A NUMERICAL STUDY OF UNIFORM SUPERCONVERGENCE OF LDG METHOD FOR SOLVING SINGULARLY PERTURBED PROBLEMS 被引量：11

A NUMERICAL STUDY OF UNIFORM SUPERCONVERGENCE OF LDG METHOD FOR SOLVING SINGULARLY PERTURBED PROBLEMS

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摘要 In this paper, we consider the local discontinuous Galerkin method （LDG） for solving singularly perturbed convection-diffusion problems in one- and two-dimensional settings. The existence and uniqueness of the LDG solutions are verified. Numerical experiments demonstrate that it seems impossible to obtain uniform superconvergence for numerical fluxes under uniform meshes. Thanks to the implementation of two-type different anisotropic meshes, i.e., the Shishkin and an improved grade meshes, the uniform 2p ＋ i-order superconvergence is observed numerically for both one-dimensional and twodimensional cases. In this paper, we consider the local discontinuous Galerkin method （LDG） for solving singularly perturbed convection-diffusion problems in one- and two-dimensional settings. The existence and uniqueness of the LDG solutions are verified. Numerical experiments demonstrate that it seems impossible to obtain uniform superconvergence for numerical fluxes under uniform meshes. Thanks to the implementation of two-type different anisotropic meshes, i.e., the Shishkin and an improved grade meshes, the uniform 2p ＋ i-order superconvergence is observed numerically for both one-dimensional and twodimensional cases.

作者 Ziqing Xie Zuozheng Zhang Zhimin Zhang

机构地区 Key Laboratory of Computational and Stochastic Mathematics and Its Applications

出处《Journal of Computational Mathematics》 SCIE CSCD 2009年第2期280-298,共19页 计算数学（英文）

基金 Supported by the National Natural Science Foundation of China (10571053,10871066) the Programme for New Century Excellent Talents in University (NCET-06-0712).

关键词 Singularly perturbed problems Local discontinuous Galerkin method Numerical fluxes Uniform superconvergence Singularly perturbed problems, Local discontinuous Galerkin method, Numerical fluxes, Uniform superconvergence

分类号 O241.82 [理学—计算数学] P456.7 [理学—数学]

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参考文献4

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共引文献22

1Zuo-zheng Zhang Zi-qing Xie Xia Tao.A Robust Discontinuous Galerkin Method for Solving Convection-diffusion Problems[J].Acta Mathematicae Applicatae Sinica,2008,24(3):483-496. 被引量：4
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同被引文献12

1Ziqing Xie,Zhimin Zhang.SUPERCONVERGENCE OF DG METHOD FOR ONE-DIMENSIONAL SINGULARLY PERTURBED PROBLEMS[J].Journal of Computational Mathematics,2007,25(2):185-200. 被引量：18
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4Zuo-zheng Zhang Zi-qing Xie Xia Tao.A Robust Discontinuous Galerkin Method for Solving Convection-diffusion Problems[J].Acta Mathematicae Applicatae Sinica,2008,24(3):483-496. 被引量：4
5祝鹏,谢资清,周叔子.A COUPLED CONTINUOUS-DISCONTINUOUS FEM APPROACH FOR CONVECTION DIFFUSION EQUATIONS[J].Acta Mathematica Scientia,2011,31(2):601-612. 被引量：6
6张作政.对流扩散方程间断有限元方法的后验误差估计指[J].长沙大学学报,2012,26(2):1-2. 被引量：5
7祝鹏,尹云辉,杨宇博.奇异摄动问题内罚间断有限方法的最优阶一致收敛性分析[J].计算数学,2013,35(3):323-336. 被引量：3
8陶霞,章敏,徐邦启.求解奇异摄动Volterra积分微分方程的LDG-CFEM耦合方法[J].湖南理工学院学报（自然科学版）,2014,27(1):12-15. 被引量：2
9陶霞,万正苏,徐邦启,章敏.有限元方法(FEM)求解奇异摄动Volterra积分微分方程[J].湖南理工学院学报（自然科学版）,2014,27(3):23-25. 被引量：1
10陶霞.用LDG方法求解奇异摄动Volterra积分微分方程[J].数学理论与应用,2015,35(2):18-23. 被引量：2

