Global transmission dynamic of SIR model in the time of SARS-CoV-2.

Tong, Zhao-Wei; Lv, Yu-Pei; Din, Rahim Ud; Mahariq, Ibrahim; Rahmat, Gul

Tong, Zhao-Wei; Lv, Yu-Pei; Din, Rahim Ud; Mahariq, Ibrahim; Rahmat, Gul.

Tong ZW; Department of Infectious Diseases, Huzhou Central Hospital, Zhejiang, Huzhou 313000, PR China.
Lv YP; Department of Mathematics, Huzhou University, Huzhou 313000, PR China.
Din RU; Department of Mathematics, University of Malakand, Chakdara Dir(L), 18000 Khyber, Pakhtunkhwa, Pakistan.
Mahariq I; College of Engineering and Technology, American University of the Middle East, Egaila, Kuwait.
Rahmat G; Department of Mathematics, Islamia College University Peshawar, 18000 Khyber, Pakhtunkhwa, Pakistan.

Results Phys ; 25: 104253, 2021 Jun.

Article in English | MEDLINE | ID: covidwho-1230746

ABSTRACT

ABSTRACT

This current work studies a new mathematical model for SARS-CoV-2. We show how immigration, protection, death rate, exposure, cure rate and interaction of infected people with healthy people affect the population. Our model is SIR model, which has three classes including susceptible, infected and recovered respectively. Here, we find the basic reproduction number and local stability through jacobean matrix. Lyapunvo function theory is used to calculate the global stability for the problem under investigation. Also a nonstandard finite difference sachem (NSFDS) is used to simulate the results.

Keywords

Local and global stability; NSFDS; Reproduction number; SARS-CoV-2 model

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Full text: Available Collection: International databases Database: MEDLINE Language: English Journal: Results Phys Year: 2021 Document Type: Article