[1] L. Zhou and G. Hu, Global exponential periodicity and stability of cellular neural networks
with variable and distributed delays, AppliedMathematics and Computation, 195,
402-411. 2008.
[2] T. Li and S. Fei, Stability analysis of Cohen-Grossberg neural networks with time-varying
and distributed delays, Neurocomputing, 71, 1069-1081. 2008.
[3] Q. Zhang, X. Wei, and J. Xu, Delay-dependent exponential stability criteria for nonautonomous
cellular neural networks with time-varying delays, Chaos, Solitons and
Fractals, 36, 985-990. 2008.
[4] W. Zhao, Dynamics of Cohen-Grossberg neural network with variable coefficients and
time-varying delays, Nonlinear Analysis: Real World Applications, 9, 1024-1037. 2008.
[5] W. Xiong, Q. Zhou, B. Xiao, and Y. Yu, Global exponential stability of cellular neural
networks with mixed delays and impulses, Chaos, Solitons and Fractals, 34, 896-902.
2007.
[6] Z. Huang, Q. Yang, and X. Luo, Exponential stability of impulsive neural networks with
time-varying delays, Chaos, Solitons and Fractals, 35, 770-780. 2008.
[7] S. Long and D. Xu, Delay-dependent stability analysis for impulsive neural networks
with time-varying delays, Neurocomputing, 71, 1705-1713. 2008.
[8] H. Wu and X. Xue, Stability analysis for neural networks with inverse Lipschitzian neuron
activations and impulses, Applied Mathematical Modelling, 32, 2347-2359. 2008.
[9] Q. Song and J. Zhang, Global exponential stability of impulsive Cohen-Grossberg neural
network with time-varying delays, Nonlinear Analysis: Real World Applications, 9, 500-
510. 2008.
[10] S. Ahmada and I. Stamov, Global exponential stability for impulsive cellular neural networks
with time-varying delays, Nonlinear Analysis, 69, 786-795. 2008.
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