引证文献11

1祝鹏,谢资清,周叔子.A COUPLED CONTINUOUS-DISCONTINUOUS FEM APPROACH FOR CONVECTION DIFFUSION EQUATIONS[J].Acta Mathematica Scientia,2011,31(2):601-612. 被引量：6
2祝鹏,尹云辉,杨宇博.奇异摄动问题内罚间断有限方法的最优阶一致收敛性分析[J].计算数学,2013,35(3):323-336. 被引量：3
3祝鹏,杨宇博,尹云辉.奇异摄动问题SIPG方法的高阶一致收敛性分析[J].高校应用数学学报（A辑）,2014,29(2):233-244.
4谢胜兰,祝鹏.奇异摄动问题FEM/LDG耦合方法的最优阶一致收敛性分析[J].数值计算与计算机应用,2014,35(3):189-205.
5杨婧.求解二维半线性微分方程多解问题的间断Galerkin有限元方法[J].长沙大学学报,2014,28(5):1-2.
6陶霞.用LDG方法求解奇异摄动Volterra积分微分方程[J].数学理论与应用,2015,35(2):18-23. 被引量：2
7陶霞,王湘红.P型间断有限元方法求解奇异摄动初值问题[J].湖南理工学院学报（自然科学版）,2015,28(3):9-11. 被引量：1
8陶霞,张映辉.Hp型间断有限元方法解奇异摄动Volterra积分微分方程[J].湖南理工学院学报（自然科学版）,2019,32(3):1-3. 被引量：1
9Mahboub Baccouch.Convergence and Superconvergence of the Local Discontinuous Galerkin Method for Semilinear Second‑Order Elliptic Problems on Cartesian Grids[J].Communications on Applied Mathematics and Computation,2022,4(2):437-476.
10SHI Jiamin,LU Zhongshu,ZHANG Luyi,LU Sunjia,CHENG Yao.Uniform Convergence Analysis of the Discontinuous Galerkin Method on Layer-Adapted Meshes for Singularly Perturbed Problem[J].Wuhan University Journal of Natural Sciences,2023,28(5):411-420.

二级引证文献10

1祝鹏,谢胜兰.奇异摄动问题的LDG/FEM耦合解法[J].嘉兴学院学报,2011,23(6):5-11. 被引量：1
2祝鹏,尹云辉,杨宇博.奇异摄动问题内罚间断有限方法的最优阶一致收敛性分析[J].计算数学,2013,35(3):323-336. 被引量：3
3郭时光.可积函数中位值的积分表达式[J].四川理工学院学报（自然科学版）,2014,27(1):88-91.
4祝鹏,杨宇博,尹云辉.奇异摄动问题SIPG方法的高阶一致收敛性分析[J].高校应用数学学报（A辑）,2014,29(2):233-244.
5杨宇博,祝鹏,尹云辉.奇异摄动问题最优阶一致收敛的间断有限元分析[J].数学物理学报（A辑）,2014,34(3):716-726.
6谢胜兰,祝鹏.奇异摄动问题FEM/LDG耦合方法的最优阶一致收敛性分析[J].数值计算与计算机应用,2014,35(3):189-205.
7杨宇博,祝鹏,尹云辉.分层网格上奇异摄动问题的一致NIPG分析[J].计算数学,2014,36(4):437-448. 被引量：4
8陶霞,王湘红.P型间断有限元方法求解奇异摄动初值问题[J].湖南理工学院学报（自然科学版）,2015,28(3):9-11. 被引量：1
9陶霞,张映辉.Hp型间断有限元方法解奇异摄动Volterra积分微分方程[J].湖南理工学院学报（自然科学版）,2019,32(3):1-3. 被引量：1
10王子程,杨焕枫,隆广庆.奇异摄动Volterra积分微分方程的分段Legendre谱配置方法[J].南宁师范大学学报（自然科学版）,2022,39(2):62-67.

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