Controlled synchronization of complex network with different kinds of nodes
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- 作者:Zhengquan Yang ; Zhongxin Liu ; Zengqiang Chen…
- 关键词:Complex network ; Synchronization ; Pinning control ; Chaos ; Exponential stable
- 刊名:Control Theory and Technology
- 出版年:2008
- 出版时间:February 2008
- 年:2008
- 卷:6
- 期:1
- 页码:11-15
- 全文大小:159 KB
- 参考文献:[1]G. Rangarajan, M. Ding. Stability of synchronized chaos in coupled dynamical systems[J]. Physics Letters A, 2002, 296(4/5): 204鈥?09.MATH CrossRef MathSciNet
[2]C. Wu, L. Chua. Synchronization in an array of linearly coupled dynamical systems[J]. IEEE Transactions on Circuits and Systems I: Fundamental Theory and Applications, 1995, 42(8): 430鈥?47.MATH CrossRef MathSciNet
[3]C. Wu. Synchronization in Coupled Chaotic Circuits and Systems[M]. Singapore: World Scientific, 2002.
[4]A. Pogromsky, H. Nijmeijer. Cooperative oscillatory behavior of mutually coupled dynamical systems[J]. IEEE Transactions on Circuits and Systems I: Fundamental Theory and Applications, 2001, 48(2): 152鈥?62.MATH CrossRef MathSciNet
[5]V. N. Belykh, I. Belykh, M. Hasler. Connection graph stability method for synchronized coupled chaotic systems[J]. Physica D, 2004, 195(1/2): 159鈥?87.MATH CrossRef MathSciNet
[6]S. C. Manrubia, S. M. Mikhailov. Mutual synchronization and clustering in randomly coupled chaotic dynamical networks[J]. Physical Review E, 1999, 60(2): 1579鈥?589.CrossRef
[7]M. Barahona, L. M. Pecora. Synchronization in small-world systems[J]. Physical Review Letters, 2002, 89(5): 054101/1鈥?.CrossRef
[8]E. Almaas, R. V. Kulkarni, D. Stoud. Characterizing the structure of small-world networks[J]. Physical Review Letters, 2002, 88(9):098101/1鈥?.CrossRef
[9]H. Hong, M. Choi, B. Kim. Synchronization on small-world networks[J]. Physical Review E, 2002, 65(2): 026139/1鈥?.
[10]X. Wang. Complex networks: topology, dynamics and synchronization[J]. International Journal of Bifurcation and Chaos in Applied Sciences and Engineering, 2002, 12(5): 885鈥?16.MATH CrossRef MathSciNet
[11]X. Wang, G. Chen. Synchronization in small-world dynamical networks[J]. International Journal of Bifurcation and Chaos in Applied Sciences and Engineering, 2002, 12(1): 187鈥?92.CrossRef
[12]X. Wang, G. Chen. Synchronization in scale-free dynamical networks: robustness and fragility[J]. IEEE Transactions on Circuits and Systems I: Fundamental Theory and Applications, 2002, 49(1):54鈥?2.CrossRef MathSciNet
[13]X. Li, G. Chen. Synchronization and desynchronization of complex dynamical networks: an engineering viewpoint[J]. IEEE Transactions on Circuits and Systems I: Fundamental Theory and Applications, 2003, 50(11): 1381鈥?390.CrossRef MathSciNet
[14]J. L眉, X. Yu, G. Chen. Chaos synchronization of general complex dynamical networks[J]. Physica A, 2004, 334(1/2): 281鈥?02.CrossRef MathSciNet
[15]J. L眉, X. Yu, G. Chen, et al. Characterizing the synchronizability of small-world dynamical networks[J]. Transactions on Circuits and Systems, 2004, 51(1): 787鈥?96.CrossRef
[16]J. L眉, G. Chen. A time-varying complex dynamical model and its controlled synchronization criteria[J]. IEEE Transactions on Automatic Control, 2005, 50(6): 841鈥?46.CrossRef
[17]Z. Yang, Z. Liu, Z. Chen, et al. Adaptive synchronization of an uncertain complex delayed dynamical networks[J]. International Journal of Nonlinear Science 2007, 3(2): 93鈥?00.MathSciNet
[18]Z. Yang, Z. Liu, Z. Chen, et al. On the global asymptotically synchronization stability analysis of heterogeneous-nodes complex dynamical networks[J]. Dynamics of Continuous, Discrete and Impulsive Systems B (in press).
[19]S. Bao, V. T. Chan, M. M. Merzerich. Cortical remodelling induced by activity of ventral tegmental dopamine neurons[J]. Nature, 2001, 412(6842): 79鈥?3.CrossRef
[20]Z. F. Mainen, T. Sejnowski. Reliability of spike timing in neocortical neurons[J]. Science, 1995, 268(5216): 1503鈥?506.CrossRef
[21]M. C. Ho, Y. C. Hung. Synchronization of two different systems by using generalized active control[J]. Physics Letters A, 2002, 301(5/6):424鈥?28.MATH CrossRef MathSciNet
[22]M. T. Yassen. Chaos synchronization between two different chaotic systems using active control[J]. Chaos, Solitons & Fractals, 2005, 23(1): 131鈥?40.MATH CrossRef MathSciNet - 作者单位:Zhengquan Yang (1)
Zhongxin Liu (1)
Zengqiang Chen (1)
Zhuzhi Yuan (1)
1. Department of Automation, Nankai University, Tianjin, 300071, China - 刊物类别:Control; Systems Theory, Control; Optimization; Computational Intelligence; Complexity; Control, Rob
- 刊物主题:Control; Systems Theory, Control; Optimization; Computational Intelligence; Complexity; Control, Robotics, Mechatronics;
- 出版者:South China University of Technology and Academy of Mathematics and Systems Science, CAS
- ISSN:2198-0942
文摘
In this paper, a new dynamical network model is introduced, in which the nodes of the network are different. It is shown that by the designed controllers, the state of the network can exponentially synchronize onto a homogeneous stationary state. Some criteria are derived and some examples are presented. The numerical simulations coincide with theoretical analysis. Keywords Complex network Synchronization Pinning control Chaos Exponential stable