Litcius/Paper detail

A vigorous study of fractional order COVID-19 model via ABC derivatives

LI Xiao-ping, Hilal Al Bayatti, Anwarud Din, Anwar Zeb

2021Results in Physics47 citationsDOIOpen Access PDF

Abstract

The newly arose irresistible sickness known as the Covid illness (COVID-19), is a highly infectious viral disease. This disease caused millions of tainted cases internationally and still represent a disturbing circumstance for the human lives. As of late, numerous mathematical compartmental models have been considered to even more likely comprehend the Covid illness. The greater part of these models depends on integer-order derivatives which cannot catch the fading memory and crossover behavior found in many biological phenomena. Along these lines, the Covid illness in this paper is studied by investigating the elements of COVID-19 contamination utilizing the non-integer Atangana-Baleanu-Caputo derivative. Using the fixed-point approach, the existence and uniqueness of the integral of the fractional model for COVID is further deliberated. Along with Ulam-Hyers stability analysis, for the given model, all basic properties are studied. Furthermore, numerical simulations are performed using Newton polynomial and Adams Bashforth approaches for determining the impact of parameters change on the dynamical behavior of the systems.

Topics & Concepts

Coronavirus disease 2019 (COVID-19)Fractional calculusOrder (exchange)2019-20 coronavirus outbreakApplied mathematicsMathematicsMedicineBusinessVirologyInternal medicineDiseaseOutbreakFinanceInfectious disease (medical specialty)Fractional Differential Equations SolutionsAdvanced Control Systems DesignMathematical and Theoretical Epidemiology and Ecology Models