31 出版日期:2011-03-26 发布日期:2011-06-14
  • 通讯作者: 丁玉琼 E-mail:qiongkathy@163.com

Superconvergence Phenomenon for Lagrange CubicFinite Volume Element Method

DING Yuqiong1, ZUO Ping2   

  1. 1. Institute of Mathematics, Jilin University, Changchun 130012, China;2. Department of Foundation, Aviation University of Air Force, Changchun 130022, China
  • Received:2010-08-31 Online:2011-03-26 Published:2011-06-14
  • Contact: DING Yuqiong E-mail:qiongkathy@163.com

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摘要:

基于三角形网上求解Poisson方程的Lagrange三次有限体积元法, 给出了超收敛性的数值结果. 数值实验表明, 在三角形单元的对称点(即3边中点和3个角顶点)上, 数值解平均梯度的收敛阶约为4阶, 比按H1模的收敛阶(O(h3))约高一阶.

关键词: 有限体积元法, Lagrange三次元, 对偶剖分, 超收敛

Abstract:

Based on the Lagrangian cubic element finite volume method for Poisson equation on triangular meshes constructed by us, we found that the convergence rate of average gradient of the numerical solutions is approximately 4 order at the symmetrical points of triangular element (i.e.midpoints of three edges and three vertices) through the numerical experiments,  which is nearly one order higher than that of the H1 norm (O(h3)).

Key words: finite volume element method, Lagrange cubic basis, dual partition, superconvergence

中图分类号: 

  • O241.82
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