Title of article
On a Nonlinear Fractional-Order Model of COVID-19 Under AB-Fractional Derivative
Author/Authors
Aydogan, S.M Istanbul Technical University , Hussain, A University of Sargodha , Sakar, F.M Dicle University
Pages
31
From page
1
To page
31
Abstract
In this paper, we present a BOX mathematical model for
the release of COVID-19.We intend to generalize the model to fractional
order derivative in Atangana-Baleanu sense and to show the existence
of solution for the fractional model using Schaefer's xed point theorem
and for the uniqueness of solution we make use of Banach xed point
theorem. By using Shehu transform and Picard successive iterative
procedure, we explore the iterative solutions and its stability for the
considered fractional model. Given the beginning of a new wave of
COVID-19 spread in Indonesia, we present a numerical simulation to
study and predict the spread of the disease in this country.
Keywords
Shehu transform , novel coronavirus (nCoV-2019) , Fractional Atangana Baleanu derivative
Journal title
Journal of Mathematical Extension(IJME)
Serial Year
2021
Record number
2688367
Link To Document