A precise characterization of a Sars-Cov 2 dynamics transmission model with vaccination is presented. All the equilibria of the model as well as their stabilities have been described by use of algebraic geometry approach. The model analysis shows that the combined use of the quarantine and treatment strategy with a vaccination strategy may lead to the effective disease control or elimination.

computer algebra, Covid-19, stability analysis, vaccination, bifurcation.

Received: August 11, 2021; Accepted: December 20, 2021; Published: January 5, 2022

How to cite this article: Adamou Otto and Morou Amidou, A transmission model of Covid-19 with quarantine, treatment and vaccination, Advances in Differential Equations and Control Processes 26 (2022), 85-101. DOI: 10.17654/0974324322006

This Open Access Article is Licensed under Creative Commons Attribution 4.0 International License

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