Synchronization of different chaotic systems via active radial basis functions sliding mode controller

doi:10.1088/1674-1056/17/5/021

中国物理B ›› 2008, Vol. 17 ›› Issue (5): 1652-1663.doi: 10.1088/1674-1056/17/5/021

Synchronization of different chaotic systems via active radial basis functions sliding mode controller

郭会军, 尹有为, 王华民

Department of Automation and Information Engineering, Xi'an University of Technology, Xi'an 710048, China

收稿日期:2007-07-10 修回日期:2007-09-22 出版日期:2008-05-20 发布日期:2008-05-20

Synchronization of different chaotic systems via active radial basis functions sliding mode controller

Guo Hui-Jun(郭会军)^†, Yin You-Wei(尹有为), and Wang Hua-Min(王华民)

Department of Automation and Information Engineering, Xi'an University of Technology, Xi'an 710048, China

Received:2007-07-10 Revised:2007-09-22 Online:2008-05-20 Published:2008-05-20

摘要/Abstract

摘要： This paper presents a new method to synchronize different chaotic systems with disturbances via an active radial basis function (RBF) sliding controller. This method incorporates the advantages of active control, neural network and sliding mode control. The main part of the controller is given based on the output of the RBF neural networks and the weights of these single layer networks are tuned on-line based on the sliding mode reaching law. Only several radial basis functions are required for this controller which takes the sliding mode variable as the only input. The proposed controller can make the synchronization error converge to zero quickly and can overcome external disturbances. Analysis of the stability for the controller is carried out based on the Lyapunov stability theorem. Finally, five examples are given to illustrate the robustness and effectiveness of the proposed synchronization control strategy.

Abstract: This paper presents a new method to synchronize different chaotic systems with disturbances via an active radial basis function (RBF) sliding controller. This method incorporates the advantages of active control, neural network and sliding mode control. The main part of the controller is given based on the output of the RBF neural networks and the weights of these single layer networks are tuned on-line based on the sliding mode reaching law. Only several radial basis functions are required for this controller which takes the sliding mode variable as the only input. The proposed controller can make the synchronization error converge to zero quickly and can overcome external disturbances. Analysis of the stability for the controller is carried out based on the Lyapunov stability theorem. Finally, five examples are given to illustrate the robustness and effectiveness of the proposed synchronization control strategy.

Key words: chaos synchronization, active control, sliding mode control, RBF networks

中图分类号: (Synchronization; coupled oscillators)

05.45.Xt

05.45.Gg (Control of chaos, applications of chaos) 05.45.Pq (Numerical simulations of chaotic systems)

郭会军, 尹有为, 王华民. Synchronization of different chaotic systems via active radial basis functions sliding mode controller[J]. 中国物理B, 2008, 17(5): 1652-1663.

Guo Hui-Jun(郭会军), Yin You-Wei(尹有为), and Wang Hua-Min(王华民) . Synchronization of different chaotic systems via active radial basis functions sliding mode controller[J]. Chin. Phys. B, 2008, 17(5): 1652-1663.

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Synchronization of different chaotic systems via active radial basis functions sliding mode controller

Synchronization of different chaotic systems via active radial basis functions sliding mode controller

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