Impulsive synchronisation of a class of fractional-order hyperchaotic systems 被引量：2

Impulsive synchronisation of a class of fractional-order hyperchaotic systems

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摘要 In this paper, an impulsive synchronisation scheme for a class of fractional-order hyperchaotic systems is proposed. The sufficient conditions of a class of integral-order hyperchaotic systems＇ impulsive synchronisation are illustrated. Furthermore, we apply the sufficient conditions to a class of fractional-order hyperchaotic systems and well achieve impulsive synchronisation of these fractional-order hyperchaotic systems, thereby extending the applicable scope of impulsive synchronisation. Numerical simulations further demonstrate the feasibility and effectiveness of the proposed scheme. In this paper, an impulsive synchronisation scheme for a class of fractional-order hyperchaotic systems is proposed. The sufficient conditions of a class of integral-order hyperchaotic systems＇ impulsive synchronisation are illustrated. Furthermore, we apply the sufficient conditions to a class of fractional-order hyperchaotic systems and well achieve impulsive synchronisation of these fractional-order hyperchaotic systems, thereby extending the applicable scope of impulsive synchronisation. Numerical simulations further demonstrate the feasibility and effectiveness of the proposed scheme.

作者王兴元张永雷林达张娜

机构地区 Faculty of Electronic Information and Electrical Engineering

出处《Chinese Physics B》 SCIE EI CAS CSCD 2011年第3期88-94,共7页 中国物理B（英文版）

基金 supported by the National Natural Science Foundation of China (Grant Nos. 60573172 and 60973152) the Doctoral Program Foundation of the Institution of Higher Education of China (Grant No. 20070141014) the Natural Science Foundation of Liaoning Province,China (No. 20082165)

关键词 hyperchaotic systems fractional-order hyperchaotic systems impulsive synchronization hyperchaotic systems, fractional-order hyperchaotic systems, impulsive synchronization

分类号 O415.5 [理学—理论物理] TP273 [自动化与计算机技术—检测技术与自动化装置]

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参考文献22

1Podlubny I 1999 Fractional Differential Equations (New York: Academic Press) p340.
2Hilfer R 2001 Applications of Fractional Calculus in Physics (New Jersey: World Scientific) p463.
3Bagley R L and Calico R A 1991 J. Guid. Control. Dy- ham. 14 304.
4Laskin N 2000 Phys. A 287 482.
5Kusnezov D, Bulgac A and Dang G D 1999 Phys. Rev. Lett. 82 1136.
6Pecora L M and Carroll T L 1990 Phys. Rev. Lett. 64 821.
7Zhang R X and Yang S P 2009 Chin. Phys. B 18 3295.
8Gao M and Cui B T 2009 Chin. Phys. B 18 76.
9Wang Y W, Guan Z H and Wang H O 2003 Phys. Lett. A 312 34.
10Wei Q L, Zhang H G, Liu D R and Zhao Y 2010 Acta Auto. Sin. 36 121.

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1Li C, Peng G. Chaos in Chen system with a fractional order [J]. Chaos Soliton Fractals, 2004,22:443-450.
2Grigorenko I, Grigorenko E. Chaotic dynamics of the fraction- al Lorenz system [J]. Physics Review Letters. 2003,91(3): 034101.
3Li C, Chen G. Chaos and hyperchaos in the frational order Rossler equations []]. Physica A, 2004,341:55- 61.
4Ahamad W M , Sprott J C. Chaos in fractional order autono- mous nonlinear systems [ J]. Chaos Soliton Fractals, 2003, 16:339- 351.
5Carrol T L , Pecora L M. Synchronization in chaotic systems [.l]. Physics Review Letters, 1990,64(8) :821 - 824.
6LI Shi - hua, TIAN Yu- ping. Finite time synchronization of chaotic systems[ J]. Chaos, Solitons Fractals, 2003,15(2) : 303 - 310.
7LU J H, ZHOU T S. Chaos synchronization between linearly coupled chaotic systems[ J]. Chaos, Solitons Fractals, 2002, 14(4) :529- 541.
8Ricardo F. Synchronization of chaotic systems with di. erent order[ J]. Physical Review E, 2002,65 : 0362261 - 7.
9Wang X F. Complex networks: Topology, Dynamics and Synchronization[J]. Int. J. Bifurcation and Chaos,2002,12 (5) :885 - 916.
10Yang X S, Duan C K, Liao X X. A note on mathematicalaspects of drive response type synchronization [J]. Ehaos , Solitons Fraetals, 1999,10(9):1457- 1462.

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Impulsive synchronisation of a class of fractional-order hyperchaotic systems 被引量：2

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