Amplitude control of limit cycle in a van der Pol Duffing system 被引量：3

Amplitude control of limit cycle in a van der Pol Duffing system

下载PDF

导出

摘要 This paper applies washout filter technology to amplitude control of limit cycles emerging from Hopf bifurcation of the van der Pol-Duffing system. The controlling parameters for the appearance of Hopf bifurcation are given by the Routh-Hurwitz criteria. Noticeably, numerical simulation indicates that the controllers control the amplitude of limit cycles not only of the weakly nonlinear van der Pol-Duffing system but also of the strongly nonlinear van der Pol-Duffing system. In particular, the emergence of Hopf bifurcation can be controlled by a suitable choice of controlling parameters. Gain-amplitude curves of controlled systems are also drawn. This paper applies washout filter technology to amplitude control of limit cycles emerging from Hopf bifurcation of the van der Pol-Duffing system. The controlling parameters for the appearance of Hopf bifurcation are given by the Routh-Hurwitz criteria. Noticeably, numerical simulation indicates that the controllers control the amplitude of limit cycles not only of the weakly nonlinear van der Pol-Duffing system but also of the strongly nonlinear van der Pol-Duffing system. In particular, the emergence of Hopf bifurcation can be controlled by a suitable choice of controlling parameters. Gain-amplitude curves of controlled systems are also drawn.

作者欧阳克俭唐驾时梁翠香

机构地区 College of Civil Engineering College of Mechanics and Aerospace

出处《Chinese Physics B》 SCIE EI CAS CSCD 2009年第11期4748-4753,共6页 中国物理B（英文版）

基金 Project supported by the National Natural Science Foundation of China (Grant No 10672053)

关键词 bifurcation control limit cycle Hopf bifurcation van der Pol-Duffing system bifurcation control, limit cycle, Hopf bifurcation, van der Pol-Duffing system

分类号 N93 [自然科学总论]

引文网络
相关文献

参考文献25

1Chen G R, Moiola J L and Wang H O 2000 Int. J. Bifur. Chaos 10 511.
2Liu S H, Tang J S, Qin J Q and Yin X B 2008 Chin. Phys. B 17 1691.
3Nayfeh A H, Harb A M and Chin C M 1996 Int. J. Bifur. Chaos 6 497.
4Tang J S, Fu W B and Li K A 2002 Chin. Phys. 11 1004.
5Tang J S and Xiao H 2007 Acta Phys. Sin. 56 101.
6Chen D S, Wang H O and Chen G R 2001 IEEE Trans. on Circuits and Systems-Ⅰ: Fundamental Theory and Applications. 48 661.
7Tang J S and Ouyang K J 2006 Acta Phys. Sin. 55 4437.
8Liu S H and Tang J S 2007 Acta Phys. Sin. 56 3145.
9Ouyang K J, Qing J Q and Tang J S 2006 J. Dyn. Contr. 4 227.
10Wang H O and Abed E H 1995 Automatica 31 1213.

