Stability analysis of neutral stochastic differential delay equations driven by Lévy noises

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摘要

This paper mainly analyzes the well-posedness, and the stability analysis for the global solution of neutral stochastic differential delay equations (NSDDEs) driven by Lévy noises. By using an integral lemma and a Lyapunov function approach, the existence and uniqueness theorem is proved. Then, by using the inequality technique and the stochastic analysis theory, the exponential stability in pth(p ≥ 2) moment of such equations is discussed. By using another integral lemma, and using the Baralat lemma as well as the stochastic analysis, the almost surely asymptotic stability is also studied. Finally, one example is given to check the effectiveness of the findings derived.

论文关键词:NSDDEs,Stability,Time-varying delay,Lévy noises,The existence and uniqueness

论文评审过程:Received 31 May 2019, Revised 13 January 2020, Accepted 19 January 2020, Available online 5 February 2020, Version of Record 5 February 2020.

论文官网地址:https://doi.org/10.1016/j.amc.2020.125080