基于显式多项式恢复的后验误差估计(英文) 被引量：3

A Posteriori Error Estimates Based on the Explicit Polynomial Recovery

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摘要设计了一种基于显示多项式恢复(EPR)的后验误差估计,这种恢复是对函数值进行恢复,它的核心思想是在每条边上通过求解只有一个未知量的局部问题来恢复边中点的函数值。首先,给出了EPR方法的显示公式。该文基于EPR的后验误差估计分别与最新顶点加密方法和CVDT加密方法相结合,构造自适应有限元算法求解椭圆方程。数值试验表明基于EPR的后验误差是有效的,特别地对于泊松方程,在CVDT网格上EPR具有超收敛性质.最后,对一维情形,给出了相应的理论分析. This paper develops a posteriori error estimates based on a value recovery procedure called explicit polynomial recovery（EPR）.The key idea of this procedure is to recover the midpoint value by solving a local problem with one variable.First,we provide the explicit formulae for EPR.Then we considered two kinds of mesh adaptivity algorithms,one is the newest vertex bisection and the other is based on Centroidal Voronoi Delaunay Trianguation（CVDT）.Numerical experiments are presented to show that the new estimator is efficient,specifically for the EPR which has superconvergence on the CVDT meshes for the Poisson equations.Finally,some theoretical justifications are provided.

作者黄云清杨伟易年余

机构地区湘潭大学数学与计算科学学院湖南省科学工程计算与数值仿真重点实验室

出处《湘潭大学自然科学学报》 CAS CSCD 北大核心 2011年第3期1-12,共12页 Natural Science Journal of Xiangtan University

基金国家自然科学基金重点项目(11031006) 湖南省自然科学基金重点项目(10JJ7001) 湖南省教育厅重点项目(10A117) 湖南省博士生创新基金项目(S2008yjscx05,CX2011B243)

关键词有限元后验估计恢复自适应算法 finite element a posteriori estimates recovery adaptive algorithms

分类号 O242.21 [理学—计算数学]

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参考文献37

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