MATHEMATICAL MODELLING AND STABILITY ANALYSIS OF MONKEY POX TRANSMISSION DYNAMICS IN NIGERIA

Authors

Keywords:

Monkey Pox, Non-linear Differential Equations, Jacobian Matrix, Maple21, SITR-SIR, Nigeria

Abstract

In this paper, we proposed a mathematical model for monkey pox disease dynamics. This model is divided into two sub-population which is a system of non-linear differential equations. It is made up of seven (7) compartments such as the Susceptible, the Infectious, the Treatment, the Recovery, the Susceptible, the Infectious, and the Recovery (SITR-SIR). The model is formulated with the aid of a schematic diagram using appropriate parameters. The model analysis was carried out to show the feasible region, the disease-free equilibrium points, the basic reproduction number, and the local stability of the model. The model was solved to show the effect of the parameters.

Dimensions

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Published

09-11-2023

How to Cite

MATHEMATICAL MODELLING AND STABILITY ANALYSIS OF MONKEY POX TRANSMISSION DYNAMICS IN NIGERIA. (2023). FUDMA JOURNAL OF SCIENCES, 7(5), 247-257. https://doi.org/10.33003/fjs-2023-0705-2017

Issue

Vol. 7 No. 5 (2023): FUDMA Journal of Sciences - Vol. 7 No. 5

Section

Research Articles
Copyright & Licensing

FUDMA Journal of Sciences

How to Cite

MATHEMATICAL MODELLING AND STABILITY ANALYSIS OF MONKEY POX TRANSMISSION DYNAMICS IN NIGERIA. (2023). FUDMA JOURNAL OF SCIENCES, 7(5), 247-257. https://doi.org/10.33003/fjs-2023-0705-2017