具有暴露者和感染者不同发病率的SEIR模型的动态分析

Dynamic analysis of an SEIR model with distinct incidence for exposed and infectives.

作者信息

Li Junhong, Cui Ning

机构信息

Department of Mathematics and Sciences, Hebei Institute of Architecture and Civil Engineering, Zhangjiakou, Hebei 075000, China.

出版信息

ScientificWorldJournal. 2013 May 26;2013:871393. doi: 10.1155/2013/871393. Print 2013.

DOI:10.1155/2013/871393

PMID:23766718

原文链接:https://pmc.ncbi.nlm.nih.gov/articles/PMC3677621/

Abstract

An SEIR model with vaccination strategy that incorporates distinct incidence rates for the exposed and the infected populations is studied. By means of Lyapunov function and LaSalle's invariant set theorem, we proved the global asymptotical stable results of the disease-free equilibrium. The sufficient conditions for the global stability of the endemic equilibrium are obtained using the compound matrix theory. Furthermore, the method of direct numerical simulation of the system shows that there is a periodic solution, when the system has three equilibrium points.

摘要

研究了一种具有疫苗接种策略的SEIR模型，该模型考虑了暴露人群和感染人群的不同发病率。通过Lyapunov函数和LaSalle不变集定理，证明了无病平衡点的全局渐近稳定性。利用复合矩阵理论得到了地方病平衡点全局稳定性的充分条件。此外，系统的直接数值模拟方法表明，当系统有三个平衡点时，存在一个周期解。

https://cdn.ncbi.nlm.nih.gov/pmc/blobs/e433/3677621/241acdd59cb9/TSWJ2013-871393.001.jpg

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具有暴露者和感染者不同发病率的SEIR模型的动态分析

Dynamic analysis of an SEIR model with distinct incidence for exposed and infectives.

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