A ROBUST FINITE ELEMENT METHOD FOR A 3-D ELLIPTIC SINGULAR PERTURBATION PROBLEM 被引量：4

A ROBUST FINITE ELEMENT METHOD FOR A 3-D ELLIPTIC SINGULAR PERTURBATION PROBLEM

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摘要 This paper proposes a robust finite element method for a three-dimensional fourth-order elliptic singular perturbation problem. The method uses the three-dimensional Morley element and replaces the finite element functions in the part of bilinear form corresponding to the second-order differential operator by a suitable approximation. To give such an approximation, a convergent nonconforming element for the second-order problem is constructed. It is shown that the method converges uniformly in the perturbation parameter. This paper proposes a robust finite element method for a three-dimensional fourth-order elliptic singular perturbation problem. The method uses the three-dimensional Morley element and replaces the finite element functions in the part of bilinear form corresponding to the second-order differential operator by a suitable approximation. To give such an approximation, a convergent nonconforming element for the second-order problem is constructed. It is shown that the method converges uniformly in the perturbation parameter.

作者 Ming Wang Xiangrui Meng

机构地区 LMAM

出处《Journal of Computational Mathematics》 SCIE CSCD 2007年第6期631-644,共14页 计算数学（英文）

基金 Acknowledgments. This work was supported by the National Natural Science Foundation of China （Project No. 10571006）.

关键词 Finite element Singular perturbation problem. Finite element, Singular perturbation problem.

分类号 O17 [理学—基础数学]

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参考文献2

1Ming Wang,Jin-chao Xu,Yu-cheng Hu.MODIFIED MORLEY ELEMENT METHOD FOR A FOURTH ORDER ELLIPTIC SINGULAR PERTURBATION PROBLEM[J].Journal of Computational Mathematics,2006,24(2):113-120. 被引量：9
2Shao-chunChen Yong-chengZhao Dong-yangShi.NON C^0 NONCONFORMING ELEMENTS FOR ELLIPTIC FOURTH ORDER SINGULAR PERTURBATION PROBLEM[J].Journal of Computational Mathematics,2005,23(2):185-198. 被引量：5

二级参考文献9

1陈绍春,石东洋.具有几何对称性的12参数矩形板元[J].高等学校计算数学学报,1996,18(3):233-238. 被引量：8
2Ciarlet P.G. The Finite Element Method for Elliptic Problems, North-Holland, Amsterdam, New York, 1978.
3Lascaux P. and Lesaint P. Some nonconforming finite elements for the plate bending problem,RAIRO Anal. Numer,R-1 (1985), 9-53.
4Morley L.S.D. The triangular equilibrium element in the solution of plate bending problems, Aero.Quart, 19 (1968), 149-169.
5Nilssen T.K. Tai X-C and Winther R., A robust nonconforming H^2-element, Math. Comp., 70(2001), 489-505.
6Strang G. and Fix G.J. An Analysis of the Finite Element Method, Prentice-Hall, Englewood Cliffs, 1973.
7Wang Ming, On the necessity and sufficiency of the patch test for convergence of nonconforming finite elements, SIAM J. Numer. Anal, 39 2 (2002), 363-384.
8Zhang Hongqing and Wang Ming, The Mathematical Theory of Finite Elements, Science Press,Beijing, 1991.
9石钟慈.关于Morley元的误差估计[J].计算数学,1990,12(2):113-118. 被引量：44

