Globally Exponential Stability for Hopfield Neural Networks with Delays and Impulsive Perturbations
Authors: Adnene Arbi, Chaouki Aouiti, Abderrahmane Touati
Abstract:
In this paper, we consider the global exponential stability of the equilibrium point of Hopfield neural networks with delays and impulsive perturbation. Some new exponential stability criteria of the system are derived by using the Lyapunov functional method and the linear matrix inequality approach for estimating the upper bound of the derivative of Lyapunov functional. Finally, we illustrate two numerical examples showing the effectiveness of our theoretical results.
Keywords: Hopfield Neural Networks, Exponential stability.
Digital Object Identifier (DOI): doi.org/10.5281/zenodo.1060529
Procedia APA BibTeX Chicago EndNote Harvard JSON MLA RIS XML ISO 690 PDF Downloads 2353References:
[1] Y.Zhang, S.M.Zhong, Z.L.Li, Periodic solutions and stability of hopfield neural natworks with variable delays. International Journal of Systems Science 27 (1996)895-901.
[2] X.X.Liao, D.M.Xiao, Global attractivity in delayed hopfield neural networks with time-varying delays. Acta Electronica Sinica 28 (2000)87-90.
[3] X.F.Liao, K.W.Wong, et al., Novel robust stability criteria for intervaldelayed hopfield neural networks. IEEE Transactions on Circuits and Systems I 48(2001)1355-1359.
[4] J.G.Peng, H.Qiao, Z.B.Xu, A new approach to stability of neural networks with time-varying delays. Neural Networks 15(2002)95-103.
[5] Vimal Singh, On global robust stability of interval Hopfield neural networks with delays.Chaos Solitons and Fractals 33(2007)1183-1188.
[6] H.Huang, J.Cao, On global asymptotic stability of recurrent neural networks with time-varying delays. Applied Mathematics and Computation 142(2003)143-154.
[7] Q.Zhang, X.W.J.Xu, Delay-dependent global stability results for delayed Hopfield neural networks. Chaos Solitons and Fractals 34(2007) 662-668.
[8] B.Liu, Almost periodic solutions for Hopfield neural networks with continuously distributed delays. Mathematics and Computers in Simulation 73(2007)327-335.
[9] J.Zhou, L.Xiang, Z.Liu, Synchronization in complex delayed dynamical networks with impulsive effects. Physica A 384(2007)684-692.
[10] Y.Zhang, J.Sun, Stability of impulsive neural networks with time delays. Physica A 384(2005)44-50.
[11] Z.Chen, J.Ruan, Global stability analysis of impulsive Cohen-Grossberg neural networks with delay. Physica A 345(2005)101-111.
[12] H.Xiang, K.M.Yan, B.Y.Wang, Existence and global exponential stability of periodic solution for delayed high-order Hopfield-type neural networks. Physica A 352(2006)341-349.
[13] Q.Zhang, XWei, J.Xu, Delay-dependent global stability condition for delayed Hopfield neural networks. Nonlinear Analysis 8(2007)997.
[14] X.L.Fu, B.Q.Yan, Y.S.Liu, Introduction of Impulsive Differential Systems, Science Press, Beijing, 2005.
[15] X.Li, Z.Chen, Stability properties for Hopfield Neural Networks with delays and impulsive perturbations. Nonlinear Analysis : Real World Applications 10(2009)3253-3265.
[16] G.Zong, J.Liu, New Delay-dependent Global Asymptotic Stability Condition for Hopfield Neural Networks with Time-varying Delays. International Journal of Automation and Computing, (2009)415-419.
[17] X.Liao, G.Chen, E.Sanchez, LMI approach for global periodicity of neural networks with time-varying delays. IEEE Transactions on Circuits Syst I 49(2002)1033.
[18] S.Long, D.Xu, Delay-dependent stability analysis for impulsive neural networks with time varying delays. Neurocomputing 71(2008)1705-1713.
[19] H.Zhang, G.Wang New criteria of global exponential stability for a class of generalized neural networks with time-varying delays. Neurocomputing 70(2007) 2486-2494.
[20] L.Xuemei, H.Lihong and W.Jianhong, A new method of Lyapunov functionals for delayed cellular neural networks. IEEE Trans. Circuits Syst.I Regul.Pap51(2004), no.11, 2263-2270.
[21] S.Arik, V.Tavsanoglu, On the global asymptotic stability of delayed cellular neural networks. IEEE Trans. Circuits Syst. I 47 (4)(2000)571- 574.
[22] J.D.Cao, Global stability conditions for delayed CNNs. IEEE Trans. Circuits Syst. I 48 (11)(2001)1330-1333.
[23] T.L.Liao, F.C.Wang Global stability condition for cellular neural networks with delay. IEEE Electron. Lett.35 (1999)1347-1349.
[24] T.L.Liao, F.C.Wang, Global stability for cellular neural networks with time delay. IEEE Trans. Neural Networks 11 (2000)1481-1484.
[25] Q.Zhang, X.Wei, J.Xu, Delay-dependent exponential stability of cellular neural networks with time-varying delays. Chaos Solitons Fractals 23(2005)1363-1369.