谱系对在空间Λ-Fleming-Viot过程中的合并率

IF 1.2 4区生物学 Q4 ECOLOGY

Theoretical Population Biology Pub Date : 2022-08-01 DOI:10.1016/j.tpb.2022.05.002

Johannes Wirtz, Stéphane Guindon

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引用次数: 2

摘要

我们回顾巴顿和凯莱赫(2010)介绍的空间Λ-Fleming-Viot过程。我们特别感兴趣的是两个世系的共同祖先到最近的时间。我们区分了过程作用于二维平面和有限矩形的情况。利用将T0与谱系之间的物理距离联系起来的微分方程，我们得到了两种情况下计算效率高且相当准确的近似方案。此外，我们的分析使我们能够解决这个问题，即模型的谱系过程是否“来自无限”，这个问题在vsamuber和Wakolbinger(2015)之前已经得到了部分回答。

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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Rate of coalescence of lineage pairs in the Spatial Λ-Fleming–Viot process

We revisit the Spatial $Λ$ -Fleming–Viot process introduced in Barton and Kelleher (2010). Particularly, we are interested in the time $T_{0}$ to the most recent common ancestor for two lineages. We distinguish between the cases where the process acts on the two-dimensional plane and on a finite rectangle. Utilizing a differential equation linking $T_{0}$ with the physical distance between the lineages, we arrive at computationally efficient and reasonably accurate approximation schemes for both cases. Furthermore, our analysis enables us to address the question of whether the genealogical process of the model “comes down from infinity”, which has been partly answered before in Véber and Wakolbinger (2015).

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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.