This paper focuses on the model of a class of nonlinear stochastic delay systems with Poisson jumps based on Lyapunov stability theory, stochastic analysis, and inequality technique. The existence and uniqueness of the adapted solution to such systems are proved by applying the fixed point theorem. By constructing a Lyapunov function and using Doob’s martingale inequality and Borel-Cantelli lemma, sufficient conditions are given to establish the exponential stability in the mean square of such systems, and we prove that the exponentially stable in the mean square of such systems implies the almost surely exponentially stable. The obtained results show that if stochastic systems is exponentially stable and the time delay is sufficiently small, then the corresponding stochastic delay systems with Poisson jumps will remain exponentially stable, and time delay upper limit is solved by using the obtained results when the system is exponentially stable, and they are more easily verified and applied in practice.

+More

nonlinear stochastic delay systems adapted solution exponential stability doobs martingale inequality time delay upper limit exponentially stable fixed point theorem surely the mean square poisson jumps borelcantelli stochastic analysis and inequality

Wenli Zhu,Jiexiang Huang,Zhao Zhao,.Exponential Stability of Stochastic Systems with Delay and Poisson Jumps. 2014 (),.

Wenli Zhu,Jiexiang Huang,Zhao Zhao,"Exponential Stability of Stochastic Systems with Delay and Poisson Jumps" 2014

Wenli Zhu,Jiexiang Huang,Zhao Zhao,"Exponential Stability of Stochastic Systems with Delay and Poisson Jumps"