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On the Analytical Solution of Fractional SIR Epidemic Model

Ahmad Qazza, Rania Saadeh

2023Applied Computational Intelligence and Soft Computing29 citationsDOIOpen Access PDF

Abstract

This article presents the solution of the fractional SIR epidemic model using the Laplace residual power series method. We introduce the fractional SIR model in the sense of Caputo’s derivative; it is presented by three fractional differential equations, in which the third one depends on the first coupled equations. The Laplace residual power series method (LRPSM) is implemented in this research to solve the proposed model, in which we present the solution in a form of convergent series expansion that converges rapidly to the exact one. We analyze the results and compare the obtained approximate solutions to those obtained from other methods. Figures and tables are illustrated to show the efficiency of the LRPSM in handling the proposed SIR model.

Topics & Concepts

Laplace transformPower seriesEpidemic modelSeries (stratigraphy)ResidualFractional calculusApplied mathematicsComputer scienceConvergent seriesPower (physics)Exact solutions in general relativityCalculus (dental)MathematicsAlgorithmMathematical analysisPhysicsBiologyDentistryDemographyPaleontologySociologyPopulationQuantum mechanicsMedicineFractional Differential Equations SolutionsMathematical and Theoretical Epidemiology and Ecology ModelsStatistical Distribution Estimation and Applications
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