1. Stability Analysis and Existence of Solutions for a Modified SIRD Model of COVID-19 with Fractional Derivatives
- Author
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Farid Nouioua, Nacereddine Hammami, Bilal Basti, Noureddine Benhamidouche, Rabah Djemiat, and Imadeddine Berrabah
- Subjects
Physics and Astronomy (miscellaneous) ,Coronavirus disease 2019 (COVID-19) ,General Mathematics ,Population ,Fixed-point theorem ,0102 computer and information sciences ,Stability result ,system ,01 natural sciences ,Stability (probability) ,Hadamard transform ,QA1-939 ,Computer Science (miscellaneous) ,Applied mathematics ,Quantitative Biology::Populations and Evolution ,Uniqueness ,0101 mathematics ,education ,Mathematics ,education.field_of_study ,pandemic ,010102 general mathematics ,existence ,COVID-19 ,fractional derivative ,uniqueness ,Fractional calculus ,010201 computation theory & mathematics ,Chemistry (miscellaneous) ,SIRD model - Abstract
This paper discusses and provides some analytical studies for a modified fractional-order SIRD mathematical model of the COVID-19 epidemic in the sense of the Caputo–Katugampola fractional derivative that allows treating of the biological models of infectious diseases and unifies the Hadamard and Caputo fractional derivatives into a single form. By considering the vaccine parameter of the suspected population, we compute and derive several stability results based on some symmetrical parameters that satisfy some conditions that prevent the pandemic. The paper also investigates the problem of the existence and uniqueness of solutions for the modified SIRD model. It does so by applying the properties of Schauder’s and Banach’s fixed point theorems.
- Published
- 2021
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