周良强
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所属单位:理学院
发表刊物:CHAOS SOLITONS & FRACTALS
关键字:Inverted pendulum Chaos Subharmonic bifurcation Melnikov method Heteroclinic orbit
摘要:Using both analytical and numerical methods, global dynamics including subharmonic bifurcations and chaotic motions for a class of inverted pendulum system are investigated in this paper. The expressions of the heteroclinic orbits and periodic orbits are obtained analytically. Chaos arising from heteroclinic intersections is studied with the Melnikov method. The critical curves separating the chaotic and non chaotic regions are obtained. The conditions for subharmonic bifurcations are also obtained. It is proved that the system can be chaotically excited through finite subharmonic bifurcations. Some new dynamical phenomena are presented. Numerical simulations are given, which verify the analytical results. (C) 2017 Elsevier Ltd. All rights reserved.
ISSN号:0960-0779
是否译文:否
发表时间:2017-06-01
合写作者:Liu, Shanshan,陈芳启
通讯作者:周良强,陈芳启,周良强