Razumikhin-type theorem for pth exponential stability of impulsive stochastic functional differential equations based on vector Lyapunov function

Abstract This paper is concerned with the pth moment exponential stability of stochastic functional differential equations with impulses. Based on average dwell-time method, Razumikhin-type technique and vector Lyapunov function, some novel stability criteria are obtained for impulsive stochastic functional differential systems. Two examples are given to demonstrate the validity of the proposed results.

[1]  X. Mao RAZUMIKHIN-TYPE THEOREMS ON EXPONENTIAL STABILITY OF NEUTRAL STOCHASTIC FUNCTIONAL DIFFERENTIAL EQUATIONS∗ , 1997 .

[2]  Lei Liu,et al.  New Criteria on Exponential Stability for Stochastic Delay Differential Systems Based on Vector Lyapunov Function , 2017, IEEE Transactions on Systems, Man, and Cybernetics: Systems.

[3]  F. Deng,et al.  Filtering for Discrete-Time Takagi–Sugeno Fuzzy Nonhomogeneous Markov Jump Systems With Quantization Effects , 2020, IEEE Transactions on Cybernetics.

[4]  Xuerong Mao,et al.  On Input-to-State Stability of Stochastic Retarded Systems With Markovian Switching , 2009, IEEE Transactions on Automatic Control.

[5]  X. Mao,et al.  Stochastic Differential Equations and Applications , 1998 .

[6]  Junlin Xiong,et al.  Vector-Lyapunov-Function-Based Input-to-State Stability of Stochastic Impulsive Switched Time-Delay Systems , 2019, IEEE Transactions on Automatic Control.

[7]  Feiqi Deng,et al.  H∞ Filtering for Nonhomogeneous Markovian Jump Repeated Scalar Nonlinear Systems With Multiplicative Noises and Partially Mode-Dependent Characterization , 2019, IEEE Transactions on Systems, Man, and Cybernetics: Systems.

[8]  Yang Zhao,et al.  pth moment and almost sure exponential stability of impulsive neutral stochastic functional differential equations with Markovian switching , 2018, Int. J. Syst. Sci..

[9]  Feiqi Deng,et al.  Exponential stability analysis of impulsive stochastic functional differential systems with delayed impulses , 2013, Commun. Nonlinear Sci. Numer. Simul..

[10]  Feiqi Deng,et al.  Almost sure exponential stability and stochastic stabilization of stochastic differential systems with impulsive effects , 2018, Nonlinear Analysis: Hybrid Systems.

[11]  Dabo Xu,et al.  Decentralized measurement feedback stabilization of large-scale systems via control vector Lyapunov functions , 2013, Syst. Control. Lett..

[12]  Yang Tang,et al.  Input-to-state stability of impulsive stochastic delayed systems under linear assumptions , 2016, Autom..

[13]  João Pedro Hespanha,et al.  Lyapunov conditions for input-to-state stability of impulsive systems , 2008, Autom..

[14]  Junlin Xiong,et al.  Exponential stability of stochastic impulsive switched delayed systems based on vector Lyapunov functions , 2017, 2017 11th Asian Control Conference (ASCC).

[15]  João Pedro Hespanha,et al.  Exponential stability of impulsive systems with application to uncertain sampled-data systems , 2008, Syst. Control. Lett..

[16]  Yonggui Kao,et al.  Exponential stability and instability of impulsive stochastic functional differential equations with Markovian switching , 2015, Appl. Math. Comput..

[17]  Xinzhi Liu,et al.  Existence, continuation, and uniqueness problems of stochastic impulsive systems with time delay , 2010, J. Frankl. Inst..

[18]  X. Mao,et al.  Razumikhin-type theorems on exponential stability of stochastic functional differential equations , 1996 .

[19]  D. Baĭnov,et al.  Systems with impulse effect : stability, theory, and applications , 1989 .

[20]  Jinde Cao,et al.  Razumikhin-type theorem for stochastic functional differential systems via vector Lyapunov function , 2019, Journal of Mathematical Analysis and Applications.

[21]  Liguang Xu,et al.  P-attracting and p-invariant sets for a class of impulsive stochastic functional differential equations , 2009, Comput. Math. Appl..

[22]  Quanxin Zhu,et al.  Stability analysis of impulsive stochastic functional differential equations , 2020, Commun. Nonlinear Sci. Numer. Simul..

[23]  Jinde Cao,et al.  Exponential stability of impulsive stochastic functional differential equations , 2011 .

[24]  Feiqi Deng,et al.  New Criteria on $p$th Moment Input-to-State Stability of Impulsive Stochastic Delayed Differential Systems , 2017, IEEE Transactions on Automatic Control.

[25]  Daoyi Xu,et al.  Impulsive delay differential inequality and stability of neural networks , 2005 .

[26]  Meng Pan,et al.  Razumikhin-type theorems on exponential stability of stochastic functional differential equations on networks , 2014, Neurocomputing.

[27]  V. Lakshmikantham,et al.  Theory of Impulsive Differential Equations , 1989, Series in Modern Applied Mathematics.

[28]  Denis V. Efimov,et al.  Vector lyapunov function based stability for a class of impulsive systems , 2015, 2015 54th IEEE Conference on Decision and Control (CDC).

[29]  Quanxin Zhu,et al.  Razumikhin-type theorem for stochastic functional differential equations with Lévy noise and Markov switching , 2017, Int. J. Control.

[30]  R. Bellman Vector Lyanpunov Functions , 1962 .

[31]  W. Haddad,et al.  Control vector Lyapunov functions for large-scale impulsive dynamical systems , 2007 .

[32]  Quanxin Zhu,et al.  pth Moment exponential stability of impulsive stochastic functional differential equations with Markovian switching , 2014, J. Frankl. Inst..

[33]  Shiguo Peng,et al.  Some criteria on pth moment stability of impulsive stochastic functional differential equations , 2010 .

[34]  R. Sakthivel,et al.  Asymptotic stability of nonlinear impulsive stochastic differential equations , 2009 .

[35]  F. Deng,et al.  Global exponential stability of impulsive stochastic functional differential systems , 2010 .

[36]  I. Stamova Vector Lyapunov functions for practical stability of nonlinear impulsive functional differential equations , 2007 .

[37]  Zheng Wu,et al.  Exponential stability of impulsive stochastic functional differential systems with Markovian switching , 2012, 2017 32nd Youth Academic Annual Conference of Chinese Association of Automation (YAC).

[38]  Zhihong Li,et al.  Mean-square exponential input-to-state stability of delayed Cohen-Grossberg neural networks with Markovian switching based on vector Lyapunov functions , 2016, Neural Networks.

[39]  Charles R. Johnson,et al.  Matrix analysis , 1985, Statistical Inference for Engineers and Data Scientists.

[40]  Quanxin Zhu,et al.  Practical exponential stability of stochastic age-dependent capital system with Lévy noise , 2020, Syst. Control. Lett..

[41]  Mou-Hsiung Chang On razumikhin-type stability conditions for stochastic functional differential equations , 1984 .

[42]  Quanxin Zhu,et al.  Stabilization of stochastic functional differential systems with delayed impulses , 2019, Appl. Math. Comput..