Please use this identifier to cite or link to this item: http://ir.futminna.edu.ng:8080/jspui/handle/123456789/15301
Title: Mathematical model of COVID-19 transmission dynamics incorporating booster vaccine program and environmental contamination
Authors: Akinwande, N. I.
Ashezua, T. T.
Gweryina, R. I.
Somma, S. A.
Oguntolu, F. A.
Usman, A.
Abdurrahman, O. N.
Kaduna, F. S.
Adajime, T. P.
Kuta, F. A.
Abdulrahman, S.
Olayiwola, R. O.
Enagi, A. I.
Bolarin, G. A.
Shehua, M. D.
Keywords: COVID-19
Booster vaccine program
Environmental contamination
Bifurcation
Optimal control analysis
Issue Date: 2-Nov-2022
Publisher: Elsevier Ltd.
Citation: N. I. Akinwande, T. T. Ashezua, R. I. Gweryina, S. A. Somma, F. A. Oguntolu, A. Usman, O. N. Abdurrahman, F. S. Kaduna, T. P. Adajime, F. A. Kuta, S. Abdulrahman, R. O. Olayiwola, A. I. Enagi, G. A. Bolarin & M. D. Shehua. (2022). Mathematical model of COVID-19 transmission dynamics incorporating booster vaccine program and environmental contamination. Heliyon, e11513.
Abstract: COVID-19 is one of the greatest human global health challenges that causes economic meltdown of many nations. In this study, we develop an SIR-type model which captures both human-to-human and environment-to-humanto-environment transmissions that allows the recruitment of corona viruses in the environment in the midst of booster vaccine program. Theoretically, we prove some basic properties of the full model as well as investigate the existence of SARS-CoV-2-free and endemic equilibria. The SARS-CoV-2-free equilibrium for the special case, where the constant inflow of corona virus into the environment by any other means, Ω is suspended (Ω = 0) is globally asymptotically stable when the effective reproduction number 𝑅0𝑐 < 1 and unstable if otherwise. Whereas in the presence of free-living Corona viruses in the environment (Ω > 0), the endemic equilibrium using the centre manifold theory is shown to be stable globally whenever 𝑅0𝑐 > 1. The model is extended into optimal control system and analyzed analytically using Pontryagin’s Maximum Principle. Results from the optimal control simulations show that strategy E for implementing the public health advocacy, booster vaccine program, treatment of isolated people and disinfecting or fumigating of surfaces and dead bodies before burial is the most effective control intervention for mitigating the spread of Corona virus. Importantly, based on the available data used, the study also revealed that if at least 70% of the constituents followed the aforementioned public health policies, then herd immunity could be achieved for COVID-19 pandemic in the community.
URI: https://www.sciencedirect.com/science/article/pii/S2405844022028018
http://repository.futminna.edu.ng:8080/jspui/handle/123456789/15301
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