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一类参数不确定时滞混沌系统的反同步 被引量:4

Anti-synchronization for a Class of Delayed Chaotic Systems with Uncertain Parameters
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摘要 针对一类不确定时滞混沌系统,基于Lyapunov稳定性理论,结合自适应控制方法,设计了自适应控制器及参数自适应律,证明了控制器和自适应律在参数不确定的情况下可实现时滞混沌系统的反同步,对不确定参数做出识别,并分析了控制调节器Ω的作用.数值仿真结果表明,该方法正确、有效. Based on Lyapunov stability theory and the adaptive control method,the adaptive controllers with corresponding parameter adaptive laws were designed for a class of delayed chaotic systems.The theory result proves that the designed controllers and adaptive law could achieve the anti-synchronization of delayed chaotic systems with uncertain parameters,identifying the uncertain parameters.Numerical simulations show that the method are correctness and effectiveness of the proposed method.Furthermore,we also analyzed the effect of control modulator Ω.
作者 吴晓强 陈彩云 岳立娟
机构地区 东北师范大学物理学院
出处 《吉林大学学报(理学版)》 CAS CSCD 北大核心 2011年第5期922-928,共7页 Journal of Jilin University:Science Edition
基金 国家自然科学基金(批准号:10847110) 吉林省自然科学基金(批准号:201115008)
关键词 时滞混沌系统 反同步 自适应控制方法 不确定参数 delayed chaotic system anti-synchronization adaptive control method uncertain parameters
分类号 O545 [理学—物理]
  • 相关文献

参考文献19

  • 1LI Chuan-dong, LIAO Xiao-feng, Wong K W. Chaotic Lag Synchronization of Coupled Time-Delayed Systems and Its Applications in Secure Communication[J]. Physica D: Nonlinear Phenomena, 2004, 194(3/4) : 187-202.
  • 2Kwok H S, Tang W K S. A Fast hnage Encryption System Based on Chaotic Maps with Finite Precision Represenlalion [J]. Chaos, Solitons & Fractals, 2007, 32(4) : 1518-1529.
  • 3张胜海,苗劲松,杨华.用延时注入-反馈法实现掺铒光纤激光器的混沌同步[J].吉林大学学报(理学版),2006,44(1):83-88. 被引量:3
  • 4LU Jin-hu, ZHOU Tian-shou, ZHANG Suo-chun. Chaos Synchronization between Linearly Coupled Chaotic Systems [J]. Chaos, Solitons & Fractals, 2002, 14(4) : 529-541.
  • 5YIN Xun-he, REN Yong, SHAN Xiu-ming. Synchronization of Discrete Spatiotemporal Chaos by Using Variable Structure Control [ J ]. Chaos, Solitons & Fractals, 2002, 14 (7) : 1077-1082.
  • 6Wang Y W, Guan Z H, Xiao J W. Impulsive Control for Synchronization of a Class of Continuous Systems [ J ]. Chaos, 2004, 14 ( 1 ) : 199-203.
  • 7Ho M C, Hung Y C. Synchronization of Two Different Systems by Using Generalized Active Systems [J]. Phys Lett A, 2002, 301 (5/6) : 424-428.
  • 8樊春霞,姜长生.基于变结构的不确定混沌系统时滞反馈控制[J].吉林大学学报(理学版),2004,42(2):238-241. 被引量:2
  • 9LI Chuan-dong, LIAO Xiao-feng, ZHANG Rong. A Unified Approach for Impulsive Lag Synchronization of Chaotic. Systems with Time Delay [J]. Chaos, Solitons & Fractals, 2005, 23(4) : 1177-1184.
  • 10Kocarev L, Parlitz U. General Approach for Chaotic Synchronization with Applications to Communication [ J]. Phys Rev Lett, 1995, 74(25) : 5028-5031.

二级参考文献21

  • 1OTT E, GREBOGI C, YORKE J. Controlling chaos[J]. Phys Rev Let, 1990,64 ( 11 ) :1196-1199.
  • 2CHEN G,CHEN Y, OGMEN H. Identifying chaotic systems via a Wiener-type cascade model [J]. IEEE Control Systems, 1997,17(5) :29-36.
  • 3POZNYAK AS, YU W,SANCHE E N. Identification and control of unknown chaotic systems via dynamic neural net, works[J]. IEEE Transactions on Circuits and Systems I, 1999,46(12) : 1491-1495.
  • 4WANG Y C,THORP J S, MACDONALD N C. Chaos in MEMS, parameter estimation and its potential application [J]. IEEE Trans-actions on Circuits and Systems I, 1998,45(10) : 1013-1020.
  • 5PARLITZ U. Estimating modal parameters from times series by auto-synchronization[J]. Physical Review Letters, 1996,76 (8) :1232-1235.
  • 6LI X F, LEUNG A C S, Liu X J, et al. Adaptive synchronization of identical chaotic and hyper-chaotic systems with uncertain parameters[J]. Nonlinear Anal,2009,6 : 11-13.
  • 7WANG S Y,CHANG Y X,LI X F et al. Parameter identification for a class of nonlinear chaotic and hyperchaotic flows[J].Nonlinear Anal, 2008,11 : 18-19.
  • 8Ott E, Cerbogi C, Yorke J S. Controlling chaos [J]. Phys Lett A, 1990, 64: 1196-1199.
  • 9Chen G, Dong X. On feedback control of chaotic continuous time systems [J]. IEEE Trans Circuits Sys I, 1993, 40: 591-601.
  • 10Kittel A, Parisi J, Pyragas K. Delayed feedback control of chaos by self-adapted delay time [J]. Phys Lett A, 1995, 198: 433-436.

共引文献4

同被引文献37

  • 1陈志盛,孙克辉,张泰山.Liu混沌系统的非线性反馈同步控制[J].物理学报,2005,54(6):2580-2583. 被引量:77
  • 2王发强,刘崇新.分数阶临界混沌系统及电路实验的研究[J].物理学报,2006,55(8):3922-3927. 被引量:55
  • 3刘扬正,姜长生,林长圣.一类四维混沌系统切换混沌同步[J].物理学报,2007,56(2):707-712. 被引量:22
  • 4王兴元,武相军.基于状态观测器的一类混沌系统的反同步[J].物理学报,2007,56(4):1988-1993. 被引量:14
  • 5刘秉正,彭建华.非线性动力学[M].北京:高等教育出版社,2001.
  • 6ROSENBLUM M G, PIKOVSKY A S, KURTHS J. From phase to lag synchronization in coupled chaotic oscillators [ J ]. Physics Review Letters, 1997, 78 (22) :4193 - 4196.
  • 7MOSSA AL-SAWALHA M, NOORANI M S M. Adaptive anti-Synchronization of two identical and different hyper chaotic systems with uncertain parameters [ J ]. Communications in Nonlinear Science and Numerical Simulation, 2010,15(4) :1036 - 1047.
  • 8PECORA LOUIS M, CARROLL THOMAS L. Synchronization in chaotic systems [ J ]. Physical Review Letters, 1990,64(8) :821 -824.
  • 9PARK JU H. Adaptive Synchronization of rossler system with uncertain parameters [ J ]. Chaos, Solitons and Fractals ,2005,25:333 - 338.
  • 10LIU Bin. Stability of Solutions for Stochastic impulsive systems via comparison approach [ J ]. IEEE Transactions on Automatic Control,2008,53 (9) :2128 - 2133.

引证文献4

二级引证文献2

吉林大学学报(理学版)
2011年 第5期

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