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A SIQ mathematical model on COVID-19 investigating the lockdown effect

Archana Singh Bhadauria, Rachana Pathak, Manisha Chaudhary

2021Infectious Disease Modelling37 citationsDOIOpen Access PDF

Abstract

This research paper aims at studying the impact of lockdown on the dynamics of novel Corona Virus Disease (COVID-19) emerged in Wuhan city of China in December 2019. Perceiving the pandemic situation throughout the world, Government of India restricted international passenger traffic through land check post (Liang, 2020) and imposed complete lockdown in the country on 24 March 2020. To study the impact of lockdown on disease dynamics we consider a three-dimensional mathematical model using nonlinear ordinary differential equations. The proposed model has been studied using stability theory of nonlinear ordinary differential equations. Basic reproduction ratio is computed and significant parameters responsible to keep basic reproduction ratio less than one are identified. The study reveals that disease vanishes from the system only if complete lockdown is imposed otherwise disease will always persist in the population. However, disease can be kept under control by implementing contact tracing and quarantine measures as well along with lockdown if lockdown is imposed partially.

Topics & Concepts

Basic reproduction numberCoronavirus disease 2019 (COVID-19)Ordinary differential equationPandemicQuarantinePopulationEpidemic modelNonlinear systemContact tracingSevere acute respiratory syndrome coronavirus 2 (SARS-CoV-2)MathematicsEconometricsGeographyComputer scienceApplied mathematicsDifferential equationDiseaseDemographyMathematical analysisBiologyPhysicsMedicineSociologyInfectious disease (medical specialty)EcologyPathologyQuantum mechanicsCOVID-19 epidemiological studiesMathematical and Theoretical Epidemiology and Ecology ModelsFractional Differential Equations Solutions
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