Open AccessAnalysis of COVID-19 epidemic model with sumudu transform
Author(s) -
Muhammad Farman,
AUTHOR_ID,
Muhammad Azeem,
Muhammad Ozair Ahmad
Publication year - 2022
Publication title -
aims public health
Language(s) - English
Resource type - Journals
ISSN - 2327-8994
DOI - 10.3934/publichealth.2022022
Subject(s) - uniqueness , mathematics , epidemic model , quarantine , order (exchange) , covid-19 , function (biology) , operator (biology) , mathematical analysis , infectious disease (medical specialty) , disease , economics , medicine , population , finance , pathology , evolutionary biology , biology , biochemistry , chemistry , environmental health , repressor , gene , transcription factor
In this paper, we develop a time-fractional order COVID-19 model with effects of disease during quarantine which consists of the system of fractional differential equations. Fractional order COVID-19 model is investigated with ABC technique using sumudu transform. Also, the deterministic mathematical model for the quarantine effect is investigated with different fractional parameters. The existence and uniqueness of the fractional-order model are derived using fixed point theory. The sumudu transform can keep the unity of the function, the parity of the function, and has many other properties that are more valuable. Solutions are derived to investigate the influence of fractional operator which shows the impact of the disease during quarantine on society.