A simplicial SSIS epidemic model with the outgoing pressure

IF 2.8 3区 物理与天体物理 Q2 PHYSICS, MULTIDISCIPLINARY Physica A: Statistical Mechanics and its Applications Pub Date : 2024-09-26 DOI:10.1016/j.physa.2024.130118
Yuyan Qin, Lixin Yang, Jia Li, Mengjiao Li, Meng Meng Du
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Abstract

A new simplicial epidemic model that considers the pressure of out-going is proposed to describe the characteristics of clustering on disease transmission more accurately. In addition, the probability evolution equations of nodes in each state are obtained by the quenched mean-field method. Furthermore, we analyze the conditions of the existence and the stability of the equilibrium points. Subsequently, the sensitivity analysis of the parameters is investigated, and it can be concluded that the degree about pairwise transmission rate has great impact on the propagation threshold. Our simulation results indicate that the system produces forward bifurcation or backward bifurcation via the one-parameter bifurcation diagram, and the bistable state of the system appears under certain conditions. Meanwhile, we obtain the transition conditions of the system from the disease-free equilibrium state to the bistable state through the divisional diagram. It is also noticed that the pressure of out-going plays a crucial role in the spreading process of diseases. On the one hand, the increasing of the pressure of out-going leads to the decreasing of the disease transmission threshold and a faster outbreak of disease. On the other hand, an increase in the individuals without the pressure of out-going causes the increasing of transmission threshold and a slower outbreak of disease.
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一个简单的 SSIS 流行病模型,带有外压
为了更准确地描述集群对疾病传播的影响,我们提出了一种新的简约流行病模型,该模型考虑了流出压力。此外,还利用淬火均值场方法得到了各状态下节点的概率演化方程。此外,我们还分析了平衡点的存在条件和稳定性。随后,研究了参数的敏感性分析,得出结论:成对传输速率对传播阈值有很大影响。仿真结果表明,通过单参数分岔图,系统会产生正向分岔或反向分岔,并在一定条件下出现系统的双稳态。同时,我们通过分叉图得到了系统从无病平衡态到双稳态的过渡条件。我们还注意到,外流压力在疾病传播过程中起着至关重要的作用。一方面,传出压力的增加会导致疾病传播阈值降低,疾病爆发速度加快。另一方面,没有出境压力的个体的增加会导致疾病传播阈值的增加和疾病爆发的减缓。
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来源期刊
CiteScore
7.20
自引率
9.10%
发文量
852
审稿时长
6.6 months
期刊介绍: Physica A: Statistical Mechanics and its Applications Recognized by the European Physical Society Physica A publishes research in the field of statistical mechanics and its applications. Statistical mechanics sets out to explain the behaviour of macroscopic systems by studying the statistical properties of their microscopic constituents. Applications of the techniques of statistical mechanics are widespread, and include: applications to physical systems such as solids, liquids and gases; applications to chemical and biological systems (colloids, interfaces, complex fluids, polymers and biopolymers, cell physics); and other interdisciplinary applications to for instance biological, economical and sociological systems.
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