Generalized chaos synchronization of a weighted complex network with different nodes 被引量：10

Generalized chaos synchronization of a weighted complex network with different nodes

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摘要 This paper proposes a method of realizing generalized chaos synchronization of a weighted complex network with different nodes. Chaotic systems with diverse structures are taken as the nodes of the complex dynamical network, the nonlinear terms of the systems are taken as coupling functions, and the relations among the nodes are built through weighted connections. The structure of the coupling functions between the connected nodes is obtained based on Lyapunov stability theory. A complex network with nodes of Lorenz system, Coullet system, RSssler system and the New system is taken as an example for simulation study and the results show that generalized chaos synchronization exists in the whole weighted complex network with different nodes when the coupling strength among the nodes is given with any weight value. The method can be used in realizing generalized chaos synchronization of a weighted complex network with different nodes. Furthermore, both the weight value of the coupling strength among the nodes and the number of the nodes have no effect on the stability of synchronization in the whole complex network. This paper proposes a method of realizing generalized chaos synchronization of a weighted complex network with different nodes. Chaotic systems with diverse structures are taken as the nodes of the complex dynamical network, the nonlinear terms of the systems are taken as coupling functions, and the relations among the nodes are built through weighted connections. The structure of the coupling functions between the connected nodes is obtained based on Lyapunov stability theory. A complex network with nodes of Lorenz system, Coullet system, RSssler system and the New system is taken as an example for simulation study and the results show that generalized chaos synchronization exists in the whole weighted complex network with different nodes when the coupling strength among the nodes is given with any weight value. The method can be used in realizing generalized chaos synchronization of a weighted complex network with different nodes. Furthermore, both the weight value of the coupling strength among the nodes and the number of the nodes have no effect on the stability of synchronization in the whole complex network.

作者吕翎李钢郭丽孟乐邹家蕊杨明

机构地区 College of Physics and Electronic Technology

出处《Chinese Physics B》 SCIE EI CAS CSCD 2010年第8期177-183,共7页 中国物理B（英文版）

基金 Project supported by the Natural Science Foundation of Liaoning Province,China(Grant No.20082147) the Innovative Team Program of Liaoning Educational Committee,China(Grant No.2008T108)

关键词 chaos synchronization weighted network diverse structure Lyapunov stability theory chaos synchronization, weighted network, diverse structure, Lyapunov stability theory

分类号 O415.5 [理学—理论物理] O231 [理学—运筹学与控制论]

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参考文献28

1Newman M E J, Strogatz S H and Watts D J 2001 Phys. Rev. E 64 26118.
2Watts D J and Strogatz S H 1998 Nature 393 440.
3Albert R, Jeong H and Barabasi A L 1999 Nature 401 130.
4Adamic L A and Huberman B A 2000 Science 287 2115.
5Ravasz E and Barabasi A L 2003 Phys. Rev. E 67 26112.
6Pan Z F and Wang X F 2006 Acta Phys. Sin. 55 4058 (in Chinese).
7Xu D, Li X and Wang X F 2007 Acta Phys. Sin. 56 1313 (in Chinese).
8Zhang Q Z and Li Z K 2009 Chin. Phys. B 18 2176.
9Meng C F, ChenY H and Peng Y H 2009 Chin. Phys. B 18 2194.
10Guo J L 2008 Acta Phys. Sin. 57 756 (in Chinese).

同被引文献56

1姚利娜,高金峰,廖旎焕.实现混沌系统同步的非线性状态观测器方法[J].物理学报,2006,55(1):35-41. 被引量：32
2GASSARA H, EI HAJJAJI A, CHAABANE M. Observer-based Robust Reliable Control for Uncertain T-S Fuzzy Systems with State Time Delay [J]. IEEE Transaction on Fuzzy Systems, 2010, 18(6): 1027-1040.
3NIU Y, HOD W C. Robust Observer Design for Ito Stochastic Time-delay Systems Via Sliding Mode Control [ J ]. Systems Control Letters, 2006, 55 (10): 781-793.
4MEI J, JIANG M H, WANG J. Finite-time Structure Identification and Synchronization of Drive-response Systems with Uncertain Parameter [J]. Commun Nonlinear Sci Numer Simulat, 2013( 18): 999-1015.
5WATI'S D J, STROGATZ S H. Collective Dynamics of Small World Networks [J]- Nature, 1998, 393 (4): 440-442.
6NEWMAN M E J, WATTS D J. Scaling and Percolation in the Small-world Network Model [J]. Phys Rev, 1999, 60: 7332-7342.
7李文林,宋运忠.不确定非线性系统混沌反控制[J].物理学报,2008,57(1):51-55. 被引量：7
8LI Hua-qing,LIAO Xiao-eng,HUANG Ting-wen,et al.Event-triggering sampling based leader-following consensus in second-order multi-agent systems[J].IEEE Transactions on Automatic Control,2015,60(7):174-182.
9LI Hua-qing,LIAO Xiao-eng,CHEN Guo,et al.Event-Triggered Asynchronous Intermittent Communication Strategy For Synchronization In Complex Networks[J].Neural Networks,2015,66(6):1-10.
10朱琳,沈艳军.一类不确定线性离散系统有限时间观测器设计[J].电机与控制学报,2008,12(1):99-103. 被引量：5

