Analysis and estimation of the COVID-19 pandemic by modified homotopy perturbation method

Garima Agarwal; Man Mohan Singh; D. L. Suthar; S. D. Purohit

doi:10.1080/27690911.2023.2279170

Applied Mathematics in Science and Engineering (Dec 2023)

Analysis and estimation of the COVID-19 pandemic by modified homotopy perturbation method

Garima Agarwal,
Man Mohan Singh,
D. L. Suthar,
S. D. Purohit

Affiliations

Garima Agarwal: Department of Mathematics and Statistic, School of Basic Sciences, Manipal University Jaipur, Jaipur, India
Man Mohan Singh: Department of Mathematics and Statistic, School of Basic Sciences, Manipal University Jaipur, Jaipur, India
D. L. Suthar: Department of Mathematics, College of Natural Sciences, Wollo University, Dessie, Ethiopia
S. D. Purohit: Department of Mathematics, Rajasthan Technical University, Kota, India

DOI: https://doi.org/10.1080/27690911.2023.2279170
Journal volume & issue: Vol. 31, no. 1

Abstract

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The Bernoulli equation is useful to assess the motility and recovery rate with respect to time in order to measure the COVID-19 outbreak. The homotopy perturbation method was applied in the current article to compute the Bernoulli equation. For the existence and uniqueness of solutions, we also used the Caputo–Fabrizio Integral and differential operators. Additionally, we conducted a corresponding investigation for derivatives of integer and fractional orders on the estimated motility and recovery rate.

Published in Applied Mathematics in Science and Engineering

ISSN: 2769-0911 (Online)
Publisher: Taylor & Francis Group
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics; Technology: Engineering (General). Civil engineering (General)
Website: https://www.tandfonline.com/journals/gipe21

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