期刊
EUROPEAN PHYSICAL JOURNAL-SPECIAL TOPICS
卷 223, 期 8, 页码 1519-1529出版社
SPRINGER HEIDELBERG
DOI: 10.1140/epjst/e2014-02114-2
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This paper proposes a eight-term 3-D polynomial chaotic system with three quadratic nonlinearities and describes its properties. The maximal Lyapunov exponent (MLE) of the proposed 3-D chaotic system is obtained as L-1 = 6.5294. Next, new results are derived for the global chaos synchronization of the identical eight-term 3-D chaotic systems with unknown system parameters using adaptive control. Lyapunov stability theory has been applied for establishing the adaptive synchronization results. Numerical simulations are shown using MATLAB to describe the main results derived in this paper.
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