Stability Criteria for Neural Networks with Two Additive Time-varying Delay Components
Authors: Qingqing Wang, Shouming Zhong
Abstract:
This paper is concerned with the stability problem with two additive time-varying delay components. By choosing one augmented Lyapunov-Krasovskii functional, using some new zero equalities, and combining linear matrix inequalities (LMI) techniques, two new sufficient criteria ensuring the global stability asymptotic stability of DNNs is obtained. These stability criteria are present in terms of linear matrix inequalities and can be easily checked. Finally, some examples are showed to demonstrate the effectiveness and less conservatism of the proposed method.
Keywords: Neural networks, Globally asymptotic stability, LMI approach, Additive time-varying delays.
Digital Object Identifier (DOI): doi.org/10.5281/zenodo.1337481
Procedia APA BibTeX Chicago EndNote Harvard JSON MLA RIS XML ISO 690 PDF Downloads 1569References:
[1] T.L. Liao, F.C. Wang, Global stability for cellular neural networks with time delay, IEEE Trans, Neural Networks 11(6)(2000)1481-1484.
[2] S.Arik, Global asymptotic stability of a larger class of neural networks with constant time delay, Phys. Lett. A 311(2002)504-511.
[3] T. Chen, L Rong. Delay-independent stability analysis of Cohen- Grossberg neural networks, Phys. Lett. A 317(2003)436-499.
[4] J.H.Park,O.M.Kwon,Further results on state estimation for neural networks of neutral-type with time-varying delay,App. Math. Comput. 208(2009) 69-57.
[5] Chen Y,Wu Y.Novel delay-dependent stability criteria of neural networks with time-varying delay.Neurocomputing 2009;72:1065-70.
[6] P.L.Liu,Improved delay-dependent robust stability creteria for recurrent neural networks with time-varying delays,ISA Transactions,52 (2013)30- 35.
[7] Kwon OM,Park JH,Improved delayed-dependent stability criteria for neural networks with time-varying delays.Physics Letters A 2009;373:528-35.
[8] Tian J K,Zhong S M.Improved delay-dependent stability criterion for neural networks with time-varying delay.Applied Mathematics and Computation 2011;217:10278-88.
[9] X. Liu, C. Dang, Stability analysis of positive switched linear systems with delays, IEEE Trans. Autom. Control 56(2011) 1684-1690.
[10] O.M. Kwon, J.H. Park, Delay-dependent stability for uncertain cellular neural networks with discrete and distribute time-varying delays,J.Franklin Inst. 345(2008) 766-778.
[11] X. Liu, Y. Wang, Delay-dependent exponential stability for neural networks with time-varying delays, Phys. Lett. A 373(2009) 4066-4027.
[12] P.G. Park, J.W. Ko, C. Jeong, Reciprocally convex approach to stability of systems with time-varying delays, Automatica 47(2011) 235-238.
[13] S.M. Lee, O.M. Kwon, J.H. Park, A novel delay-dependent criterion for delayed neural networks of neutral type, Phys. Lett. A 374(2010) 1843-1848.
[14] J.H. Park, O.M. Kwon, Synchronization of neural networks of neutral type with stochastic perurbation, Mod. Phys. Lett. B 23(2009) 1743- 1751.
[15] K.Gu,A further refinement of discretized Lyapunov functional method for the stability of time-vary systems,Int.J.Control 74(2001)967-976.
[16] S.Lakshmanan, Ju.H. Park, D.H.Ji, H.Y.Jung, G.Nagamani,State estimation of neural networks with time-varying delays and Markovian jumping parameter based on passivity theory, Nonlinear Dyn. 70(2012) 1421-1434.
[17] J. Chen,H. Zhu,S.M. Zhong, G.H. Li, Novel delay-dependent robust stability criteria for neutral systems with mixed time-varying delays and nonlinear perturbations, Appl. Math. Comput. 219(2013) 7741-7753.
[18] D.Yue, C. Peng, G. Y. Tang, Guaranteed cost control of linear systems over networks with state and input quantizations, IEE Proc. Control Theory Appl. 153 (6) (2006) 658-664.
[19] Q. Song, Z. Wang,Neural networks with discrete and distributed time-varying delays:a general stability analysis, Chaos Solitons Fract. 37(2008) 1538-1547.
[20] C.Lien,L.Chung, Global asymptotic stability for cellular neural networks with discrete and distributed time-varying delays, Chaos Solitons Fract 34(2007) 1213-1219.
[21] S. Cui, T. Zhao, J. Guo, Global robust exponential stability for interval neural networks with delay, Chaos Solitons Fractals 42 (3) (2009) 1567C1576.
[22] D. Lin, X. Wang, Self-organizing adaptive fuzzy neural control for the synchronization of uncertain chaotic systems with random-varying parameters, Neurocomputing 74 (12C13) (2011) 2241C2249.
[23] C.Lin, Q.G.Wang,T.H.Lee, A less conservative robust stability test for linear uncertain time-delay systems, IEEE Trans. Automat. Control 51(2006)87-91.
[24] K.Gu, V.L.Kharitonov, J.Chen, Stability of Time-Delay System, Birkhauser, Boston, 2003.
[25] J.L. Wang, H.N. Wu, Robust stability and robust passivity of parabolic complex networks with parametric uncertainties and time-varying delays, Neurocomputing 87 (2012) 26C32.
[26] Y.Zhao, H.Gao, S.Mou,Asympotic stability of neural networks with successive time delay components, Neurocomputing 71(2008)2848- 2856.
[27] H.Shao, Q.Han, New delay-dependent stability criteria for neural networks with two additive time-varying delay components, IEEETrans. Neural Networks 22(2011)812C818.
[28] J.K.Tian, S.M. Zhong, Improved delay-dependent stability criteria for neural networks with two additive time-varying delay components, Neurocomputing 77(2012)114C119.
[29] K.Gu, Integral inequality in the stability problem of time-delay systems, in: Proceedings of the 39th IEEE Conference on Decsion and Control, Sydney, Australia, 2000.
[30] R.E.Skeiton, T.lwasaki, K.M. Grigoradis, A Unified Algebraic Approach to Linear Control Design, Taylor and Francis, New York, 1997.
[31] Y.He, G.P.Liu, D.Rees, New delay-dependent stability criteria for neural networks with time-varying delay, IEEE Trans. Neural Networks 18(1)(2007)310-314.