含平方项和5次幂项的Van der Pol-Duffing系统混沌控制
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摘要
研究了同时含有平方项和高次幂项的Van der Pol-Duffing系统的混沌行为及混沌控制问题,数值仿真分析了该系统存在的典型非线性动力学行为.主要采用单初始点分岔分析方法、最大Lyapunov指数和Poincare映射方法,从不同侧面揭示了在周期激振力作用下系统的周期运动、混沌运动,以及运动形式的演化过程,并用x|x|控制方法实现了系统的混沌抑制问题.
The chaotic behavior and chaotic control of Van der Pol-Duffing system with square term and high power term are studied.The typical nonlinear dynamic behavior of the system is analyzed by numerical simulation.The periodic motion,the chaotic motion and the evolution process of the motion form of the system under periodic excitation force are revealed from different aspects by using single initial point bifurcation analysis method,maximum Lyapunov exponent and Poincare mapping method.The chaotic suppression problem of the system is realized by using the x|x|control method.
The chaotic behavior and chaotic control of Van der Pol-Duffing system with square term and high power term are studied.The typical nonlinear dynamic behavior of the system is analyzed by numerical simulation.The periodic motion,the chaotic motion and the evolution process of the motion form of the system under periodic excitation force are revealed from different aspects by using single initial point bifurcation analysis method,maximum Lyapunov exponent and Poincare mapping method.The chaotic suppression problem of the system is realized by using the x|x|control method.
引文
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[3]马莉.Chen式系统的混沌控制[J].自动化与仪器仪表,2016(8):216-218.
[4]黄迪山,刘献之,邵何锡.多自由度参数振动混沌控制方法研究[J].动力学与控制学报,2018,16(3):233-238.
[5]王炜,张琪昌,田瑞兰.两自由度强非线性振动系统的渐近解及分岔分析[J].振动与冲击,2008,27(5):130-133.
[6]冉彬,蔡雅丽,苟清明.Duffing-Van der Pol系统的复杂动态行为[J].湘潭大学:自然科学学报,2010,32(2):17-23.
[7]李战国.扩展Duffing-Van der Pol系统混沌控制与同步研究[D].西安:西北工业大学,2007.
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