具有自扩散和交叉扩散的捕食者-猎物模型的图灵不稳定性

S. Aly
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引用次数: 5

摘要

本文研究了一种描述两物种Beddington - DeAngelis型捕食-食饵系统的时空模型,该系统生活在两个由迁徙联系的相同斑块的栖息地中。模型假设各物种的人均迁移率不仅受自身密度的影响,还受其他物种密度的影响,即存在交叉扩散。我们证明了一个标准(自扩散)系统可以是稳定的也可以是不稳定的,交叉扩散响应可以稳定一个不稳定的标准系统,也可以破坏一个稳定的标准系统。对于扩散稳定模型,数值研究表明,当分岔参数达到临界值时,系统发生图灵分岔,交叉迁移响应是模式出现时不可忽视的重要因素。
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TURING INSTABILITY IN A PREDATOR-PREY MODEL IN PATCHY SPACE WITH SELF AND CROSS DIFFUSION
A spatio-temporal models as systems of ODE which describe two-species Beddington - DeAngelis type predator-prey system living in a habitat of two identical patches linked by migration is investigated. It is assumed in the model that the per capita migration rate of each species is influenced not only by its own but also by the other one’s density, i.e. there is cross diffusion present. We show that a standard (self-diffusion) system may be either stable or unstable, a cross-diffusion response can stabilize an unstable standard system and destabilize a stable standard system. For the diffusively stable model, numerical studies show that at a critical value of the bifurcation parameter the system undergoes a Turing bifurcation and the cross migration response is an important factor that should not be ignored when pattern emerges.
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