期刊文献+

Internal motion of the complex oscillators near main resonance

Internal motion of the complex oscillators near main resonance
下载PDF
导出
摘要 An analytical study of the two degrees of freedom nonlinear dynamical system is presented. The internal motion of the system is separated and described by one fourth order differential equation. An approximate approach allows reducing the problem to the Duffing equation with adequate initial conditions. A novel idea for an effective study of nonlinear dynamical systems consisting in a concept of the socalled limiting phase trajectories is applied. Both qualitative and quantitative complex analyses have been performed. Important nonlinear dynamical transition type phenomena are detected are investigated analytically. An analytical study of the two degrees of freedom nonlinear dynamical system is presented. The internal motion of the system is separated and described by one fourth order differential equation. An approximate approach allows reducing the problem to the Duffing equation with adequate initial conditions. A novel idea for an effective study of nonlinear dynamical systems consisting in a concept of the socalled limiting phase trajectories is applied. Both qualitative and quantitative complex analyses have been performed. Important nonlinear dynamical transition type phenomena are detected are investigated analytically.
出处 《Theoretical & Applied Mechanics Letters》 CAS 2012年第4期19-22,共4页 力学快报(英文版)
关键词 nonlinear dynamics multiple scale method complex oscillator internal motion nonlinear dynamics, multiple scale method, complex oscillator, internal motion
  • 相关文献

参考文献5

  • 1R Starosta. Nonlinear Dynamics of Discrete Systems in Asymptotic Approach-Selected Problems[M].Wydawnictwo Politechniki Poznanskiej,Pozan,2011.
  • 2J Awrejcewicz. Bifurcation and Chaos in Coupled Oscillators[M].World Scientific,New Jersey,1991.
  • 3A Okninski;J Kyziol.查看详情[J],Machine Dynamics Problems2005107.
  • 4L I Manevitch,A I Musienko. Limiting phase trajectories and energy exchange between anharmonic oscillator and external force[J].Nonlinear Dynamics,2009,(4):633.doi:10.1007/s11071-009-9506-z.
  • 5A H Nayfeh. Introduction to Perturbation Methods[M].New York:wiley,1981.

相关作者

内容加载中请稍等...

相关机构

内容加载中请稍等...

相关主题

内容加载中请稍等...

浏览历史

内容加载中请稍等...
;
使用帮助 返回顶部