Convergence analysis of the adaptive finite element method with the red-green refinement

被引:4
作者
Zhao XuYing [3 ,4 ]
Hu Jun [1 ,2 ]
Shi ZhongCi [3 ]
机构
[1] Peking Univ, Key Lab Math & Appl Math, Minist Educ, Beijing 100871, Peoples R China
[2] Peking Univ, Sch Math Sci, Beijing 100871, Peoples R China
[3] Chinese Acad Sci, State Key Lab Sci & Engn Comp, Inst Computat Math & Sci Engn Comp, Acad Math & Syst Sci, Beijing 100190, Peoples R China
[4] Chinese Acad Sci, Grad Univ, Beijing 100190, Peoples R China
来源
SCIENCE CHINA-MATHEMATICS | 2010年 / 53卷 / 02期
关键词
red-green refinement; adaptive finite element method; convergence; non-nested local refinement;
D O I
10.1007/s11425-009-0200-x
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
In this paper, we analyze the convergence of the adaptive conforming P-1 element method with the red-green refinement. Since the mesh after re. ning is not nested into the one before, the Galerkin-orthogonality does not hold for this case. To overcome such a difficulty, we prove some quasi-orthogonality instead under some mild condition on the initial mesh (Condition A). Consequently, we show convergence of the adaptive method by establishing the reduction of some total error. To weaken the condition on the initial mesh, we propose a modified red-green refinement and prove the convergence of the associated adaptive method under a much weaker condition on the initial mesh (Condition B).
引用
收藏
页码:499 / 512
页数:14
相关论文
共 50 条
  • [1] Convergence analysis of the adaptive finite element method with the red-green refinement
    XuYing Zhao
    Jun Hu
    ZhongCi Shi
    Science China Mathematics, 2010, 53 : 499 - 512
  • [2] Convergence analysis of the adaptive finite element method with the red-green refinement
    ZHAO XuYing 1
    2 Key Laboratory of Mathematics and Applied Mathematics (Peking University)
    3 Graduate University of Chinese Academy of Sciences
    Science China(Mathematics), 2010, 53 (02) : 499 - 512
  • [3] Error reduction of the adaptive conforming and nonconforming finite element methods with red-green refinement
    Shi, Zhongci
    Zhao, Xuying
    NUMERISCHE MATHEMATIK, 2013, 123 (03) : 553 - 584
  • [4] RED-GREEN REFINEMENT OF SIMPLICIAL MESHES IN d DIMENSIONS
    Grande, Jorg
    MATHEMATICS OF COMPUTATION, 2019, 88 (316) : 751 - 782
  • [5] CONVERGENCE OF AN ADAPTIVE FINITE ELEMENT METHOD FOR DISTRIBUTED FLUX RECONSTRUCTION
    Xu, Yifeng
    Zou, Jun
    MATHEMATICS OF COMPUTATION, 2015, 84 (296) : 2645 - 2663
  • [6] Convergence analysis of an adaptive continuous interior penalty finite element method for the Helmholtz equation
    Zhou, Zhenhua
    Zhu, Lingxue
    JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 2015, 426 (02) : 1061 - 1079
  • [7] Convergence and optimality of an adaptive modified weak Galerkin finite element method
    Xie, Yingying
    Cao, Shuhao
    Chen, Long
    Zhong, Liuqiang
    NUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS, 2023, 39 (05) : 3847 - 3873
  • [8] Quasi-optimal convergence rate for an adaptive finite element method
    Cascon, J. Manuel
    Kreuzer, Christian
    Nochetto, Ricardo H.
    Siebert, Kunibert G.
    SIAM JOURNAL ON NUMERICAL ANALYSIS, 2008, 46 (05) : 2524 - 2550
  • [9] A GOAL-ORIENTED ADAPTIVE FINITE ELEMENT METHOD WITH CONVERGENCE RATES
    Mommer, Mario S.
    Stevenson, Rob
    SIAM JOURNAL ON NUMERICAL ANALYSIS, 2009, 47 (02) : 861 - 886
  • [10] Convergence analysis of a finite volume method via a new nonconforming finite element method
    Vanselow, R
    Scheffler, HP
    NUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS, 1998, 14 (02) : 213 - 231
12345