An inverse problem in analytical dynamics 被引量：3

An inverse problem in analytical dynamics

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摘要 This paper presents an inverse problem in analytical dynamics. The inverse problem is to construct the Lagrangian when the integrals of a system are given. Firstly, the differential equations are obtained by using the time derivative of the integrals. Secondly, the differential equations can be written in the Lagrange equations under certain conditions and the Lagrangian can be obtained. Finally, two examples are given to illustrate the application of the result. This paper presents an inverse problem in analytical dynamics. The inverse problem is to construct the Lagrangian when the integrals of a system are given. Firstly, the differential equations are obtained by using the time derivative of the integrals. Secondly, the differential equations can be written in the Lagrange equations under certain conditions and the Lagrangian can be obtained. Finally, two examples are given to illustrate the application of the result.

作者李广成梅凤翔

机构地区 Department of Mechanics

出处《Chinese Physics B》 SCIE EI CAS CSCD 2006年第8期1669-1671,共3页 中国物理B（英文版）

基金 Project supported by the National Natural Science Foundation of China （Grant Nos 10272021, 10572021） and the Doctoral Programme Foundation of Institution of Higher Education of China （Grant No 20040007022）.

关键词 inverse problem analytical dynamics INTEGRAL LAGRANGIAN inverse problem, analytical dynamics, integral, Lagrangian

分类号 O411 [理学—理论物理] O313 [理学—一般力学与力学基础]

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参考文献8

1Galiullin A S 1986 Methods of Solution of Inverse Problems of Dynamics (Moscow: Nauka)
2Mel F X, Liu D and Luo Y 1991 Advanced Analytical Mechanics (Beijing: Beijing Institute of Technology Press)
3Mei F X 1991 Acta Mech. Sin. 23 252
4Liu F L and Mei F X 1993 Appl. Math. Mech. 14 327
5Zhang Y F and Mei F X 1996 J. Beijing Institute of Technology 16 325
6Mei F X, Shi R C, Zhang Y F and Wu H B 1996 Dynamics of Birkhoffian Systems (Beijing: Beijing Institute of Technology Press)
7Shang M and Mei F X 2005 Chin. Phys. 14 1707
8Santilli R M 1978 Foundations of Theoretical Mechanics I (New York: Springer)

同被引文献26

1FANG,Jian-hui(方建会).LIE SYMMETRIES AND CONSERVED QUANTITIES OF SECOND-ORDER NONHOLONOMIC MECHANICAL SYSTEM[J].Applied Mathematics and Mechanics(English Edition),2002,23(9):1105-1110. 被引量：1
2梅凤翔,陈向炜.Form Invariance of Birkhoffian Systems[J].Journal of Beijing Institute of Technology,2001,10(2):138-142. 被引量：4
3张毅,范存新,葛伟宽.Birkhoff系统的一类新型守恒量[J].物理学报,2004,53(11):3644-3647. 被引量：15
4刘凤丽,梅凤翔.非完整动力学逆问题的一种提法和解法[J].应用数学和力学,1993,14(4):309-314. 被引量：3
5史荣昌,梅凤翔.关于Bertrand一个定理的推广[J].应用数学和力学,1993,14(6):507-513. 被引量：4
6赵跃宇.非保守力学系统的Lie对称性和守恒量[J].力学学报,1994,26(3):380-384. 被引量：77
7张永发,梅凤翔.Birkhoff系统动力学逆问题的两种提法和解法[J].北京理工大学学报,1996,16(4):352-356. 被引量：8
8张毅.变质量二阶线性非完整系统的广义Bertrand定理[J].苏州城建环保学院学报,1996,9(3):13-19. 被引量：1
9Bahar L Y.A unified approach to non-holonomic dynamics[J].International Journal of Non-Linear Mechanics,2000,35(4):613-625.
10Whittaker E T.A treatise on the analytical dynamics of particlesand rigid bodies[M].4th ed.Cambridge:Cambridge UniversityPress,1952.

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3龙梓轩,张毅.Birkhoff系统Lie对称性逆问题的两种提法和解法[J].华东师范大学学报（自然科学版）,2012(3):49-55. 被引量：2

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1任福尧.关于近十年来复解析动力学的卓越成就[J].淮北煤师院学报（自然科学版）,1990,11(4):42-62.
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Chinese Physics B

2006年第8期

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An inverse problem in analytical dynamics 被引量：3

参考文献8

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