Nonstandard Finite Difference Method Of Modelling Zoonotic Diseases
No Thumbnail Available
Date
2022
Journal Title
Journal ISSN
Volume Title
Publisher
Abstract
Zoonotic diseases are mostly the leading causes of illness and deaths in Sub-Saharan Africa but efforts
to combat the spread of these diseases has always been a challenge. Incidence of zoonotic diseases has reduced
substantially in most parts of Africa as a result of rigorous vaccination campaigns. However, zoonotic diseases
still remain a threat to developing nations. Zoonotic diseases can be contracted either by direct contact, food and
water. In this paper, we developed and analysed a general model that explains the dynamics of zoonotic diseases
and analysed it using nonstantard finite difference approach. This scheme was used for the model analysis. The
disease free equilibrium of the scheme in its explicit form was determined and it was both locally and globally
asymptotically stable. Bifurcation and multiple equilibria as well as the threshold value for disease transmission
was determined. An analysis of the effects of contact between susceptible and infected animals as well susceptible
and infected humans was conducted. It showed an increase in infected animals and humans whenever the contact
rate increases and decreases otherwise. The epidemiological implication is that zoonotic disease can be controlled by ensuring that interactions between susceptible humans, infected animals and infected humans is reduced to the
bearest minimum.
Description
Research Article
Keywords
zoonotic disease, reproductive rate, nonstandard finite difference, stability, bifurcation