混沌系统的同步控制研究
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摘要
混沌是一种不规则的复杂运动形式,广泛地存在于各个领域。由于混沌运动表现出的对初值的极端敏感性、高度随机性以及非线性方程的确定性,使得它一直受到人们的广泛关注。混沌同步作为混沌研究的重要方向,在保密通讯、图像处理等应用方面取得了可喜的进展。本文的主要研究内容如下:
(1)对Liu混沌系统的同步方法进行了研究,分别构造了Liu系统在无干扰和有干扰下的同步观测器。首先采用简单的线性反馈实现了Liu系统的同步;接着针对无扰动和有扰动的情况,分别提出了一种Liu系统的同步观测器;然后实现了含有未知参数的Liu系统自适应同步;最后提出了Liu系统的一种变结构Backstepping同步方法。
(2)分析了一个新的Qi系统的结构特性,提出了Qi系统的两种线性反馈同步方法和参数未知时的自适应同步方法。在分析了Qi系统的结构特点的基础上,提出了Qi系统的单变量驱动同步方法;提出了Qi系统的两种线性反馈方法,并进行了对比分析;最后提出了Qi系统参数不确定的自适应同步方法。
(3)异结构混沌系统的同步研究。基于追踪控制理论,实现了Liu系统与统一混沌系统的追踪同步;采用改进的自适应同步方法实现了Qi系统和统一系统的同步;最后将上述两种方法拓展到超混沌系统。
Chaos is an irregular complicated dynamical behavior, which is ubiquitous in everyfield. In virtue of its characteristics such as sensitivity to initial values, high randomicityand certainty to nonlinear equations, chaos attracts great attention of people. Chaoticsynchronization is an important research aspect in chaotic science, which has receivedrapidly development in the application of secure communications and image processing.The main contributions of this paper are list as follows:
(1) Synchronization study of Liu chaotic system. For the Liu systems withdisturbance or non-disturbance, two state observers are constructed respectively. Firstly,carries out synchronization of Liu System successfully with simple linear feedback. Thentwo kinds of state observer synchronization approaches are proposed to the Liu systemswith disturbance or non-disturbance. And then an adaptive synchronization approache isproposed to the Liu systems with unknown parameters. Finally backsteppingsynchronization method is put forward to Liu system with uncertain parameters.
(2) The structure Characteristics of the new-proposed Qi chaotic system are analyzed,and two kinds of linear feedback synchronization are presented. After analyzing thestructure characteristics of the new Qi chaotic system, synchronization methods of Qisystem such as the single variable drive synchronization method and two kinds of linearfeedback synchronization methods are presented. Then an adaptive synchronizationapproache is proposed to the Qi systems with unknown parameters.
(3) Study for chaotic synchronization with diverse structures. Based on the theory oftracking control, a tracking synchronization approache is put forward to synchrize Liusystem and unified chaotic system. Then a modified adaptive synchronization method ofQi system and unified chaotic system is presented. Then the two differentsynchronization approaches are extended to hyperchaotic systems.
(1)对Liu混沌系统的同步方法进行了研究,分别构造了Liu系统在无干扰和有干扰下的同步观测器。首先采用简单的线性反馈实现了Liu系统的同步;接着针对无扰动和有扰动的情况,分别提出了一种Liu系统的同步观测器;然后实现了含有未知参数的Liu系统自适应同步;最后提出了Liu系统的一种变结构Backstepping同步方法。
(2)分析了一个新的Qi系统的结构特性,提出了Qi系统的两种线性反馈同步方法和参数未知时的自适应同步方法。在分析了Qi系统的结构特点的基础上,提出了Qi系统的单变量驱动同步方法;提出了Qi系统的两种线性反馈方法,并进行了对比分析;最后提出了Qi系统参数不确定的自适应同步方法。
(3)异结构混沌系统的同步研究。基于追踪控制理论,实现了Liu系统与统一混沌系统的追踪同步;采用改进的自适应同步方法实现了Qi系统和统一系统的同步;最后将上述两种方法拓展到超混沌系统。
Chaos is an irregular complicated dynamical behavior, which is ubiquitous in everyfield. In virtue of its characteristics such as sensitivity to initial values, high randomicityand certainty to nonlinear equations, chaos attracts great attention of people. Chaoticsynchronization is an important research aspect in chaotic science, which has receivedrapidly development in the application of secure communications and image processing.The main contributions of this paper are list as follows:
(1) Synchronization study of Liu chaotic system. For the Liu systems withdisturbance or non-disturbance, two state observers are constructed respectively. Firstly,carries out synchronization of Liu System successfully with simple linear feedback. Thentwo kinds of state observer synchronization approaches are proposed to the Liu systemswith disturbance or non-disturbance. And then an adaptive synchronization approache isproposed to the Liu systems with unknown parameters. Finally backsteppingsynchronization method is put forward to Liu system with uncertain parameters.
(2) The structure Characteristics of the new-proposed Qi chaotic system are analyzed,and two kinds of linear feedback synchronization are presented. After analyzing thestructure characteristics of the new Qi chaotic system, synchronization methods of Qisystem such as the single variable drive synchronization method and two kinds of linearfeedback synchronization methods are presented. Then an adaptive synchronizationapproache is proposed to the Qi systems with unknown parameters.
(3) Study for chaotic synchronization with diverse structures. Based on the theory oftracking control, a tracking synchronization approache is put forward to synchrize Liusystem and unified chaotic system. Then a modified adaptive synchronization method ofQi system and unified chaotic system is presented. Then the two differentsynchronization approaches are extended to hyperchaotic systems.
