Persistence and extinction of an impulsive stochastic logistic model with infinite delay

Pub Date : 2016-01-01 DOI:10.18910/58895
Chun Lu, X. Ding
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引用次数: 9

Abstract

Abstract This paper considers an impulsive stochastic logistic mode l with infinite delay at the phase space Cg. Firstly, the definition of solution to an impulsive stochas tic functional differential equation with infinite delay is establi shed. Based on this definition, we show that our model has a unique global positive solution. Then we establish the sufficient conditions for extinction, nonpersistence in th e mean, weak persistence and stochastic permanence of the solution. The threshold betwe en weak persistence and extinction is obtained. In addition, the effects of impulsi ve perturbation and delay on persistence and extinction are discussed, respectively. F inally, numerical simulations are introduced to support the theoretical analysis results .
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具有无限延迟的脉冲随机逻辑模型的持续与消光
摘要本文研究了相空间上具有无限延迟的脉冲随机逻辑模型l。首先,给出了一类具有无限时滞的脉冲随机泛函微分方程解的定义。基于这个定义,我们证明了我们的模型有一个唯一的全局正解。然后给出了解的消隐、均值非持续性、弱持续性和随机持久性的充分条件。得到了弱持续和弱消失之间的阈值。此外,还讨论了脉冲摄动和延迟对持久性和消光的影响。最后,通过数值模拟对理论分析结果进行了验证。
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