Inference on spatiotemporal dynamics for coupled biological populations.

IF 3.7 2区 综合性期刊 Q1 MULTIDISCIPLINARY SCIENCES
Journal of The Royal Society Interface Pub Date : 2024-07-01 Epub Date: 2024-07-10 DOI:10.1098/rsif.2024.0217
Jifan Li, Edward L Ionides, Aaron A King, Mercedes Pascual, Ning Ning
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引用次数: 0

Abstract

Mathematical models in ecology and epidemiology must be consistent with observed data in order to generate reliable knowledge and evidence-based policy. Metapopulation systems, which consist of a network of connected sub-populations, pose technical challenges in statistical inference owing to nonlinear, stochastic interactions. Numerical difficulties encountered in conducting inference can obstruct the core scientific questions concerning the link between the mathematical models and the data. Recently, an algorithm has been proposed that enables computationally tractable likelihood-based inference for high-dimensional partially observed stochastic dynamic models of metapopulation systems. We use this algorithm to build a statistically principled data analysis workflow for metapopulation systems. Via a case study of COVID-19, we show how this workflow addresses the limitations of previous approaches. The COVID-19 pandemic provides a situation where mathematical models and their policy implications are widely visible, and we revisit an influential metapopulation model used to inform basic epidemiological understanding early in the pandemic. Our methods support self-critical data analysis, enabling us to identify and address model weaknesses, leading to a new model with substantially improved statistical fit and parameter identifiability. Our results suggest that the lockdown initiated on 23 January 2020 in China was more effective than previously thought.

耦合生物种群的时空动态推断。
生态学和流行病学中的数学模型必须与观测数据相一致,才能产生可靠的知识和循证政策。元种群系统由相连的子种群网络组成,由于非线性、随机的相互作用,给统计推断带来了技术挑战。推断过程中遇到的数字困难可能会阻碍有关数学模型与数据之间联系的核心科学问题。最近,有人提出了一种算法,可以对高维部分观测的元种群系统随机动态模型进行基于似然法的计算推断。我们利用该算法为元种群系统建立了一个统计学原理的数据分析工作流程。通过 COVID-19 的案例研究,我们展示了该工作流程如何解决以往方法的局限性。COVID-19 大流行提供了一个数学模型及其政策影响广为人知的情境,我们重新审视了一个有影响力的元种群模型,该模型在大流行早期曾用于为基本流行病学认识提供信息。我们的方法支持自我批判数据分析,使我们能够识别并解决模型的弱点,从而建立了一个统计拟合度和参数可识别度都大幅提高的新模型。我们的研究结果表明,2020 年 1 月 23 日在中国启动的封锁比之前想象的更加有效。
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
Journal of The Royal Society Interface
Journal of The Royal Society Interface 综合性期刊-综合性期刊
CiteScore
7.10
自引率
2.60%
发文量
234
审稿时长
2.5 months
期刊介绍: J. R. Soc. Interface welcomes articles of high quality research at the interface of the physical and life sciences. It provides a high-quality forum to publish rapidly and interact across this boundary in two main ways: J. R. Soc. Interface publishes research applying chemistry, engineering, materials science, mathematics and physics to the biological and medical sciences; it also highlights discoveries in the life sciences of relevance to the physical sciences. Both sides of the interface are considered equally and it is one of the only journals to cover this exciting new territory. J. R. Soc. Interface welcomes contributions on a diverse range of topics, including but not limited to; biocomplexity, bioengineering, bioinformatics, biomaterials, biomechanics, bionanoscience, biophysics, chemical biology, computer science (as applied to the life sciences), medical physics, synthetic biology, systems biology, theoretical biology and tissue engineering.
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