集合种群
非线性系统
流行病模型
计算机科学
财产(哲学)
统计物理学
马尔可夫链
比例(比率)
马尔可夫过程
数学优化
计量经济学
分布式计算
数学
地理
物理
社会学
统计
哲学
机器学习
人口学
认识论
量子力学
地图学
生物扩散
人口
作者
Yanting Li,Xiaoqun Wu,Su Zhong,Zhenghua Huang
出处
期刊:Chaos
[American Institute of Physics]
日期:2023-08-01
卷期号:33 (8)
被引量:1
摘要
Recently, there has been a lot of discussion about the nonlinearity property of contagion processes in epidemic spreading on social networks with various structures. In this paper, we propose a nonlinear contagion model in networked metapopulations to investigate the critical behavior of epidemics with recurrent mobility patterns. First, we build up a discrete-time Markovian chain model to formulate the spreading of susceptible-infected-susceptible-like diseases. Additionally, we develop a practicable framework to analyze the impact of mobility on the epidemic threshold and derive the theoretical condition for the transition of an epidemic from a local to a global scale. This transition is associated with multiple discontinuous phase changes. We validate our analytical results through extensive numerical simulations on both regular and heterogeneous networks. Our findings offer a useful tool to discuss the implementation of prevention strategies such as quarantine and lockdown.
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