J4 ›› 2011, Vol. 49 ›› Issue (04): 643-.

• 数学 • 上一篇    下一篇

解一维抛物方程的基于应力佳点的二次有限体积元法

孙佳慧1, 秦丹丹1, 于长华2   

  1. 1. 空军航空大学 基础部, 长春 130022|2. 吉林大学 数学研究所, 长春 130012
  • 收稿日期:2010-09-25 出版日期:2011-07-26 发布日期:2011-08-16
  • 通讯作者: 秦丹丹 E-mail:qdandan66@163.com

Quadratic Finite Volume Element Methods Based on Optimal StressPoints for Solving OneDimensional Parabolic Problems

SUN Jiahui1, QIN Dandan1, YU Changhua2   

  1. 1. Department of Foundation, Aviation University of Air Force, Changchun 130022, China;2. Institute of Mathematics, Jilin University, Changchun 130012, China
  • Received:2010-09-25 Online:2011-07-26 Published:2011-08-16
  • Contact: QIN Dandan E-mail:qdandan66@163.com

PDF (PC)

382

摘要:

构造了求解一维抛物问题的一种新的Lagrange型二次全离散有限体积元法, 取应力佳点作为对偶单元的节点, 试探函数空间取Lagrange型二次有限元空间, 检验函数空间取分片常数函数空间. 证明了新方法具有最优阶的H1模和L2模误差估计, 并讨论了H1模的整体超收敛估计及在应力佳点导数的逐点超收敛估计. 数值实验验证了理论分析结果.

关键词: 抛物方程, 应力佳点, 误差估计, 二次有限体积元法

Abstract:

A new  Lagrangian quadratic finite volume element method based on optimal stress points was presented for solving
onedimensional parabolic problems with trial and test spaces as the Lagrangian quadratic finite element space and the piecewise constant function space respectively. It is proved that the method has optimal order H1 and L2 error estimates. In addition, we discussed the global superconvergence in H1 norm and the locally pointwise superconvergence of numerical derivatives at optimal stress points. The numerical experiment confirms the results of theoretical analysis.

Key words: quadratic finite volume element methods, parabolic equations, optimal stress points, error estimate

中图分类号: 

  • O241.82
版权所有 © 《吉林大学学报(理学版)》编辑部
地址:吉林省长春市前进大街2699号 邮编:130012 电话:+86-431-88499428 E-mail: sejuj@jlu.edu.cn
本系统由北京玛格泰克科技发展有限公司设计开发