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一类带有外激的非线性动力系统的混沌运动 被引量:2

Chaos in a Nonlinear Dynamical System under External Excitation
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摘要 利用多尺度摄动法推导出一类带有非线性和外部激励的两自由度气弹性动力系统的平均方程,对于非摄动情况下的平均方程,得出其异宿轨存在的条件,并计算出异宿轨的显示表达式,然后利用Melnikov方法得到当某些参数值取特定值时,平均方程的异宿轨破裂,这可能引起Smale马蹄混沌。最后,将该理论分析结果应用到一个功能梯度板模型,得出在一定参数取值下,该模型存在异宿轨破裂引起的Smale马蹄混沌。 With the aid of the method of multiple scales perturbation technique,the averaged equations of a two-degree-of-freedom elastic and dynamic system with nonlinearities and external excitation are derived. For the unperturbed averaged system,the criteria for the existence and the expressions of heteroclinic orbits are obtained.Using the Melnikov function,for some certain parameters the heteroclinic orbits break with transversal intersections. In this case,Smale horseshoes may existence. Finally,this analysis method is applied to a functionally graded materials plate model. And for some certain parameters the heteroclinic orbits break and Smale horseshoes existence.
作者 张红丽 陈芳启
机构地区 南京航空航天大学航空宇航学院 南京航空航天大学理学院
出处 《科学技术与工程》 北大核心 2016年第13期1-6,共6页 Science Technology and Engineering
基金 国家自然科学基金(11202095) 高等学校博士学科点专项科研基金(20133218110025)资助
关键词 多尺度摄动法 异宿轨 MELNIKOV函数 Smale混沌 the method of multiple scales perturbation heteroclinic orbit Melnikov function Smale horseshoes
分类号 O322 [理学—一般力学与力学基础]
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参考文献11

  • 1Chinta M, Palazzolo A B. Stability and bifurcation of rotor motion in a magnetic bearing[J]. Journal of Sound and Vibration, 1998, 214(5): 793-803.
  • 2Hao Y X, Chen L H, Zhang W, etal. Nonlinear oscillations, bifurcations and chaos of functionally graded materials plate[J]. Journal of Sound and Vibration, 2008, 312(4): 862-892.
  • 3Anlas G, Elbeyli O. Nonlinear vibrations of a simply supported rectangular metallic plate subjected to transverse harmonic excitation in the presence of a one-to-one internal resonance[J]. Nonlinear Dynamics, 2002, 30(1): 1-28.
  • 4Lee W K, Yeo M H. Non-linear interactions in asymmetric vibrations of a circular plate[J]. Journal of Sound and Vibration, 2003, 263(5): 1017-1030.
  • 5Gattulli V, Pasca M, Vestroni F. Nonlinear oscillations of anon resonant cable under in-plane excitation with a longitudinal control[J]. Nonlinear Dynamics, 1997, 14(2): 139-156.
  • 6Hegazy U H, Amer Y A. A time-varying stiffness rotor-active magnetic bearings system under parametric excitation[J]. Journal of Mechanical Engineering Science, 2008, 222(3): 447-458.
  • 7Namachchivaya N S, Doyle M M, Malhotra N. Some aspects of chaotic and stochastic dynamics for structural systems[J]. Sadhana,1995,20(2): 583-613.
  • 8Feng Z C, Sethna P R. Global bifurcation and chaos in parametrically forced systems with one-one resonance[J]. Dynamics and Stability of Systems, 1990, 5(4): 201-225.
  • 9Li G X, Moon F C. Fractal basin boundaries in a two-degree-of-freedom nonlinear system[J]. Nonlinear Dynamics, 1990, 1(3): 209-219.
  • 10El-Bassiouny A F, Kamel M M, Abdel-Khalik A. Two-to-one internal resonances in nonlinear two degree of freedom system with parametric and external excitations[J]. Mathematics and Computers in Simulation, 2003, 63(1): 45-56.

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科学技术与工程
2016年 第13期

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