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Application of piecewise fractional differential equation to COVID-19 infection dynamics

Xiaoping Li, Haifaa F. Alrihieli, Ebrahem A. Algehyne, Muhammad Altaf Khan, Mohammad Y. Alshahrani, Yasser Alraey, Muhammad Bilal Riaz

2022Results in Physics23 citationsDOIOpen Access PDF

Abstract

We proposed a new mathematical model to study the COVID-19 infection in piecewise fractional differential equations. The model was initially designed using the classical differential equations and later we extend it to the fractional case. We consider the infected cases generated at health care and formulate the model first in integer order. We extend the model into Caputo fractional differential equation and study its background mathematical results. We show that the fractional model is locally asymptotically stable when R0<1 at the disease-free case. For R0≤1, we show the global asymptotical stability of the model. We consider the infected cases in Saudi Arabia and determine the parameters of the model. We show that for the real cases, the basic reproduction is R0≈1.7372. We further extend the Caputo model into piecewise stochastic fractional differential equations and discuss the procedure for its numerical simulation. Numerical simulations for the Caputo case and piecewise models are shown in detail.

Topics & Concepts

Coronavirus disease 2019 (COVID-19)Dynamics (music)PiecewiseSevere acute respiratory syndrome coronavirus 2 (SARS-CoV-2)2019-20 coronavirus outbreakDifferential equationFractional calculusApplied mathematicsMathematicsPhysicsMathematical analysisMedicineVirologyInfectious disease (medical specialty)OutbreakAcousticsPathologyDiseaseFractional Differential Equations SolutionsMathematical and Theoretical Epidemiology and Ecology ModelsCOVID-19 epidemiological studies
Application of piecewise fractional differential equation to COVID-19 infection dynamics | Litcius