Modeling and analyzing competitive epidemic diseases with partial and waning virus-specific and cross-immunity

IF 1.8 Q3 AUTOMATION & CONTROL SYSTEMS

IFAC Journal of Systems and Control Pub Date : 2024-05-10 DOI:10.1016/j.ifacsc.2024.100262

Lorenzo Zino , Mengbin Ye , Brian D.O. Anderson

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Abstract

In this paper, we consider a novel mathematical modeling framework for the spread of two competitive diseases in a well-mixed population. The proposed framework, which we term a bivirus SIRIS model, encapsulates key real-world features of natural immunity, accounting for different levels of (partial and waning) virus-specific and cross protection acquired after recovery. Formally, the proposed framework consists of a system of coupled nonlinear ordinary differential equations that builds on a classical bivirus susceptible–infected–susceptible model by means of the addition of further states to account for (temporarily) protected individuals. Through the analysis of the proposed framework and of two specializations, we offer analytical insight into how natural immunity can shape a wide range of complex emergent behaviors, including eradication of both diseases, survival of the fittest one, or even steady-state co-existence of the two diseases.

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模拟和分析具有部分和减弱病毒特异性和交叉免疫的竞争性流行疾病

本文针对两种竞争性疾病在混合良好的人群中的传播，提出了一种新颖的数学建模框架。我们所提出的框架被称为双病毒 SIRIS 模型，它概括了现实世界中自然免疫的主要特征，考虑了不同程度的（部分和减弱的）病毒特异性保护和恢复后获得的交叉保护。从形式上看，所提出的框架由一个耦合非线性常微分方程系统组成，该系统建立在经典的双病毒易感-感染-易感模型基础上，通过增加进一步的状态来解释（暂时）受保护的个体。通过对所提出的框架和两种特殊情况的分析，我们深入分析了自然免疫如何塑造各种复杂的突发行为，包括两种疾病的根除、适者生存，甚至两种疾病的稳态共存。

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

IFAC Journal of Systems and Control AUTOMATION & CONTROL SYSTEMS-

CiteScore

3.70

自引率

5.30%

发文量