沿线非局部扩散的生物入侵和流行病。

Henri Berestycki, Jean-Michel Roquejoffre, Luca Rossi
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引用次数: 0

摘要

这项工作的目标是了解和量化一条由积分给出的非局部扩散线是如何增强周围平面上发生的反应-扩散过程的。这是一项长期计划的一部分,我们的目标是以数学严谨的方式模拟交通网络对生物入侵或流行病传播速度的影响。我们证明了全球传播速度的存在,并根据系统参数描述了这种速度因线路的存在而提高的情况。在研究过程中,我们还发现了该模型意想不到的正则特性。在定量方面,两个主要参数是扩散核的强度及其支撑的特征尺寸。这项工作的成果之一是,即使这两个参数中只有一个较大,传播速度也会显著提高,从而拓宽了我们在以前的相关工作中已经绘制的以标准拉普拉斯为模型的局部扩散图。我们进一步研究了其他参数的作用,揭示了半平面扩散与线上扩散之间相互作用所产生的一些微妙影响。最后,在流行病传播的背景下,我们还讨论了线上的位移不是来自扩散,而是来自纯传输项的模型。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Biological invasions and epidemics with nonlocal diffusion along a line.

The goal of this work is to understand and quantify how a line with nonlocal diffusion given by an integral enhances a reaction-diffusion process occurring in the surrounding plane. This is part of a long term programme where we aim at modelling, in a mathematically rigorous way, the effect of transportation networks on the speed of biological invasions or propagation of epidemics. We prove the existence of a global propagation speed and characterise in terms of the parameters of the system the situations where such a speed is boosted by the presence of the line. In the course of the study we also uncover unexpected regularity properties of the model. On the quantitative side, the two main parameters are the intensity of the diffusion kernel and the characteristic size of its support. One outcome of this work is that the propagation speed will significantly be enhanced even if only one of the two is large, thus broadening the picture that we have already drawn in our previous works on the subject, with local diffusion modelled by a standard Laplacian. We further investigate the role of the other parameters, enlightening some subtle effects due to the interplay between the diffusion in the half plane and that on the line. Lastly, in the context of propagation of epidemics, we also discuss the model where, instead of a diffusion, displacement on the line comes from a pure transport term.

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