研究了一类离散型加权复杂网络的耦合同步,具有多种结构的混沌系统被看作复杂动力学网络的节点,非线性项被看作耦合函数,基于Lyapunov稳定性理论给出了系统耦合同步的充分条件,数值算例说明了该方法的有效性。%The problem of coupling synchronization of a discrete weighted complex networks is studied in the paper. Chaotic systems with diverse structures are taken as the nodes of the complex dynamical networks ,and the nonlinear terms of the systems are taken as coupling functions. It is proved that complex networks systems is synchronized based on Lyapunov stable theory. Numerical simulations example of chaotic system verify the effectiveness of the proposed method.
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