Untangling the role of temporal and spatial variations in persistence of populations

IF 1.2 4区生物学 Q4 ECOLOGY

Theoretical Population Biology Pub Date : 2023-07-13 DOI:10.1016/j.tpb.2023.07.003

Michel Benaïm , Claude Lobry , Tewfik Sari , Édouard Strickler

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引用次数: 5

Abstract

We consider a population distributed between two habitats, in each of which it experiences a growth rate that switches periodically between two values, $1 - ɛ > 0$ or $- (1 + ɛ) < 0$ . We study the specific case where the growth rate is positive in one habitat and negative in the other one for the first half of the period, and conversely for the second half of the period, that we refer as the $(\pm 1)$ model. In the absence of migration, the population goes to 0 exponentially fast in each environment. In this paper, we show that, when the period is sufficiently large, a small dispersal between the two patches is able to produce a very high positive exponential growth rate for the whole population, a phenomena called inflation. We prove in particular that the threshold of the dispersal rate at which the inflation appears is exponentially small with the period. We show that inflation is robust to random perturbation, by considering a model where the values of the growth rate in each patch are switched at random times: we prove that inflation occurs for low switching rate and small dispersal. We also consider another stochastic model, where after each period of time $T$ , the values of the growth rates in each patch is chosen randomly, independently from the other patch and from the past. Finally, we provide some extensions to more complicated models, especially epidemiological and density dependent models.

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解开时间和空间变异在种群持续性中的作用

我们考虑一个分布在两个栖息地之间的种群，在每个栖息地中，它都经历着在两个值之间周期性切换的增长率，1-；0或−（1+）<；0。我们研究了一种特定情况，即在前半段时间内，一个栖息地的生长率为正，另一个栖息地为负，而在后半段时间内则相反，我们称之为（±1）模型。在没有迁移的情况下，每个环境中的人口都会以指数级的速度变为0。在本文中，我们表明，当周期足够大时，两个斑块之间的小扩散能够为整个人口产生非常高的正指数增长率，这种现象被称为通货膨胀。我们特别证明，通货膨胀出现的扩散率阈值随时间呈指数级小。我们通过考虑每个补丁中的增长率值在随机时间切换的模型，证明了通货膨胀对随机扰动是鲁棒的：我们证明了通货膨胀发生在低切换率和小分散的情况下。我们还考虑另一个随机模型，其中在每个时间段T之后，每个补丁中的增长率值是随机选择的，独立于其他补丁和过去。最后，我们对更复杂的模型，特别是流行病学和密度依赖模型进行了一些扩展。

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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来源期刊

Theoretical Population Biology 生物-进化生物学

CiteScore

2.50

自引率

14.30%

发文量

审稿时长

6-12 weeks

期刊介绍： An interdisciplinary journal, Theoretical Population Biology presents articles on theoretical aspects of the biology of populations, particularly in the areas of demography, ecology, epidemiology, evolution, and genetics. Emphasis is on the development of mathematical theory and models that enhance the understanding of biological phenomena. Articles highlight the motivation and significance of the work for advancing progress in biology, relying on a substantial mathematical effort to obtain biological insight. The journal also presents empirical results and computational and statistical methods directly impinging on theoretical problems in population biology.