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1毛北行,董建伟.一类混沌系统的函数矩阵投影同步[J].经济数学,2015,32(1):103-105. 被引量：5
2常娟,李亮,毛北行.一类小世界振子网络的滑模控制混沌同步[J].新乡学院学报,2015,32(3):4-6.
3毛北行,王东晓.一类复杂网络系统的有限时间混沌同步[J].华中师范大学学报（自然科学版）,2015,49(4):538-540. 被引量：3
4王战伟,张伟,毛北行.一类离散型加权复杂网络的耦合同步[J].河南科学,2015,33(9):1479-1481.
5孟晓玲,李庆宾,毛北行.复杂网络混沌系统的非线性观测器同步[J].陕西理工学院学报（自然科学版）,2016,32(1):89-92. 被引量：2
6毛北行,程春蕊.分数阶复杂网络系统的混沌同步研究[J].郑州轻工业学院学报（自然科学版）,2015,30(5):134-137.
7毛北行,程春蕊.一类分数阶小世界网络系统的滑模控制混沌同步[J].重庆师范大学学报（自然科学版）,2016,33(2):57-61. 被引量：1
8毛北行,王东晓.分数阶Van der pol振子网络的混沌同步[J].华中师范大学学报（自然科学版）,2016,50(2):202-205. 被引量：12
9毛北行,王东晓.两类高阶系统的完全同步问题[J].安徽大学学报（自然科学版）,2016,40(6):5-9. 被引量：1
10周长芹,张伟,毛北行.分数阶经济模型的终端滑模控制混沌同步[J].河南科学,2017,35(4):509-512.

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1王晓东,毛北行.基于积分滑模方法的一个新型分数阶指数混沌系统的同步[J].数学的实践与认识,2020,0(1):223-228.
2毛北行,张玉霞.一类分数阶金融系统的混沌同步[J].经济数学,2015,32(2):107-110. 被引量：15
3李亮,常娟,毛北行.两类光学二次谐波系统的复混沌同步[J].陕西理工学院学报（自然科学版）,2016,32(3):87-92. 被引量：1
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5蔡雪莲,周磊.基于事件触发采样的混沌系统同步算法[J].高师理科学刊,2016,36(10):32-35.
6张伟,李庆宾.两类经济系统的滑模同步[J].新乡学院学报,2017,34(3):11-13.
7刘文,常艳娜,赵静一,王永凯,王娜.一个三维混沌系统的错位跟踪同步[J].内蒙古农业大学学报（自然科学版）,2017,38(1):70-74. 被引量：3
8程春蕊,李庆宾,毛北行.一类分数阶系统的有限时间混沌同步[J].轻工学报,2017,32(4):100-104.
9孟雷.网络保密通信中的有限时间同步控制理论研究[J].现代电子技术,2018,41(5):47-50. 被引量：3
10毛北行,周长芹.分数阶不确定Duffling混沌系统的终端滑模同步[J].东北师大学报（自然科学版）,2018,50(2):47-50. 被引量：21

1胡爱花,徐振源,过榴晓.Hlder continuity of generalized chaos synchronization in complex networks[J].Chinese Physics B,2011,20(9):123-131.
2贾飞蕾,徐伟,都林.参数未知的不同阶数混沌系统广义同步及参数估计[J].物理学报,2007,56(10):5640-5647. 被引量：9
3陈良,陆君安.Synchronization of Complex Network with Drivingly Coupled Scheme[J].Chinese Physics Letters,2007,24(7):1853-1856. 被引量：1
4刘晓君,李险峰,何万生,杨丽新.二维三次方离散系统的混沌控制与广义混沌同步[J].河北师范大学学报（自然科学版）,2010,34(4):406-410. 被引量：2
5XU Guang-Li (School of Mathematics and System Sciences,Taishan University,Tai’an Shandong,271021,China).Global Chaos Synchronization Between Two New Different Chaotic Systems Via Active Control[J].科技信息,2009(29):260-261.
6王琳,赵明,彭建华.广义混沌同步系统的电路实验[J].东北师大学报（自然科学版）,2005,37(1):57-62. 被引量：3
7刘福才,宋佳秋.一类参数不确定混沌系统的广义同步[J].动力学与控制学报,2008,6(2):130-133. 被引量：3
8吴天碧,蒲国胜,李庆绩.螺旋线慢波结构变节距段阻抗和耦合函数变化规律的研究[J].真空电子技术,1989,2(3):24-27.
9赵明,王琳,彭建华.构造广义混沌同步系统的一种方法[J].东北师大学报（自然科学版）,2004,36(2):20-26. 被引量：6
10邹冈,吴正国.开关电容网络的广义节点故障诊断及可诊断性[J].电子科学学刊,1991,13(3):304-307.

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Generalized chaos synchronization of a weighted complex network with different nodes 被引量：10

参考文献28

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