The bifurcation of a kind of relative rotational dynamic equation with hysteresis and its approximate solution

Hou Dong-Xiao; Liu Bin; Shi Pei-Ming

doi:10.7498/aps.58.5942

Abstract
Based on the Lagrange function, a new nonlinear relative rotational equation with Davidenkov hysteresis is established. Firstly, the bifurcation characteristics of the hysteretic relative rotational autonomous function and non-antonomous function are discussed. Secondly, the approximate solution of the nonlinear function under periodic force excitation is obtained by KBM method. At last, by numerical simulation, several bifurcation structures are obtained, and the comparisons result indicate the approximate solution of KBM method has higher accuracy and better reflects the dynamic characteristic of equation effectively.

Keywords:
relatively rotation /

hysteresis /

bifurcation /

KBM method
Authors and contacts
Hou Dong-Xiao,

Liu Bin,

Shi Pei-Ming

1.
燕山大学,秦皇岛 066004
References

Cited By

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[2]	Liu Bin, Zhao Hong-Xu, Hou Dong-Xiao, Liu Hao-Ran. Bifurcation and chaos of some strongly nonlinear relative rotation system with time-varying clearance. Acta Physica Sinica, 2014, 63(7): 074501. doi: 10.7498/aps.63.074501
[3]	Zhang Wen-Ming, Li Xue, Liu Shuang, Li Ya-Qian, Wang Bo-Hua. Chaos and the control of multi-time delay feedback for some nonlinear relative rotation system. Acta Physica Sinica, 2013, 62(9): 094502. doi: 10.7498/aps.62.094502
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Vol. 58, Issue 9 - 2009-05-05

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The bifurcation of a kind of relative rotational dynamic equation with hysteresis and its approximate solution

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The bifurcation of a kind of relative rotational dynamic equation with hysteresis and its approximate solution

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