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Studying of COVID-19 fractional model: Stability analysis

Sanaa L. Khalaf, Mohammed S. Kadhim, Ayad R. Khudair

2022Partial Differential Equations in Applied Mathematics44 citationsDOIOpen Access PDF

Abstract

This article focuses on the recent epidemic caused by COVID-19 and takes into account several measures that have been taken by governments, including complete closure, media coverage, and attention to public hygiene. It is well known that mathematical models in epidemiology have helped determine the best strategies for disease control. This motivates us to construct a fractional mathematical model that includes quarantine categories as well as government sanctions. In this article, we prove the existence and uniqueness of positive bounded solutions for the suggested model. Also, we investigate the stability of the disease-free and endemic equilibriums by using the basic reproduction number (BRN). Moreover, we investigate the stability of the considering model in the sense of Ulam-Hyers criteria. To underpin and demonstrate this study, we provide a numerical simulation, whose results are consistent with the analysis presented in this article.

Topics & Concepts

UniquenessStability (learning theory)Closure (psychology)Bounded functionConstruct (python library)Government (linguistics)Epidemic modelBasic reproduction numberCoronavirus disease 2019 (COVID-19)Mathematical economicsSanctionsMathematicsApplied mathematicsComputer scienceEconometricsCalculus (dental)DiseaseMedicineEconomicsPolitical scienceEnvironmental healthInfectious disease (medical specialty)Mathematical analysisPopulationPathologyProgramming languageDentistryMachine learningLawPhilosophyMarket economyLinguisticsFractional Differential Equations SolutionsMathematical and Theoretical Epidemiology and Ecology ModelsNonlinear Differential Equations Analysis
Studying of COVID-19 fractional model: Stability analysis | Litcius