The compact interface property for the stochastic heat equation with seed bank

Pub Date : 2021-07-14 DOI:10.1214/22-ecp465
F. Nie
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Abstract

We investigate the compact interface property in a recently introduced variant of the stochastic heat equation that incorporates dormancy, or equivalently seed banks. There individuals can enter a dormant state during which they are no longer subject to spatial dispersal and genetic drift. This models a state of low metabolic activity as found in microbial species. Mathematically, one obtains a memory effect since mass accumulated by the active population will be retained for all times in the seed bank. This raises the question whether the introduction of a seed bank into the system leads to a qualitatively different behaviour of a possible interface. Here, we aim to show that nevertheless in the stochastic heat equation with seed bank compact interfaces are retained through all times in both the active and dormant population. We use duality and a comparison argument with partial functional differential equations to tackle technical difficulties that emerge due to the lack of the martingale property of our solutions which was crucial in the classical non seed bank case.
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具有种子库的随机热方程的紧致界面性质
我们研究了最近引入的随机热方程变体中的紧密界面性质,该变体包含休眠或等效的种子库。在那里,个体可以进入休眠状态,在此期间,它们不再受到空间扩散和基因漂移的影响。这模拟了在微生物物种中发现的低代谢活性的状态。从数学上讲,人们获得了记忆效应,因为活跃群体积累的质量将一直保留在种子库中。这就提出了一个问题,即在系统中引入种子库是否会导致可能界面的性质不同。在这里,我们的目的是证明,尽管如此,在具有种子库的随机热方程中,在活跃和休眠种群中,紧致界面始终保持不变。我们使用对偶性和偏泛函微分方程的比较论证来解决由于我们的解缺乏鞅性质而出现的技术难题,这在经典的非种子库情况下是至关重要的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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