Feedback Chaotic Synchronization with Disturbances

Mingjun Wang, Wanbo Yu, Jing Zhao
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Abstract

Based on Lyapunov stability theorem, a method is proposed for feedback synchronization with parameters perturbation and external disturbances. It is proved theoretically that if the perturbation and disturbances are bounded, the synchronization error can be ensured to approach to and stay within the pre-specified bound which can be arbitrarily small. Some typical chaotic systems with different types of nonlinearity, such as Lorenz system and the original Chua’s circuit, are used for detailed description. The simulation results show the feasibility of the method.
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具有扰动的反馈混沌同步
基于李雅普诺夫稳定性定理,提出了一种具有参数扰动和外部扰动的反馈同步方法。从理论上证明,如果扰动和扰动是有界的,则可以确保同步误差接近并保持在可以任意小的预定界内。使用了一些具有不同类型非线性的典型混沌系统,如洛伦兹系统和原始蔡氏电路,进行了详细的描述。仿真结果表明了该方法的可行性。
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