Reduced-order finite element method based on POD for fractional Tricomi-type equation 被引量：1

Reduced-order finite element method based on POD for fractional Tricomi-type equation

下载PDF

导出

摘要 The reduced-order finite element method （FEM） based on a proper orthogo- nal decomposition （POD） theory is applied to the time fractional Tricomi-type equation. The present method is an improvement on the general FEM. It can significantly save mem- ory space and effectively relieve the computing load due to its reconstruction of POD basis functions. Furthermore, the reduced-order finite element （FE） scheme is shown to be un- conditionally stable, and error estimation is derived in detail. Two numerical examples are presented to show the feasibility and effectiveness of the method for time fractional differential equations （FDEs）. The reduced-order finite element method （FEM） based on a proper orthogo- nal decomposition （POD） theory is applied to the time fractional Tricomi-type equation. The present method is an improvement on the general FEM. It can significantly save mem- ory space and effectively relieve the computing load due to its reconstruction of POD basis functions. Furthermore, the reduced-order finite element （FE） scheme is shown to be un- conditionally stable, and error estimation is derived in detail. Two numerical examples are presented to show the feasibility and effectiveness of the method for time fractional differential equations （FDEs）.

作者 Jincun LIU Hong LI Yang LIU Zhichao FANG

机构地区 School of Mathematical Sciences

出处《Applied Mathematics and Mechanics(English Edition)》 SCIE EI CSCD 2016年第5期647-658,共12页 应用数学和力学（英文版）

基金 Project supported by the National Natural Science Foundation of China(Nos.11361035 and 11301258) the Natural Science Foundation of Inner Mongolia(Nos.2012MS0106 and 2012MS0108)

关键词 reduced-order finite element method （FEM） proper orthogonal decompo-sition （POD） fractional Tricomi-type equation unconditionally stable error estimate reduced-order finite element method （FEM）, proper orthogonal decompo-sition （POD）, fractional Tricomi-type equation, unconditionally stable, error estimate

分类号 O241.82 [理学—计算数学]

引文网络
相关文献

参考文献1

1LUO ZhenDong,CHEN Jing,SUN Ping,YANG XiaoZhong.Finite element formulation based on proper orthogonal decomposition for parabolic equations[J].Science China Mathematics,2009,52(3):585-596. 被引量：17

二级参考文献22

1K. Kunisch,S. Volkwein.Galerkin proper orthogonal decomposition methods for parabolic problems[J]. Numerische Mathematik . 2001 (1)
2Jolliffie I T.Principal Component Analysis. . 2002
3Luo Z D,Chen J,Navon I M, et al.An optimizing reduced PLSMFE formulation for non-stationary conduction–convection problems. Internat J Numer Methods Fluids .
4Thomee V.Galerkin Finite Element Methods for Parabolic Problems. . 1997
5Luo Zhendong.Mixed finite element methods and applications. . 2006
6Holmes,P.,Lumley,J. L.,Berkooz,G. Turbulence, Coherent Structures, Dynamical Systems and Symmetry . 1996
7Fukunaga K.Introduction to Statistical Recognition. . 1990
8Crommelin,D. T.,Majda,A. J.Strategies for model reduction: comparing different optimal bases. Journal of the Atmospheric Sciences . 2004
9Majda,AJ,Timofeyev,I,Vanden-Eijnden,E.Systematic strategies for stochastic mode reduction in climate. Journal of the Atmospheric Sciences . 2003
10Selten,F.Barophilic empirical orthogonal functions as basis functions in an atmospheric model. Journal of the Atmospheric Sciences . 1997

