具有三物种的食饵-捕食反应扩散时滞系统的稳定性与行波解(英文)  被引量:4

Stability and Traveling Fronts of a Three-species Diffusive Prey-predator System with Delays

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作  者:李成林[1] 

机构地区:[1]红河学院数学学院,云南蒙自661199

出  处:《工程数学学报》2017年第2期182-198,共17页Chinese Journal of Engineering Mathematics

基  金:The National Natural Science Foundation of China(11461023);the Research Funds of Ph.D.for Honghe University(14bs19)

摘  要:本文研究了在有界区域上带有Neumann边界条件的反应扩散三物种食饵-捕食时滞系统.利用特征值方法和Lyapunov函数找到了该系统平衡点稳定的充分条件,该条件说明时滞限制了稳定性.稳定性中的主要一个结论是当食饵和捕食者间的种内竞争大于种间竞争时正平衡点是全局渐近稳定的.进一步,通过构建上下解证明了当波速相对大时该系统具有连接零平衡点和正平衡点的行波解.This paper is concerned with a three-species delayed reaction-diffusion predator- prey system in a bounded domain with Neumann boundary condition. The suffi- cient conditions of stability are found for equilibria of this system by the method of eigenvalue and Lyapunov function, and these conditions imply that delays often restrain stability. One of the main results about stabilities shows that if the intra- specific competitions of the predator and preys dominate their inter-specific inter- action, then the positive equilibria are globally stable. Furthermore, the existence of the traveling wavefront is considered by constructing upper-lower solution and it is derived that this system always has a traveling wave solution connecting the trivial steady state and the positive steady state when the wave speed is relatively big.

关 键 词:稳定性 时滞 行波解 

分 类 号:O175.1[理学—数学]

 

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