同被引文献35

1符文彬,唐驾时.基于状态反馈参数激励系统的超谐共振分岔控制[J].物理学报,2004,53(9):2889-2893. 被引量：8
2符文彬,唐驾时.强迫Duffing振动系统的主共振鞍结分岔控制[J].振动工程学报,2004,17(3):365-368. 被引量：10
3唐驾时,欧阳克俭.logistic模型的倍周期分岔控制[J].物理学报,2006,55(9):4437-4441. 被引量：17
4ZHOU LiangQiang, CHEN YuShu, CHEN FangQi. Stability and chaos of a damped satellite partially filled with liquid [J]. Acta Astronautiea, 2009, 65 (11-12 ) : 1628-1638.
5Askari E, Daneshmand F. Coupled vibration of a partially fluid-filled cylindrical container with a cylindrical internal body [ J ]. Journal of Fluids and Structures, 2009, 25 (2) : 389-405.
6Kovaleva A. The Melnikov criterion of instability for random rocking dynamics of a rigid block with an attached secondary structure [ J ]. Nonlinear Analysis : Real World Applications. 2010, 11(1) : 472-479.
7Haghighi S Hossein, Amir H D Markazi. Chaos prediction and control in MEMS resonators [ J ]. Communications in Nonlinear Science and Numerical Simulation, 2010, 15 (10) : 3091-3099.
8Rasoul Asheghi, Hamid R Z Zangeneh. Bifurcations of limit cycles for a quintic Hamihonian system with a double cuspidal loop [ J ].Computers & Mathematics with Applications, 2010, 59 (4) : 1409- 1418.
9ZHOU LiangQiang, CHEN YuShu, CHEN FangQi. Global bifurcation analysis and chaos of an arch structure with parametric and forced excitation [ J]. Mechanics Research Communications, 2010, 37: 67-71.
10WEI Zhang, ZHANG J H, YAO M H, YAO Z G. Multi-pulse chaotic dynamics of non-autonomous nonlinear system for a laminated composite piezoelectric rectangular plate [J]. Acta Mech, 2010, 211: 23-47.

引证文献3

1钟顺,陈予恕.充液飞行器多频运动模式下燃料晃动的全局分岔行为[J].机械强度,2011,33(6):791-796. 被引量：1
2FERNANDES Antonio Carlos,ARMANDEI Mohammadmehdi.Phenomenological model for torsional galloping of an elastic flat plate due to hydrodynamic loads[J].Journal of Hydrodynamics,2014,26(1):57-65.
3欧阳克俭,唐驾时.离散非线性动力系统的倍周期分叉控制[J].噪声与振动控制,2014,34(3):57-60. 被引量：1

二级引证文献2

1张良,唐驾时.四维超混沌系统Hopf分岔分析与反控制[J].计算力学学报,2018,35(2):188-194. 被引量：8
2王航,郑雪山,周挺,张国兴,侯雨雷,曾达幸.含多间隙曲柄滑块机构动力学建模与特性分析[J].黑龙江大学自然科学学报,2021,38(2):218-227. 被引量：1

1沈怡然.一种基于Lü系统的混沌信号幅度控制方法[J].杭州电子科技大学学报（自然科学版）,2016,36(2):13-17. 被引量：2
2颜卫,潘一腾.DDS技术正弦信号发生器的实现[J].企业技术开发,2009,28(2):11-12.
3汪连栋,申绪涧.雷达信号模拟器幅度控制误差分析[J].雷达与对抗,2000,20(3):28-31. 被引量：1
4孙国璋,刘曾荣.CHAOTIC STATE OF SOFT SPRING DUFFING SYSTEM[J].Chinese Science Bulletin,1987,32(21):1464-1469. 被引量：2
5王辅忠,秦光戎,等.Experimental Analysis of Stochastic Resonance in a Duffing System[J].Chinese Physics Letters,2003,20(1):28-30. 被引量：3
6韩建群,伦淑娴.一种基于Duffing系统实现混沌掩盖通信的方法[J].计算机科学,2013,40(5):82-84. 被引量：2
7赵迪.压缩相空间实现对混沌及超混沌系统的控制[J].沙洋师范高等专科学校学报,2004,5(5):12-14.
8David Brandon,John Kornblum.多通道频率合成器应用得益于精密频率合成技术[J].中国集成电路,2006,15(9):76-80. 被引量：2
9周新慧,李小伟.一种多重滤子非单调的新锥模型信赖域算法[J].电子科技,2013,26(12):17-19.
10David Brandon,John Kornblum.多通道频率合成器应用得益于精密频率合成技术[J].电子设计技术 EDN CHINA,2006,13(3):76-76.

Chinese Physics B

2009年第11期

浏览历史

内容加载中请稍等...

Amplitude control of limit cycle in a van der Pol Duffing system 被引量：3

参考文献25

同被引文献35

引证文献3

二级引证文献2

相关作者

相关机构

相关主题

浏览历史