On exponential stability of hybrid neutral stochastic differential delay equations with different structures

Abstract This article discusses the problem of exponential stability for a class of hybrid neutral stochastic differential delay equations with highly nonlinear coefficients and different structures in different switching modes. In such systems, the coefficients will satisfy the local Lipschitz condition and suitable Khasminskii-types conditions. The set of switching states will be divided into two subsets. In different subsets, the coefficients will be dominated by polynomials with different degrees. By virtue of M -matrices and suitable Lyapunov functions dependent on coefficient structures and switching modes, some results including the existence-and-uniqueness, boundedness and exponential stability of the solution are proposed and proved.

[1]  Liangjian Hu,et al.  Structured Robust Stability and Boundedness of Nonlinear Hybrid Delay Systems , 2018, SIAM J. Control. Optim..

[2]  Yi Shen,et al.  New criteria on exponential stability of neutral stochastic differential delay equations , 2006, Syst. Control. Lett..

[3]  Xuerong Mao,et al.  A note on almost sure asymptotic stability of neutral stochastic delay differential equations with Markovian switching , 2012, Autom..

[4]  Liangjian Hu,et al.  Robust Stability and Boundedness of Nonlinear Hybrid Stochastic Differential Delay Equations , 2013, IEEE Transactions on Automatic Control.

[5]  Feiqi Deng,et al.  Almost sure stability with general decay rate of neutral stochastic delayed hybrid systems with Lévy noise , 2017 .

[6]  Marija Milosevic,et al.  Convergence and almost sure exponential stability of implicit numerical methods for a class of highly nonlinear neutral stochastic differential equations with constant delay , 2015, J. Comput. Appl. Math..

[7]  Xuerong Mao,et al.  Stochastic Differential Equations With Markovian Switching , 2006 .

[8]  Liangjian Hu,et al.  Delay dependent stability of highly nonlinear hybrid stochastic systems , 2017, Autom..

[9]  Xuerong Mao,et al.  Almost surely asymptotic stability of neutral stochastic differential delay equations with Markovian switching , 2008 .

[10]  Marija Milosevic,et al.  Highly nonlinear neutral stochastic differential equations with time-dependent delay and the Euler-Maruyama method , 2011, Math. Comput. Model..

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

[12]  Marija Milosevic,et al.  Almost sure exponential stability of solutions to highly nonlinear neutral stochastic differential equations with time-dependent delay and the Euler-Maruyama approximation , 2013, Math. Comput. Model..

[13]  Zhengguang Wu,et al.  New results on delay-dependent stability analysis for neutral stochastic delay systems , 2013, J. Frankl. Inst..

[14]  Xuerong Mao,et al.  Stability of highly nonlinear neutral stochastic differential delay equations , 2018, Syst. Control. Lett..

[15]  Y. Kuang Delay Differential Equations: With Applications in Population Dynamics , 2012 .

[16]  Fuke Wu,et al.  The Boundedness and Exponential Stability Criterions for Nonlinear Hybrid Neutral Stochastic Functional Differential Equations , 2013 .

[17]  R. Brayton Bifurcation of periodic solutions in a nonlinear difference-differential equations of neutral type , 1966 .

[18]  C. Yuan,et al.  Stability in distribution of neutral stochastic differential delay equations with Markovian switching , 2009 .

[19]  V. Kolmanovskii,et al.  Applied Theory of Functional Differential Equations , 1992 .

[20]  Jiaowan Luo Fixed points and stability of neutral stochastic delay differential equations , 2007 .

[21]  Fuke Wu,et al.  Exponential stability of the exact and numerical solutions for neutral stochastic delay differential equations , 2016 .

[22]  Ying Xie,et al.  Asymptotical boundedness and moment exponential stability for stochastic neutral differential equations with time-variable delay and markovian switching , 2017, Appl. Math. Lett..

[23]  Yan Xu,et al.  Exponential stability of neutral stochastic delay differential equations with Markovian switching , 2016, Appl. Math. Lett..