无症状个体、接种疫苗和返家感染COVID-19的数学模型

Hariyanto, C. Imron, S. Wahyudi, Nur Asiyah
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引用次数: 0

摘要

本文建立了基于未监测无症状个体、疫苗接种和返乡个体对COVID - 19传播影响的数学模型。使用的概念是,个体人口在3个区域移动,每个区域有一个接口或一条连接路线。个体的运动用权函数表示,在建模中使用正态群的核密度函数。得到的数学模型是由3个区域子模型和一个完整的区域系统模型组成的积分-偏微分方程组。为了获得适合所发生现象的模型验证,进行了莱比锡常数分析。©2022作者。
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A mathematical model for the spread of COVID-19 with unmonitored individual asymptomatic, vaccinations and returning home
This paper presents a mathematical model based on the influence of unmonitored asymptomatic individuals, vaccinations and individuals returning home to the spread of COVID 19. The concept used is that individual populations moves in 3 regions with each region having 1 interface or 1 connecting route. Individual movement is expressed by a weight function which in modeling use the Kernel density function in the normal group. The mathematical model obtained is in the form of a System of Integro-Partial Differential Equations consisting of 3 regional sub-models and an entire regional system model. Leipzig constant analysis was carried out in order to obtain model validation that was suitable for the phenomenon that occurred. © 2022 Author(s).
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