New applications related to Covid-19

Ali Akgül; Nauman Ahmed; Ali Raza; Zafar Iqbal; Muhammad Rafiq; Dumitru Baleanu; Muhammad Aziz-Ur Rehman

doi:10.1016/j.rinp.2020.103663

New applications related to Covid-19

Results Phys. 2021 Jan:20:103663. doi: 10.1016/j.rinp.2020.103663. Epub 2020 Dec 19.

Authors

Ali Akgül¹, Nauman Ahmed^{2

3}, Ali Raza⁴, Zafar Iqbal^{2

3}, Muhammad Rafiq⁵, Dumitru Baleanu^{6

7

8}, Muhammad Aziz-Ur Rehman²

Affiliations

¹ Siirt University, Art and Science Faculty, Department of Mathematics, TR-56100 Siirt, Turkey.
² University of Management and Technology, Lahore, Pakistan, The University of Lahore, Lahore, Pakistan.
³ Department of Mathematics and statistics, The University of Lahore, Lahore, Pakistan.
⁴ Faculty of Computing, National College of Business Administration and Economics, Lahore, Pakistan.
⁵ Department of Mathematics, Faculty of Sciences, University of Central Punjab, Lahore, Pakistan.
⁶ Department of Mathematics, Cankaya University, 06530 Balgat, Ankara, Turkey.
⁷ Institute of Space Sciences, R76900 Magurele-Bucharest, Romania.
⁸ Department of Medical Research, China Medical University, Taichung 40402, Taiwan.

Abstract

Analysis of mathematical models projected for COVID-19 presents in many valuable outputs. We analyze a model of differential equation related to Covid-19 in this paper. We use fractal-fractional derivatives in the proposed model. We analyze the equilibria of the model. We discuss the stability analysis in details. We apply very effective method to obtain the numerical results. We demonstrate our results by the numerical simulations.

Keywords: Covid-19; Fractal fractional derivative; Numerical simulations; Stability analysis.