Abstract
In this paper, the robust asymptotical stability is investigated for a class of interval neutral systems. Based on Lyapunov stable theory, the delay-dependent criteria are derived to ensure the global, robust, asymptotical stability of the addressed system. The criteria can be checked easily by LMI control toolbox in Matlab. A numeric example is given to illustrate the effectiveness and improvement over some existing results.
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References
Chen, W.H., Zheng, W.X.: Delay-dependent robust stabilization for uncertain neutral systems with distributed delays. Automatica 43, 95–104 (2007)
Gu, K., Kharitonov, V., Chen, J.: Stability of time-delay systems. Birkhäuser, Boston (2003)
Han, Q.L.: A descriptor system approach to robust stability of uncertain neutral systems with discrete and distributed delays. Automatica 40, 1791–1796 (2005)
Han, Q.L.: Absolute stability of time-delay systems with sector-bounded nonlinearity. Automatica 41, 2171–2176 (2005)
Han, Q.L., Yue, D.: Absolute stability of Lur’e systems with time-varying delay. IET Control Theory and Applications 1, 854–859 (2007)
He, Y., Wu, M.: On delay-dependent robust stability for uncertain neutral systems. Journal of Systems Engineering and Electronics (16), 351–355 (2005)
He, Y., Wang, Q.G., Xie, L.H., Lin, C.: Further improvement of free-weighting matrices technique for systems with time-varying delay. IEEE Trans. Automat. Control 52, 293–299 (2007)
Li, C.D., Chen, J.Y., Huang, T.W.: A new criterion for global robust stability of interval neural networks with discrete time delays. Chaos, Solitons and Fractals 31, 561–570 (2007)
Li, H., Zhong, S.M., Li, H.B.: Some new simple stability criteria of linear neutral systems with a single delay. Journal of Computational and Applied Mathematics (200), 441–447 (2007)
Li, X.G., Zhu, X.J., Cela, A., Ream, A.: Stability analysis of neutral systems with mixed delays. Automatica 44, 2968–2972 (2008)
Liu, L.P., Han, Z.Z., Li, W.L.: Global stability analysis of interval neural networks with discrete and distributed delays of neutral type. Expert Systems with Applications 36, 7328–7331 (2009)
Park, J.H.: Simple Criterion for Asymptotic Stability of Ititerval Neutral Delay-Differential Systems. Applied Mathematics Letters 16, 1063–1068 (2003)
Singh, V.: On global robust stability of interval Hopfield neural networks with delay. Chaos, Solitons & Fractals 33, 1183–1188 (2007)
Song, Q., Cao, J.: Global robust stability of interval neural networks with multiple time-varying delays. Mathematics and Computers in Simulation 74, 38–46 (2007)
Yan, J.J., Hung, M.L., Liao, T.L.: An EP algorithm for stability analysis of interval neutral delay-differential systems. Expert Systems with Applications 34, 920–924 (2008)
Zhang, J.: Global exponential stability of interval neural networks with variable delays. Applied Mathematics Letters 19, 1222–1227 (2006)
Zhang, Y., Wan, X.: Statistical fuzzy interval neural networks for currency exchange rate time series prediction. Applied Soft Computing 7, 1149–1156 (2007)
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Liu, D., Gao, X. (2012). Globe Robust Stability Analysis for Interval Neutral Systems. In: Huang, DS., Gan, Y., Gupta, P., Gromiha, M.M. (eds) Advanced Intelligent Computing Theories and Applications. With Aspects of Artificial Intelligence. ICIC 2011. Lecture Notes in Computer Science(), vol 6839. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-642-25944-9_80
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DOI: https://doi.org/10.1007/978-3-642-25944-9_80
Publisher Name: Springer, Berlin, Heidelberg
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