引文
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[2] Pccora L M, Carroll T L. Synchronization in chaotic systems. Physical Review Letters, 1990, 64(8): 821~823.
[3] Pccora L M, Carroll T L, Johnson G A et al. Fundamentals of synchronization in chaotic systems, concepts, and applications. Chaos, 1997, 7(4): 520~543.
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[5] Feigenbaum M J. Quantitative universality for a class of nonlinear transformations. J. Stat. Phys, 1978, 19: 25~52.
[6] Wang Fa Qiang and Liu Chong-Xin. Hyperchaos evolved from the Liu chaotic system. Chinese Physics, 15(5): 863~968.
[7] Anddevsky B. Adaptive synchronization methods for signal transmission on chaotic carriers. Mathematics and Computers in Simulation, 2002, 58(4): 285~293.
[8] Xiao Song Yang. Concepts of synchronization in dynamical systems. Physics Letters A, 1999, 26: 340~344.
[9] Liu C X, Liu T, Liu L. A new chaotic attractor. Chaos Solitons &Fractals, 2004, 22: 1031~1038.
[10] 吴先用,张红民,李涛.一种基于混沌同步的保密通信方案的设计.长江大学学报(自然版),2006,3(4):70~72
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[12] Wang Fa-Qiang and Liu Chong-Xin. Hyperchaos evolved from the Liu chaotic system. Chinese Physics, 2006, 15(5): 963~968.
[13] 王发强,刘崇新.Liu混沌系统的混沌分析及电路实验的研究.物理学报,2006.10,55(10):5061~5069.
[14] 高铁杠,陈增强,顾巧论等.基于观测器的混沌系统的同步研究.物理学报,2004,53(5):1305~1308.
[15] 陈晶,张天平.一类不确定混沌系统的观测器同步.物理学报,2006,55(8):3928~3932.
[16] 刘振泽,田彦涛,宋彦.基于线性耦合下混沌系统的同步条件.物理学报,2006,55(8):3945~3949.
[17] Sarasola C et al. Cost of synchronizing different chaotic systems. Mathematics and Computers in Simulation, 2002, 292(6): 320~324.
[18] Yang X S, Chert G. Some observer-based criteria for discrete-time generalized chaos synchronization. Chaos Solitons &Fractals, 2002, 13(6): 1303~1308.
[19] Chen S, Yang Q, Wang C. Impulsive control and synchronization of unified chaotic system. Chaos Solitons & Fractals, 2004, 20: 751~758.
[20] Feng L, Yong R., Shan X, et al. A linear feedback synchronization theorem for a class of chaotic systems. Chaos Solitons &Fractals, 2002, 13(4): 723~730.
[21] 厉小润,赵辽英,赵光宙.参数不确定混沌系统的自适应同步.浙江大学学报(工学版),2005,39(12):1993~1997.
[22] 陈汉友.Matlab在数字信号处理的应用.计算机与现代化,2004,1:103~105.
[23] 张学仪,李殿璞,陈实如.基于状态观测器的超混沌系统高精度同步方法.电路与系统学报,2001,6(4):15~18.
[24] 王学弟,田立新,许刚.基于参数识别应用Backstepping design控制Lv's混沌吸引子.江苏大学学报(自然科学版),2003,24(2):83~86.
[25] 胡爱花,李芳,徐振源.基于鲁棒控制的不确定性混沌系统的同步化.信息与控制,2005,34(5):631~635.
[26] 陈爱敏,陆君安,吴运卿.Liu系统的自反馈控制和采样数据反馈控制.物理学报,2006,39(2):72~74.
[27] 王兴元,武相军.基于状态观测器的一类混沌系统的反同步.物理学报,2007,56(4):1988~1993.
[28] 李国辉.基于观测器的混沌广义同步解析设计.物理学报,2004,53(4):999~1002
[29] 周平.一类3维连续混沌系统观测器.物理学报,2003,52(5):1108~1111.
[30] 李洪涛,郝士琦,王磊.连续混沌系统的自适应同步控制方法.电光与控制,2006,13(5):27~30.
[31] 谌龙,王德石.陈氏混沌系统的非反馈控制.物理学报,2007,56(1):91~94.
[32] 王繁珍,齐国元.一个新的三维混沌系统地分析、电路实现及同步.物理学报,2006,55(8):4005~1012.
[33] 张宇辉,齐国元,刘文良,阎彦.一个新的四维混沌系统理论分析与电路实现.物理学报,55(7):3307~3314.
[34] 关新平等.对一类具有随机扰动的混沌系统同步的新方法.电子学报,2001,29(10):1438~1440.
[35] 王杰智,陈增强,袁著祉.一个新的混沌系统及其性质研究.物理学报,2006, 55(8):3956~3963.
[36] 何宴辉,范正平,关新平.一类混沌系统基于观测器的鲁棒M-c同步控制.控制与决策年会论文集,2002,65~69.
[37] 王发强,刘崇新.Liu混沌系统的线性反馈同步控制及电路试验的研究.物理学报,2006,55(10):5055~5060.
[38] 关新平,范正平,陈彩莲,华长春.混沌控制及其在保密通信中的应用,北京:国防工业出版社,2002.
[39] 黄丽莲,王茂,冯汝鹏.参数不确定混沌系统的反步变结构控制.系统工程与电子技术,2005,27(4):704~707
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