SUPERCONVERGENCE OF A DISCONTINUOUS GALERKIN METHOD FOR FIRST-ORDER LINEAR DELAY DIFFERENTIAL EQUATIONS 被引量：4

SUPERCONVERGENCE OF A DISCONTINUOUS GALERKIN METHOD FOR FIRST-ORDER LINEAR DELAY DIFFERENTIAL EQUATIONS

导出

摘要 This paper deals with the discontinuous Galerkin （DG） methods for delay differential equations. By an orthogonal analysis in each element, the superconvergence results of the methods are derived at nodal points and eigenpoints. Numerical experiments will be carried our to verify the effectiveness and the theoretical results of the proposed methods. This paper deals with the discontinuous Galerkin （DG） methods for delay differential equations. By an orthogonal analysis in each element, the superconvergence results of the methods are derived at nodal points and eigenpoints. Numerical experiments will be carried our to verify the effectiveness and the theoretical results of the proposed methods.

作者 Dongfang Li Chengjian Zhang

机构地区 School of Mathematics and Statistics

出处《Journal of Computational Mathematics》 SCIE CSCD 2011年第5期574-588,共15页 计算数学（英文）

基金 Acknowledgments. The authors are grateful to the referees for carefully reading the preliminary version of the manuscript. Their valuable suggestions largely improve the quality of this paper. The research is supported by the National Nature Science Foundation of China （No.10871078）, 863 Program of China （No. 2009AA044501） and Postgraduate Innovation Fund of Huazhong University of Science and Technology （No. HF-08-02-2011-011）.

关键词 Discontinuous Galerkin methods Delay differential equations Orthogonalanalysis Superconvergence. Discontinuous Galerkin methods, Delay differential equations, Orthogonalanalysis, Superconvergence.

分类号 O241.82 [理学—计算数学] O175.1 [理学—基础数学]

引文网络
相关文献

参考文献3

1姜子文.中立型时间延滞抛物方程初边值问题的有限元方法[J].高等学校计算数学学报,2000,22(4):305-310. 被引量：1
2Chuanmiao Chen,Qiong Tang,Shufang Hu.FINITE ELEMENT METHOD WITH SUPERCONVERGENCE FOR NONLINEAR HAMILTONIAN SYSTEMS[J].Journal of Computational Mathematics,2011,29(2):167-184. 被引量：4
3张诚坚,周叔子.The asymptotic stability of theoretical and numerical solutions for systems of neutral multidelay-differential equations[J].Science China Mathematics,1998,41(11):1151-1157. 被引量：16

二级参考文献21

1傅希林,俞元洪.中立型抛物微分方程边值问题解的振动性[J].工程数学学报,1994,11(3):101-107. 被引量：1
2王耀东，偏微分方程的L2理论，1989年
3陈传淼，有限元高精度理论，1995年
4J. X. Kuang,J. X. Xiang,H. J. Tian.The asymptotic stability of one-parameter methods for neutral differential equations[J]. BIT . 1994 (3)
5T. Koto.A stability property ofA-stable natural Runge-Kutta methods for systems of delay differential equations[J]. BIT . 1994 (2)
6BickartTA.P stableandP[α ,β] stableintegration/interpolationmethodsinthesolutionofretardeddifferential differenceequations. Borsa Internazionale del Turismo . 1982
7LiuMZ,SpijkerMN.TheStabilityofthe:θ-MethodsintheNumericalSolutionofDelayDifferentialEquations.IMANumer. Anales . 1990
8BellenA,JackiewiczZ,ZennaroM.Stabilityanalysisofone stepmethodsforneutraldelay differentialequations. Numerical Mathematics . 1988
9Li,S .F.B ConvergencepropertiesofmultistepRungeKuttamethods,Math. Computer . 1994
10Lancaster P,Tismenetsky M.The theory of matrices. . 1985

共引文献18

1黄枝姣.单支方法关于多延迟Pantograph方程的稳定性分析[J].应用数学,2001,14(S1):217-220.
2CONG,Yu-hao(丛玉豪).NGP_G-STABILITY OF LINEAR MULTISTEP METHODS FOR SYSTEMS OF GENERALIZED NEUTRAL DELAY DIFFERENTIAL EQUATIONS[J].Applied Mathematics and Mechanics(English Edition),2001,22(7):827-835. 被引量：1
3余越昕,李寿佛.非线性中立型延迟微分方程Runge-Kutta方法的稳定性[J].系统仿真学报,2005,17(1):49-52. 被引量：6
4Si-qingGan,Wei-minZheng.STABILITY OF GENERAL LINEAR METHODS FOR SYSTEMS OF FUNCTIONAL-DIFFERENTIAL AND FUNCTIONAL EQUATIONS[J].Journal of Computational Mathematics,2005,23(1):37-48.
5余越昕,文立平.非线性中立型延迟微分方程单支θ-方法的稳定性[J].湘潭大学自然科学学报,2005,27(4):1-4. 被引量：1
6余越昕,文立平,李寿佛.非线性中立型延迟微分方程线性Θ—方法的渐近稳定性[J].高等学校计算数学学报,2006,28(2):103-110. 被引量：4
7余越昕,李寿佛.非线性中立型延迟微分方程单支方法的数值稳定性[J].计算数学,2006,28(4):357-364. 被引量：8
8李超群.中立型延迟微分方程一般线性方法的非线性稳定性[J].应用数学学报,2008,31(2):249-256.
9张诚坚,廖晓昕.ASYMPTOTIC BEHAVIOR OF MULTISTEP RUNGE-KUTTA METHODS FOR SYSTEMS OF DELAY DIFFERENTIAL EQUATIONS[J].Acta Mathematicae Applicatae Sinica,2001,17(2):240-246. 被引量：1
10李灿华,陈传淼.平均间断有限元的强超收敛性及在Hamilton系统的应用[J].应用数学和力学,2011,32(7):883-894. 被引量：1

