Authors: Miaomiao Yang, Shouming Zhong

Abstract:

This paper studies the problem of asymptotically stability for neural networks with time-varying delays.By establishing a suitable Lyapunov-Krasovskii function and several novel sufficient conditions are obtained to guarantee the asymptotically stability of the considered system. Finally,two numerical examples are given to illustrate the effectiveness of the proposed main results.

Keywords: Neural networks, Lyapunov-Krasovskii, Time-varying delays, Linear matrix inequality.

Digital Object Identifier (DOI): doi.org/10.5281/zenodo.1092128

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References:

[1] S.Arik Daly,An analysis of exponential stability of delayed neural networks with time-varying delays. Neural Networks.17(2004)
[2] H.J.Cho,J.H.Park,Novel delay-dependent robust stability criterion of delayed cellular neural networks,Chaos Solitons Fractals 32(5)(2007) 1194-1200.
[3] H.Gu, H.Jiang, Z.Teng,Existence and global exponential stability of equilibrium of competitive neural networks with different time-scales and multiple delays, J.Franklin Inst. 347(2010)719-731.
[4] Y.He,M.Wu,J.H.She,Delay-dependent exponential stability of delayed neural networks with time-varyingdelays, IEEE Trans. Circuits Syst.II Exp.Briefs 53 (7)(2006)553-557.
[5] Y.He, G.P.Liu, D.Rees, New delay-dependent stability criteria for neutral networks with time-varying delays, IEEE Trans. Neural Netw.18(1)(2007)310-314.
[6] Z.Zuo,C.Yang,Y Wang,A new method for stability analysis of recurrent neural networks with interval time-varying delay,IEEE Trans.Neural Networks 21(2)(2010)339-344.
[7] K.Gu,An integral inequality in the stability problem of time delay systems,in: Proceedings of 39th IEEE Conference Decision Control, (2000) 2805-2810.
[8] P.Park, J.W.Ko, C.Jeong,Reciprocally convex approach to stability of systems with time-varying delays,Automatica 47(1)(2011)235-238.
[9] Y.H.D, S.M.Zhong, Exponential passivity of BAM neural networks with time-varying delays. Applied Mathematics and Computation 221(2013)727-740.
[10] S.Mou, H.Gao, W.Qiang, K.Chen,New delay-dependent exponential stability for neural networks with time delays,IEEE Transactions on Systems, Man,and Cybernetics B 38 (2008)571-576.
[11] Zixin L,J. Y,D. Y. X,Triple-integral method for the stability analysis of delayed neural networks ,Neurocomputing 99(2013) 283-289.
[12] K.Gu,An integral inequality in the stability problem of time delay systems,in: Proceedings of 39th IEEE Conference Decision Control, (2000) 2805-2810.
[13] Miaomiao Yang,S M Zhong,Improved Exponential Stability Analysis for Delayed Recurrent Neural Networks,World Academy of Science, Engineering and Technology International Journal of Mathematical, Computational Science and Engineering Vol:8 No:1, (2014)90-96.
[14] O.M. Kwon, S.M. Lee, JuH. Park, E.J. Cha, New approaches on stability criteria for neural networks with interval time-varying delays, Appl. Math. Comput.218 (19) (2012) 9953-9964
[15] H.Y. Shao, Q.L. Han, New delay-dependent stability criteria for neural networks with two additive time-varying delay components, IEEE Trans. Neural Networks 22 (5) (2011) 812-818.
[16] T Li,X Yang,P Yang,New delay-variation-dependent stability for neural networks with time-varying delay,Neurocomputing 101 (2013) 361-369.
[17] C.C.Hua, C.N.Long, X.P.Guang,New results on stability analysis of neural networks with time-varying delays, Phys. Lett. A 352(2006)335- 340.
[18] O.M.Kwon,J.H.Park,Improved delay-dependent stability criterion for neural networks with time-varying delays,Phys.Lett.A 373(2009)529- 535.
[19] J.Sun, G.P.Liu, J.Chen, D.Ree,Networked predictive control for neural networks with time-varying interval delays,Phys.Lett.A 373(2009)342- 348.
[20] Z.X.Liu,J.Y,D.Y.Xu,Triple-integral method for the stability analysis of delayed neural networks,Neurocomputing 99 (2013)283-289.