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Analysis of fractional COVID‐19 epidemic model under Caputo operator

Rahat Zarin, Amir Khan, Abdullahi Yusuf, S. Abdel‐Khalek

2021Mathematical Methods in the Applied Sciences32 citationsDOIOpen Access PDF

Abstract

The article deals with the analysis of the fractional COVID-19 epidemic model (FCEM) with a convex incidence rate. Keeping in view the fading memory and crossover behavior found in many biological phenomena, we study the coronavirus disease by using the noninteger Caputo derivative (CD). Under the Caputo operator (CO), existence and uniqueness for the solutions of the FCEM have been analyzed using fixed point theorems. We study all the basic properties and results including local and global stability. We show the global stability of disease-free equilibrium using the method of Castillo-Chavez, while for disease endemic, we use the method of geometrical approach. Sensitivity analysis is carried out to highlight the most sensitive parameters corresponding to basic reproduction number. Simulations are performed via first-order convergent numerical technique to determine how changes in parameters affect the dynamical behavior of the system.

Topics & Concepts

MathematicsUniquenessOperator (biology)Epidemic modelBasic reproduction numberFractional calculusApplied mathematicsStability (learning theory)Coronavirus disease 2019 (COVID-19)Equilibrium pointMathematical analysisDiseaseComputer scienceInfectious disease (medical specialty)Differential equationMedicineChemistryGeneTranscription factorPopulationEnvironmental healthBiochemistryMachine learningPathologyRepressorFractional Differential Equations SolutionsMathematical and Theoretical Epidemiology and Ecology ModelsNonlinear Differential Equations Analysis
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