同被引文献6

1Zhi-min Zhang,Ahmed Naga.NATURAL SUPERCONVERGENT POINTS OF EQUILATERAL TRIANGULAR FINITE ELEMENTS - A NUMERICAL EXAMPLE[J].Journal of Computational Mathematics,2006,24(1):19-24. 被引量：3
2Xiaonan Wu,Jiwei Zhang.HIGH-ORDER LOCAL ABSORBING BOUNDARY CONDITIONS FOR HEAT EQUATION IN UNBOUNDED DOMAINS[J].Journal of Computational Mathematics,2011,29(1):74-90. 被引量：1
3祁锐,何汉林.一类求解比例延迟积分微分方程线性多步法的散逸性[J].计算机与数字工程,2012,40(7):1-2. 被引量：1
4潘青,陈传淼.常微分方程初值问题的连续有限元法[J].湖南师范大学自然科学学报,2001,24(2):4-6. 被引量：8
5许秀秀,黄秋梅.比例延迟微分方程的连续有限元法[J].数学的实践与认识,2014,44(24):280-288. 被引量：1
6杨禄源,汤琼.常微分方程初值问题连续有限元的超收敛性[J].高等学校计算数学学报,2004,26(1):91-96. 被引量：4

引证文献4

1许秀秀,黄秋梅.比例延迟微分方程的连续有限元法[J].数学的实践与认识,2014,44(24):280-288. 被引量：1
2Xiuxiu Xu,Qiumei Huang,Hongtao Chen.LOCAL SUPERCONVERGENCE OF CONTINUOUS GALERKIN SOLUTIONS FOR DELAY DIFFERENTIAL EQUATIONS OF PANTOGRAPH TYPE[J].Journal of Computational Mathematics,2016,34(2):186-199. 被引量：3
3许秀秀,黄秋梅.拟等级网格下非线性延迟微分方程间断有限元法[J].计算数学,2016,38(3):281-288.
4Qiumei Huang,Dongfang Li,Jiwei Zhang.Numerical Investigations of a Class of Biological Models on Unbounded Domain[J].Numerical Mathematics(Theory,Methods and Applications),2019,12(1):169-186. 被引量：1

二级引证文献5

1Xiuxiu Xu,Qiumei Huang,Hongtao Chen.LOCAL SUPERCONVERGENCE OF CONTINUOUS GALERKIN SOLUTIONS FOR DELAY DIFFERENTIAL EQUATIONS OF PANTOGRAPH TYPE[J].Journal of Computational Mathematics,2016,34(2):186-199. 被引量：3
2王征,胡长流.利用Laplace变换的分布阶微分方程数值解法[J].湘潭大学自然科学学报,2018,40(1):15-18. 被引量：2
3石业娇.面向Fredholm微分方程的广义拉盖尔多项式求解方法[J].湘潭大学自然科学学报,2018,40(1):31-35. 被引量：1
4程建玲,闫用杰.利用分数样条模型求解分数阶线性微分方程组[J].湘潭大学自然科学学报,2018,40(1):36-39. 被引量：3
5Chaeyoung Lee,Hyundong Kim,Sungha Yoon,Jintae Park,Sangkwon Kim,Junxiang Yang,Junseok Kim.On the Evolutionary Dynamics of the Cahn-Hilliard Equation with Cut-Off Mass Source[J].Numerical Mathematics(Theory,Methods and Applications),2021,14(1):242-260.

1武冬.线性时滞微分方程解的振动准则[J].青岛海洋大学学报（自然科学版）,2002,32(6):1023-1029. 被引量：1
2龙晓瀚.线性时滞微分方程的正解[J].昌潍师专学报,1999,18(2):25-27.
3侯成敏,何延生,南华.具变号系数的二阶线性时滞微分方程的振动性[J].延边大学学报（自然科学版）,2001,27(2):93-96.
4肖淑贤.线性时滞微分方程解的渐近性态[J].应用数学,2003,16(1):121-125. 被引量：4
5高金泰,扶蔚鹏.中立型线性时滞微分方程的渐近稳定性[J].长沙水电师院学报（自然科学版）,2000,15(2):12-14.
6冯春华.一类时滞方程概周期解的存在唯一性[J].广西科学,2002,9(2):91-92.
7Qingguo Hong,Jun Hu,Shi Shu,Jinchao Xu.A DISCONTINUOUS GALERKIN METHOD FOR THE FOURTH-ORDER CURL PROBLEM[J].Journal of Computational Mathematics,2012,30(6):565-578. 被引量：3
8刘小靖,周又和,周俊.一种求解时滞微分方程的小波方法[J].兰州大学学报（自然科学版）,2011,47(1):87-90. 被引量：1
9Huiqiang YUE,Tiegang LIU,V.SHAYDUROV.Continuous adjoint-based error estimation and its application to adaptive discontinuous Galerkin method[J].Applied Mathematics and Mechanics(English Edition),2016,37(11):1419-1430.
10林群,周爱辉.CONVERGENCE OF THE DISCONTINUOUS GALERKIN METHOD FOR A SCALAR HYPERBOLIC EQUATION[J].Acta Mathematica Scientia,1993,13(2):207-210. 被引量：1

Journal of Computational Mathematics

2011年第5期

浏览历史

内容加载中请稍等...