Mathematical Analysis of an Epidemic Model for COVID-19: How Important Is the People's Cautiousness Level for Eradication?

Q3 Mathematics

Letters in Biomathematics Pub Date : 2021-08-05 DOI:10.30707/lib9.1.1681913305.200838

B. Yong, Livia Owen, Jonathan Hoseana

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引用次数: 3

Abstract

We construct an SIR-type model for COVID-19, incorporating as a parameter the susceptible individuals' cautiousness level. We determine the model's basic reproduction number, study the stability of the equilibria analytically, and perform a sensitivity analysis to confirm the significance of the cautiousness level. Fixing specific values for all other parameters, we study numerically the model's dynamics as the cautiousness level varies, revealing backward transcritical, Hopf, and saddle-node bifurcations of equilibria, as well as homoclinic and fold bifurcations of limit cycles with the aid of AUTO. Considering some key events affecting the pandemic in Indonesia, we design a scenario in which the cautiousness level varies over time, and show that the model exhibits a hysteresis, whereby, a slight cautiousness decrease could bring a disease-free state to endemic, and this is reversible only by a drastic cautiousness increase, thereby mathematically justifying the importance of a high cautiousness level for resolving the pandemic. © 2022, Intercollegiate Biomathematics Alliance. All rights reserved.

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新冠肺炎流行模型的数学分析：人们对根除的谨慎程度有多重要？

我们构建了新冠肺炎的SIR型模型，将易感个体的谨慎水平作为参数。我们确定了模型的基本繁殖数，分析研究了平衡的稳定性，并进行了灵敏度分析，以确认谨慎水平的重要性。通过固定所有其他参数的特定值，我们对模型的动力学进行了数值研究，随着谨慎程度的变化，揭示了平衡的后向跨临界、Hopf和鞍节点分叉，以及极限环的同宿和折叠分叉。考虑到影响印尼疫情的一些关键事件，我们设计了一个场景，其中谨慎程度随着时间的推移而变化，并表明该模型表现出滞后性，因此，谨慎程度的轻微降低可能会使无病状态变为地方病，而这只有通过谨慎程度的急剧增加才能逆转，从而从数学上证明了高度谨慎对解决疫情的重要性。©2022，校际生物数学联盟。保留所有权利。

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