Chin. Phys. Lett.  2001, Vol. 18 Issue (11): 1438-1441    DOI:
Original Articles |
Chaos Synchronization in Two Coupled Duffing Oscillators
FANG Jian-Shu1;FANG Zhuo2;LIU Xiao-Juan3;RONG Man-Sheng1
1Department of Physics, Zhuzhou Teacher’s College, Zhuzhou 412007 2The Key Laboratory of Biomedical Photonics, Huazhong University of Science and Technology, Wuhan 430074 3Department of Physics, Xiangtan Teacher’s College, Xiangtan 411017
Cite this article:   
FANG Jian-Shu, FANG Zhuo, LIU Xiao-Juan et al  2001 Chin. Phys. Lett. 18 1438-1441
Download: PDF(510KB)  
Export: BibTeX | EndNote | Reference Manager | ProCite | RefWorks
Abstract We have obtained two general unstable periodic solutions near the homoclinic orbits of two coupled Duffing oscillators with weak periodic perturbations by using the direct perturbation technique. Theoretical analysis reveals that the stable periodic orbits are embedded in the Melnikov chaotic attractors. The corresponding numerical results show that the phase portraits in the (x,u) and (y,v) planes are identical and are synchronized when the parameters of the two coupled oscillators are identical, but they are different and asynchronized when there is any difference between these parameters. It has been shown that the system parameters play a very important role in chaos control and synchronization.
Keywords: 05.45.+b     
Published: 01 November 2001
PACS:  05.45.+b  
TRENDMD:   
URL:  
https://cpl.iphy.ac.cn/       OR      https://cpl.iphy.ac.cn/Y2001/V18/I11/01438
Service
E-mail this article
E-mail Alert
RSS
Articles by authors
FANG Jian-Shu
FANG Zhuo
LIU Xiao-Juan
RONG Man-Sheng
Related articles from Frontiers Journals
[1] Juan A. Lazzús** . Predicting Natural and Chaotic Time Series with a Swarm-Optimized Neural Network[J]. Chin. Phys. Lett., 2011, 28(11): 1438-1441
[2] MIAO Qing-Ying, FANG Jian-An, TANG Yang, DONG Ai-Hua. Increasing-order Projective Synchronization of Chaotic Systems with Time Delay[J]. Chin. Phys. Lett., 2009, 26(5): 1438-1441
[3] BU Yun, WEN Guang-Jun, ZHOU Xiao-Jia, ZHANG Qiang. A Novel Adaptive Predictor for Chaotic Time Series[J]. Chin. Phys. Lett., 2009, 26(10): 1438-1441
[4] FANG Jin-Qing, YU Xing-Huo. A New Type of Cascading Synchronization for Halo-Chaos and Its Potential for Communication Applications[J]. Chin. Phys. Lett., 2004, 21(8): 1438-1441
[5] He Wei-Zhong, XU Liu-Su, ZOU Feng-Wu. Dynamics of Coupled Quantum--Classical Oscillators[J]. Chin. Phys. Lett., 2004, 21(8): 1438-1441
[6] YIN Hua-Wei, LU Wei-Ping, WANG Peng-Ye. Determination of Optimal Control Strength of Delayed Feedback Control Using Time Series[J]. Chin. Phys. Lett., 2004, 21(6): 1438-1441
[7] HE Kai-Fen. Hopf Bifurcation in a Nonlinear Wave System[J]. Chin. Phys. Lett., 2004, 21(3): 1438-1441
[8] CHEN Jun, LIU Zeng-Rong. A Method of Controlling Synchronization in Different Systems[J]. Chin. Phys. Lett., 2003, 20(9): 1438-1441
[9] ZHENG Yong-Ai, NIAN Yi-Bei, LIU Zeng-Rong. Impulsive Synchronization of Discrete Chaotic Systems[J]. Chin. Phys. Lett., 2003, 20(2): 1438-1441
[10] FANG Jin-Qing, YU Xing-Huo, CHEN Guan-Rong. Controlling Halo-Chaos via Variable Structure Method[J]. Chin. Phys. Lett., 2003, 20(12): 1438-1441
[11] ZHANG Guang-Cai, ZHANG Hong-Jun,. Control Method of Cooling a Charged Particle Pair in a Paul Trap[J]. Chin. Phys. Lett., 2003, 20(11): 1438-1441
[12] ZHENG Yong-Ai, NIAN Yi-Bei, LIU Zeng-Rong. Impulsive Control for the Stabilization of Discrete Chaotic System[J]. Chin. Phys. Lett., 2002, 19(9): 1438-1441
[13] LI Ke-Ping, CHEN Tian-Lun. Phase Space Prediction Model Based on the Chaotic Attractor[J]. Chin. Phys. Lett., 2002, 19(7): 1438-1441
[14] ZHANG Hai-Yun, HE Kai-Fen. Charged Particle Motion in Temporal Chaotic and Spatiotemporal Chaotic Fields[J]. Chin. Phys. Lett., 2002, 19(4): 1438-1441
[15] ZHOU Xian-Rong, MENG Jie, , ZHAO En-Guang,. Spectral Statistics in the Cranking Model[J]. Chin. Phys. Lett., 2002, 19(2): 1438-1441
Viewed
Full text


Abstract