在生物微分方程模型中模拟人口噪声的一个简单问题:差异效应

IF 1.3 4区 数学 Q3 BIOLOGY
ROBERTO MACRELLI, MARGHERITA CARLETTI, GIOVANNI STABILE
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引用次数: 0

摘要

由确定性微分方程描述的动力系统代表了忽略随机影响的理想化情况。在生物数学建模中,随机噪声的引入必须区分为环境(或外在)噪声和人口(或内在)噪声。在后一种情况下,假定随时间变化的原因是两个或多个相互作用种群的人口统计学变化,而不是环境的波动。将人口统计学噪声作为影响模型所涉及种群的单个单位的随机过程进行建模和模拟,在文献中已广为人知,其结果是离散随机系统。当种群规模较大时,这些离散随机过程会趋近于连续随机过程,从而产生随机微分方程。如果忽略噪声,这些随机微分方程就会变成常微分方程。逆过程,即推断人口噪声对一组常微分方程所描述的自然系统的影响,是 Carletti M, Banerjee M 最近的一篇论文所要解决的问题,A backward technique for demographic noise in biological ordinary differential equation models(《生物常微分方程模型中的人口噪声逆向技术》),Mathematics7:1204, 2019。在本文中,我们举例说明了人口噪声建模和模拟技术如何从确定性连续微分方程系统逆推到其底层离散随机过程,从而提供差异效应,改变确定性模型的动态。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
A SIMPLE PROBLEM FOR SIMULATING DEMOGRAPHIC NOISE IN BIOLOGICAL DIFFERENTIAL EQUATION MODELS: A DISCREPANCY EFFECT

Dynamical systems described by deterministic differential equations represent idealized situations where random implications are ignored. In the context of biomathematical modeling, the introduction of random noise must be distinguished between environmental (or extrinsic) noise and demographic (or intrinsic) noise. In this last context it is assumed that the variation over time is due to demographic variation of two or more interacting populations, and not to fluctuations in the environment. The modeling and simulation of demographic noise as a stochastic process affecting single units of the populations involved in the model are well known in the literature and they result in discrete stochastic systems. When the population sizes are large, these discrete stochastic processes converge to continuous stochastic processes, giving rise to stochastic differential equations. If noise is ignored, these stochastic differential equations turn to ordinary differential equations. The inverse process, i.e., inferring the effects of demographic noise on a natural system described by a set of ordinary differential equations, is an issue addressed in a recent paper by Carletti M, Banerjee M, A backward technique for demographic noise in biological ordinary differential equation models, Mathematics7:1204, 2019. In this paper we show an example of how the technique to model and simulate demographic noise going backward from a deterministic continuous differential system to its underlying discrete stochastic process can provide a discrepancy effect, modifying the dynamics of the deterministic model.

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来源期刊
CiteScore
2.80
自引率
12.50%
发文量
31
审稿时长
1 months
期刊介绍: The Journal of Biological Systems is published quarterly. The goal of the Journal is to promote interdisciplinary approaches in Biology and in Medicine, and the study of biological situations with a variety of tools, including mathematical and general systems methods. The Journal solicits original research papers and survey articles in areas that include (but are not limited to): Complex systems studies; isomorphies; nonlinear dynamics; entropy; mathematical tools and systems theories with applications in Biology and Medicine. Interdisciplinary approaches in Biology and Medicine; transfer of methods from one discipline to another; integration of biological levels, from atomic to molecular, macromolecular, cellular, and organic levels; animal biology; plant biology. Environmental studies; relationships between individuals, populations, communities and ecosystems; bioeconomics, management of renewable resources; hierarchy theory; integration of spatial and time scales. Evolutionary biology; co-evolutions; genetics and evolution; branching processes and phyllotaxis. Medical systems; physiology; cardiac modeling; computer models in Medicine; cancer research; epidemiology. Numerical simulations and computations; numerical study and analysis of biological data. Epistemology; history of science. The journal will also publish book reviews.
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