盛行风与云杉芽虫爆发:一个反应-扩散-平流模型

IF 0.4 Q4 MATHEMATICS, APPLIED Mathematics in applied sciences and engineering Pub Date : 2021-11-03 DOI:10.5206/mase/14112
Abby Anderson, O. Vasilyeva
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引用次数: 0

摘要

在具有敌对边界条件的有限域上,我们扩展了经典的反应扩散模型,加入了一个平流项,表示由于盛行风而导致的个体有偏的单向运动。我们使用相平面技术来建立平流速度临界值的存在性,该临界值可以在任何有限域上阻止爆发解决方案,同时可能允许地方性解决方案。根据反应项中涉及的生物参数,我们得到了这个临界平流值的下界和上界。我们还进行了数值模拟,以说明平流对区域大小对稳态解决方案的最大种群密度和流行病和爆发解决方案的临界区域大小的依赖性的影响。研究结果也适用于其他生态环境(河流、气候变化),在这些环境中,逻辑上不断增长的人口会受到通才、扩散和偏颇运动的捕食。
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Prevailing winds and spruce budworm outbreaks: a reaction-diffusion-advection model
We extend the classical reaction-diffusion model for spatial population dynamics of spruce budworm on a finite domain with hostile boundary conditions by including an advection term representing biased unidirectional movement of individuals due to a prevailing wind. We use phase-plane techniques to establish existence of a critical value of advection speed that prevents outbreak solutions on any finite domain while possibly allowing an endemic solution. We obtain lower and upper bounds for this critical advection value in terms of biological parameters involved in the reaction term. We also perform numerical simulations to illustrate the effect of advection on the dependence of the domain size on the maximal population density of a steady state solution and on critical domain sizes for endemic and outbreak solutions. The results are also applicable to other ecological settings (rivers, climate change) where a logistically growing population is subject to predation by a generalist, diffusion and biased movement.
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CiteScore
1.40
自引率
0.00%
发文量
0
审稿时长
21 weeks
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