Robust Exponential Stability of Uncertain Delayed Neural Networks With Stochastic Perturbation and Impulse Effects

被引:1
|
作者
Huang, Tingwen [1 ]
Li, Chuandong [2 ]
Duan, Shukai [3 ]
Starzyk, Janusz A. [4 ,5 ]
机构
[1] Texas A&M Univ Qatar, Doha 23874, Qatar
[2] Chongqing Univ, Coll Comp Sci, Chongqing 400044, Peoples R China
[3] Southwest Univ, Sch Elect & Informat Engn, Chongqing 400715, Peoples R China
[4] Ohio Univ, Sch Elect Engn & Comp Sci, Athens, OH 45701 USA
[5] Univ Informat Technol & Management, PL-35064 Rzeszow, Poland
来源
IEEE TRANSACTIONS ON NEURAL NETWORKS AND LEARNING SYSTEMS | 2012年 / 23卷 / 06期
基金
中国国家自然科学基金;
关键词
Delayed neural networks (DNN); exponential stability; impulse; mean-square stability; parameter uncertainty; stochastic perturbation; TIME-VARYING DELAYS; GLOBAL ASYMPTOTIC STABILITY; DISTRIBUTED DELAYS; LINEAR-SYSTEMS; MIXED DELAYS; DISCRETE; STABILIZATION;
D O I
暂无
中图分类号
TP18 [人工智能理论];
学科分类号
081104 ; 0812 ; 0835 ; 1405 ;
摘要
This paper focuses on the hybrid effects of parameter uncertainty, stochastic perturbation, and impulses on global stability of delayed neural networks. By using the Ito formula, Lyapunov function, and Halanay inequality, we established several mean-square stability criteria from which we can estimate the feasible bounds of impulses, provided that parameter uncertainty and stochastic perturbations are well-constrained. Moreover, the present method can also be applied to general differential systems with stochastic perturbation and impulses.
引用
收藏
页码:866 / 875
页数:10
相关论文
共 50 条
  • [21] Exponential stability analysis of delayed memristor-based recurrent neural networks with impulse effects
    Wang, Huamin
    Duan, Shukai
    Li, Chuandong
    Wang, Lidan
    Huang, Tingwen
    NEURAL COMPUTING & APPLICATIONS, 2017, 28 (04) : 669 - 678
  • [22] Exponential stability of stochastic delayed Hopfield neural networks
    Zhou, Qinghua
    Wan, Li
    APPLIED MATHEMATICS AND COMPUTATION, 2008, 199 (01) : 84 - 89
  • [23] A Delay-Dividing Approach to Robust Stability of Uncertain Stochastic Complex-Valued Hopfield Delayed Neural Networks
    Chanthorn, Pharunyou
    Rajchakit, Grienggrai
    Humphries, Usa
    Kaewmesri, Pramet
    Sriraman, Ramalingam
    Lim, Chee Peng
    SYMMETRY-BASEL, 2020, 12 (05):
  • [24] DESTABILIZING EFFECTS OF IMPULSE IN DELAYED BAM NEURAL NETWORKS
    Li, Chuandong
    Li, Chaojie
    Liu, Chao
    MODERN PHYSICS LETTERS B, 2009, 23 (29): : 3503 - 3513
  • [25] NOVEL ROBUST DELAY-DEPENDENT EXPONENTIAL STABILITY CRITERIA FOR STOCHASTIC DELAYED RECURRENT NEURAL NETWORKS
    Zhang, Yijun
    Tian, Engang
    INTERNATIONAL JOURNAL OF INNOVATIVE COMPUTING INFORMATION AND CONTROL, 2009, 5 (09): : 2735 - 2744
  • [26] Mean Square Exponential Stability for Uncertain Delayed Stochastic Neural Networks with Markovian Jump Parameters
    Qi Zhou
    Bing Chen
    Chong Lin
    Hongyi Li
    Circuits, Systems and Signal Processing, 2010, 29 : 331 - 348
  • [27] Global exponential synchronization for coupled switched delayed recurrent neural networks with stochastic perturbation and impulsive effects
    Zhang, Wei
    Li, Chuandong
    Huang, Tingwen
    Qi, Jiangtao
    NEURAL COMPUTING & APPLICATIONS, 2014, 25 (06) : 1275 - 1283
  • [28] New Criteria on Delay-Dependent Robust Stability for Uncertain Markovian Stochastic Delayed Neural Networks
    Chen, Huabin
    Wang, Jinjing
    Wang, Liu
    NEURAL PROCESSING LETTERS, 2015, 42 (02) : 275 - 290
  • [29] Fractional delay segments method on time-delayed recurrent neural networks with impulsive and stochastic effects: An exponential stability approach
    Maharajan, C.
    Raja, R.
    Cao, Jinde
    Rajchakit, G.
    NEUROCOMPUTING, 2019, 323 : 277 - 298
  • [30] Stochastic Stability of Delayed Neural Networks With Local Impulsive Effects
    Zhang, Wenbing
    Tang, Yang
    Wong, Wai Keung
    Miao, Qingying
    IEEE TRANSACTIONS ON NEURAL NETWORKS AND LEARNING SYSTEMS, 2015, 26 (10) : 2336 - 2345
12345