共引文献9

1Shuo Zhang Ming Wang.A POSTERIORI ESTIMATOR OF NONCONFORMING FINITE ELEMENT METHOD FOR FOURTH ORDER ELLIPTIC PERTURBATION PROBLEMS[J].Journal of Computational Mathematics,2008,26(4):554-577. 被引量：1
2Hongru Chen,Shaochun Chen.UNIFORMLY CONVERGENT NONCONFORMING ELEMENT FOR 3-D FOURTH ORDER ELLIPTIC SINGULAR PERTURBATION PROBLEM[J].Journal of Computational Mathematics,2014,32(6):687-695. 被引量：1
3MENG XiangYun,YANG XueQin,ZHANG Shuo.Convergence analysis of the rectangular Morley element scheme for second order problem in arbitrary dimensions[J].Science China Mathematics,2016,59(11):2245-2264.
4汤凯,黄学海,王文庆.二阶椭圆问题基于Morley元离散的内点惩罚间断有限元方法[J].温州大学学报（自然科学版）,2017,38(4):7-12.
5王文庆,汤凯.二阶椭圆问题的修正Morley元方法[J].温州大学学报（自然科学版）,2018,39(1):5-9.
6王琳,罗鲲,张世全.四阶奇异摄动问题的弱Galerkin有限元法[J].四川大学学报（自然科学版）,2018,55(6):1141-1147. 被引量：1
7周瑞月,黄学海,王文庆.二阶椭圆问题基于Morley-Wang-Xu元离散的超惩罚法[J].温州大学学报（自然科学版）,2017,38(3):23-29.
8石东洋,王俊俊.非线性发展方程的无网格比高精度有限元方法[J].数学杂志,2019,39(1):1-19. 被引量：1
9张百驹,张智民.3维奇异摄动四阶旋度问题的非协调有限元逼近及其Nitsche方法分析[J].中国科学：数学,2024,54(4):647-670.

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1Shao-chunChen Yong-chengZhao Dong-yangShi.NON C^0 NONCONFORMING ELEMENTS FOR ELLIPTIC FOURTH ORDER SINGULAR PERTURBATION PROBLEM[J].Journal of Computational Mathematics,2005,23(2):185-198. 被引量：5
2Jun Hu Zhong-ci Shi.CONSTRAINED QUADRILATERAL NONCONFORMING ROTATED Q1 ELEMENT[J].Journal of Computational Mathematics,2005,23(6):561-586. 被引量：25
3Ming Wang,Jin-chao Xu,Yu-cheng Hu.MODIFIED MORLEY ELEMENT METHOD FOR A FOURTH ORDER ELLIPTIC SINGULAR PERTURBATION PROBLEM[J].Journal of Computational Mathematics,2006,24(2):113-120. 被引量：9
4Ming Wang,Zhong-Ci Shi,Jinchao Xu.SOME n-RECTANGLE NONCONFORMING ELEMENTS FOR FOURTH ORDER ELLIPTIC EQUATIONS[J].Journal of Computational Mathematics,2007,25(4):408-420. 被引量：15
5Shuo Zhang Ming Wang.A POSTERIORI ESTIMATOR OF NONCONFORMING FINITE ELEMENT METHOD FOR FOURTH ORDER ELLIPTIC PERTURBATION PROBLEMS[J].Journal of Computational Mathematics,2008,26(4):554-577. 被引量：1
6WANG Ming,ZU PengHe,ZHANG Shuo.High accuracy nonconforming finite elements for fourth order problems[J].Science China Mathematics,2012,55(10):2183-2192. 被引量：5
7Jun Hu,Zhong-Ci Shi.THE BEST L2 NORM ERROR ESTIMATE OF LOWER ORDER FINITE ELEMENT METHODS FOR THE FOURTH ORDER PROBLEM[J].Journal of Computational Mathematics,2012,30(5):449-460. 被引量：1
8HUANG ZhongYi,LI Ye.A class of nonconforming quadrilateral finite elements for incompressible flow[J].Science China Mathematics,2013,56(2):379-393. 被引量：1
9SHI DongYang,XU Chao.EQ_1^(rot) nonconforming finite element approximation to Signorini problem[J].Science China Mathematics,2013,56(6):1301-1311. 被引量：16
10HU Jun,ZHANG ShangYou.Nonconforming finite element methods on quadrilateral meshes[J].Science China Mathematics,2013,56(12):2599-2614. 被引量：1

