Abstract
Based on the LaSalle invariant principle of stochastic differential delay equations and Wirtinger’s inequality as well as periodically intermittent control and impulsive control schemes, several sufficient conditions ensuring the synchronization of stochastic complex networks with reaction–diffusion and varying delays are obtained. The Wirtinger inequality overcomes the conservatism introduced by the integral inequality used in the previous results. The proposed criterion for synchronization generalizes and improves those reported recently in the literature. Finally, an illustrative example is given to show effectiveness of results.
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