Mean-square exponential stability for stochastic time-varying delay systems with Markovian jumping parameters:a delay decomposition approach

Mean-square exponential stability for stochastic time-varying delay systems with Markovian jumping parameters:a delay decomposition approach

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摘要 The mean-square exponential stability problem is investigated for a class of stochastic time-varying delay systems with Markovian jumping parameters. By decomposing the delay interval into multiple equidistant subintervals, a new delay-dependent and decay-rate-dependent criterion is presented based on constructing a novel Lyapunov functional and employing stochastic analysis technique. Besides, the decay rate has no conventional constraint and can be selected according to different practical conditions. Finally, two numerical examples are provided to show that the obtained result has less conservatism than some existing ones in the literature. The mean-square exponential stability problem is investigated for a class of stochastic time-varying delay systems with Markovian jumping parameters. By decomposing the delay interval into multiple equidistant subintervals, a new delay-dependent and decay-rate-dependent criterion is presented based on constructing a novel Lyapunov functional and employing stochastic analysis technique. Besides, the decay rate has no conventional constraint and can be selected according to different practical conditions. Finally, two numerical examples are provided to show that the obtained result has less conservatism than some existing ones in the literature.

作者 Li Ma Feipeng Da

机构地区 Key Laboratory of Measurement and Control for Complex Systems of Engineering College of Electronic and Information Engineering

出处《Journal of Systems Engineering and Electronics》 SCIE EI CSCD 2011年第5期816-824,共9页 系统工程与电子技术（英文版）

基金 supported by the Program for New Century Excellent Talents in University, the Graduate Innovation Program of Jiangsu Province (CX06B-051Z) the Scientific Research Foundation of Graduate School of Southeast University (YBJJ0929)

关键词 stochastic systems time-varying delay Markov chain linear matrix inequality （LMI）. stochastic systems, time-varying delay, Markov chain linear matrix inequality （LMI）.

分类号 O211.63 [理学—概率论与数理统计] TP273.2 [自动化与计算机技术—检测技术与自动化装置]

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1M. S. Mahmoud, N. E A1-Muthairi. Quadratic stabilization of continuous time systems with state-delay and norm-bounded time-varying uncertainties. 1EEE Trans. on Automatic Control, 1994, 39(10): 2135-2139.
2S. K. Nguang. Robust stabilization of a class of time-delay nonlinear systems. IEEE Trans. on Automatic Control, 2000, 45(1): 756-762.
3Y. S. Moon, P. Park, H. W. Kwon, et al. Delay-dependent robust stabilization of uncertain state-delayed systems. International Journal of Control, 2001, 74(7): 1447-1455.
4S. Y. Xu, J. Lam. Improved delay-dependent stability criteria for time-delay systems. IEEE Trans. on Automatic Control, 2005, 50(3): 384-387.
5Y. He, M. Wu, J. H. She, et al. Parameter-dependent Lyapunov functional for stability of time-delay systems with polytopictype uncertainties. IEEE Trans. on Automatic Control, 2004, 49(5): 828-832.
6S. Mondie, V. L. Kharitonov. Exponential estimates for retarded time-delay systems: an LMI approach. IEEE Trans. on Automatic Control, 2005, 50(2): 268-273.
7L. V. Hien, V. N. Phat. Exponential stability and stabilization of a class of uncertain linear time-delay systems. Journal of the Franklin Institute, 2009, 346(6): 611-625.
8D. Yue, E. G. Tian, Y. J. Zhang, et al. Delay-distribution-dependent robust stability of uncertain systems with time- varying delay. International Journal of Robust Nonlinear and Control, 2008, 19(4): 377-393.
9G. L. Wei, Z. D. Wang, H. S. Shu, et al. Delay-dependent stabilization of stochastic interval delay systems with nonlin- ear disturbances. Systems & Control Letters, 2007, 56(9-10): 623-633.
10X. R. Mao, N. Koroleva, A. Rodkina. Robust stability of uncertain stochastic differential delay equations. Systems & Control Letters, 1998, 35(5): 325-336.

1XU Congcong.Exponential Stability of Impulsive Stochastic Recurrent Neural Networks with Time-Varying Delays and Markovian Jumping[J].Wuhan University Journal of Natural Sciences,2014,19(1):71-78.
2张化光,浮洁,马铁东,佟绍成.Robust stability analysis for Markovian jumping stochastic neural networks with mode-dependent time-varying interval delay and multiplicative noise[J].Chinese Physics B,2009,18(8):3325-3336.
3樊春霞,周颖.具有数据丢失的离散复杂动态网络H_∞控制[J].计算机工程与应用,2012,48(33):5-8.
4朱霞.随机延迟微分方程的Milstein方法的均方稳定性[J].武汉大学学报（理学版）,2005,51(S2):1-3. 被引量：1
5吴海霞.带区间时变时滞的BAM神经网络渐近稳定性[J].电脑知识与技术,2014,0(7):4544-4549.
6Fatima Ahmida,El Houssaine Tissir.Exponential Stability of Uncertain T-S Fuzzy Switched Systems with Time Delay[J].International Journal of Automation and computing,2013,10(1):32-38. 被引量：3
7LIU Jinliang,YUE Dong.Asymptotic Stability of Markovian Jumping Genetic Regulatory Networks with Random Delays[J].Chinese Journal of Electronics,2013,22(2):263-268.
8Deng Feiqi,Liu Hongwei,Feng Zhaoshu & Liu Yongqing(Department of Automatic Control Engineering, South China University of Technology,Guangzhou 510641, P. R. China).Moment Equations of Linear It Stochastic Systems with Applications[J].Journal of Systems Engineering and Electronics,1998,9(2):1-7.
9朱丽萍,张圣坤.神经网络在非线性随机分析中的应用[J].上海力学,1997,18(4):281-289.
10M.Syed Ali.Stability analysis of Markovian jumping stochastic Cohen Grossberg neural networks with discrete and distributed time varying delays[J].Chinese Physics B,2014,23(6):131-137. 被引量：2

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Mean-square exponential stability for stochastic time-varying delay systems with Markovian jumping parameters:a delay decomposition approach

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