Abstract
This work concerns the stability of impulsive Cohen-Grossberg neural networks with time-varying delays, reaction-diffusion terms and Dirichlet boundary condition. By the new agencies of Poincare inequality and Gronwall-Bellman-Type impulsive integral inequality, we summarize some new and concise sufficient conditions ensuring the globally exponential stability of the equilibrium point. The proposed criteria depend on the reaction-diffusion coefficients and the regional feature. In conclusion, two examples are illustrated to demonstrate the effectiveness of our obtained results.
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