共引文献16

1孙萍,罗振东,周艳杰.热传导对流方程基于POD的差分格式[J].计算数学,2009,31(3):323-334. 被引量：10
2罗振东,欧秋兰,谢正辉.非定常Stokes方程一种基于POD方法的简化有限差分格式[J].应用数学和力学,2011,32(7):795-806. 被引量：14
3罗振东,欧秋兰,谢正辉.Reduced finite difference scheme and error estimates based on POD method for non-stationary Stokes equation[J].Applied Mathematics and Mechanics(English Edition),2011,32(7):847-858.
4狄振华,罗振东,谢正辉,王爱文.二维非饱和土壤水流方程基于POD方法的有限元格式[J].北京交通大学学报,2011,35(3):142-149. 被引量：4
5腾飞,孙萍,罗振东.抛物型方程基于POD方法的时间二阶中心差的时间二阶精度简化有限元格式[J].计算数学,2011,33(4):373-386. 被引量：7
6罗振东,欧秋兰,吴加荣,谢正辉.A REDUCED FE FORMULATION BASED ON POD METHOD FOR HYPERBOLIC EQUATIONS[J].Acta Mathematica Scientia,2012,32(5):1997-2009. 被引量：2
7吴加荣.讨论Burgers方程的概率空间与特征正交空间的最小平均距离问题[J].广东工业大学学报,2012,29(4):72-76.
8罗振东,李宏,陈静.非饱和土壤水流问题基于POD方法的降阶有限体积元格式及外推算法实现[J].中国科学：数学,2012,42(12):1263-1280. 被引量：6
9罗振东,高骏强,孙萍,安静.交通流模型基于特征投影分解技术的外推降维有限差分格式[J].计算数学,2013,35(2):159-170. 被引量：4
10李宏,罗振东,高骏强.A NEW REDUCED-ORDER FVE ALGORITHM BASED ON POD METHOD FOR VISCOELASTIC EQUATIONS[J].Acta Mathematica Scientia,2013,33(4):1076-1098. 被引量：1

同被引文献4

1朱强华,杨恺,梁钰,高效伟.基于特征正交分解的一类瞬态非线性热传导问题的新型快速分析方法[J].力学学报,2020,52(1):124-138. 被引量：12
2郑保敬,梁钰,高效伟,朱强华,吴泽艳.功能梯度材料动力学问题的POD模型降阶分析[J].力学学报,2018,50(4):787-797. 被引量：13
3钟佳岐,梁山,熊庆宇.德拜媒质微波加热过程的H_∞保性能温度跟踪控制[J].自动化学报,2018,44(8):1518-1527. 被引量：6
4杨彪,高皓,李鑫培,成宬,杜婉,刘承,马红涛.基于一致性理论的多源微波加热温度均匀性优化[J].控制与决策,2023,38(4):989-998. 被引量：2

引证文献1

1杨彪,黄宏彬,杜庆治,吴照刚,彭飞云,韩泽民.基于特征正交分解的微波加热过程快速求解方法[J].控制与决策,2024,39(9):3059-3068.

1李冠林,陈希有,刘凤春,牟宪民.Observer based projective reduced-order synchronization of different chaotic systems[J].Journal of Harbin Institute of Technology(New Series),2010,17(5):697-700. 被引量：1
2陈松林.一类Tricomi偏微分方程边值问题的奇摄动[J].数学物理学报（A辑）,1994,14(2):236-239.
3杨小远.跨声速气流的控制方程有限元方法的收敛性[J].石油大学学报（自然科学版）,1997,21(1):93-96.
4屈爱芳.Tricomi算子的基本解[J].数学学报（中文版）,2008,51(4):625-632.
5Yunlong LI,Wei CAO.Research of influence of reduced-order boundary on accuracy and solution of interior points[J].Applied Mathematics and Mechanics(English Edition),2017,38(1):111-124.
6于亚婷,杜平安,王振伟.有限元法的应用现状研究[J].机械设计,2005,22(3):6-9. 被引量：58
7Jing AN,Zhendong LUO,Hong LI,Ping SUN.Reduced-order extrapolation spectral-finite difference scheme based on POD method and error estimation for three-dimensional parabolic equation[J].Frontiers of Mathematics in China,2015,10(5):1025-1040.
8H.G.Abdelwahed,E.K.El-Shewy,A.A.Mahmoud.On the Time Fractional Modulation for Electron Acoustic Shock Waves[J].Chinese Physics Letters,2017,34(3):86-89.
9Shou Feng WANG.Quasi-Type δ Semigroups with an Adequate Transversal[J].Journal of Mathematical Research and Exposition,2011,31(6):1129-1135.
10王泉,王大钧,苏先樾.A Reduced-Order Model for Structural Wave Control and the Concept of Degree of Controllability[J].Science China Mathematics,1994,37(10):1216-1222.

Applied Mathematics and Mechanics(English Edition)

2016年第5期

浏览历史

内容加载中请稍等...