引证文献4

1Shuo Zhang Ming Wang.A POSTERIORI ESTIMATOR OF NONCONFORMING FINITE ELEMENT METHOD FOR FOURTH ORDER ELLIPTIC PERTURBATION PROBLEMS[J].Journal of Computational Mathematics,2008,26(4):554-577. 被引量：1
2Hongru Chen,Shaochun Chen.UNIFORMLY CONVERGENT NONCONFORMING ELEMENT FOR 3-D FOURTH ORDER ELLIPTIC SINGULAR PERTURBATION PROBLEM[J].Journal of Computational Mathematics,2014,32(6):687-695. 被引量：1
3MENG XiangYun,YANG XueQin,ZHANG Shuo.Convergence analysis of the rectangular Morley element scheme for second order problem in arbitrary dimensions[J].Science China Mathematics,2016,59(11):2245-2264.
4王琳,罗鲲,张世全.四阶奇异摄动问题的弱Galerkin有限元法[J].四川大学学报（自然科学版）,2018,55(6):1141-1147. 被引量：1

二级引证文献3

1MENG XiangYun,YANG XueQin,ZHANG Shuo.Convergence analysis of the rectangular Morley element scheme for second order problem in arbitrary dimensions[J].Science China Mathematics,2016,59(11):2245-2264.
2白艳红,吴永科,覃艳梅.各向异性线弹性问题的鲁棒V-循环多重网格法（英文）[J].四川大学学报（自然科学版）,2019,56(5):819-826.
3刘凯,黄学海,王文庆.四阶椭圆奇异扰动问题混合有限元方法[J].温州大学学报（自然科学版）,2020,41(2):24-30.

1钟敏玲,张新光.奇异扰动(k,n—k)共轭边值问题的正解[J].数学物理学报（A辑）,2011,31(1):263-272.
2姚仰新.临界增长的半线性椭圆方程的一个奇异扰动问题[J].数学年刊（A辑）,1997,1(5):627-634.
3Ming Wang,Jin-chao Xu,Yu-cheng Hu.MODIFIED MORLEY ELEMENT METHOD FOR A FOURTH ORDER ELLIPTIC SINGULAR PERTURBATION PROBLEM[J].Journal of Computational Mathematics,2006,24(2):113-120. 被引量：9
4柴平分.关于可测函数列积分的收敛性[J].青海师范大学学报（自然科学版）,1996,12(2):13-17. 被引量：1
5刘传汉.FOURTH-ORDER ACCURATE DIFFERENCE METHOD FOR THE SINGULAR PERTURBATION PROBLEM[J].Applied Mathematics and Mechanics(English Edition),1997,18(10):987-995.
6肖爱国,李寿佛,符鸿源,陈光南.CONVERGENCE OF LINEAR MULTISTEP METHODS FOR TWO-PARAMETER SINGULAR PERTURBATION PROBLEMS[J].Acta Mathematicae Applicatae Sinica,2001,17(2):207-217. 被引量：1
7郑尚昆,王彩华.非等距网格上奇异扰动问题的有限差分格式[J].天津师范大学学报（自然科学版）,2014,34(3):11-16. 被引量：1
8吴启光,孙晓弟.A UNIFORM HIGH-ORDER METHOD FOR A SINGULAR PERTURBATION PROBLEM IN CONSERVATIVE FORM[J].Applied Mathematics and Mechanics(English Edition),1992,13(10):909-916.
9林平.A CLASS OF VARIATIONAL DIFFERENCE SCHEMES FOR A SINGULAR PERTURBATION PROBLEM[J].Applied Mathematics and Mechanics(English Edition),1989,10(4):353-359.
10程荣军.Singularly perturbed problem for non-local reaction-diffusion equations involving two small parameters[J].Journal of Shanghai University(English Edition),2006,10(6):479-483.

Journal of Computational Mathematics

2007年第6期

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