Publications

A deterministic mathematical model was developed for the transmission dynamics of Monkeypox virus. Themodel incorporates imperfect vaccine compartment for the human sub-population. The equilibrium states of themodel equation were obtained analyzed for stability. The disease free equilibrium of the model is stable when thenumber of secondary infections as a result of the introduction of a single infected individual into a vaccinatedsusceptible population is less than unity (ROV<1). The system was shown to have one unique endemic equilibriumwhich is stable when ROV<1, this rules out the possibility of backward bifurcation, which connotes that interventionscapable of reducing the basic effective reproductive (ROV) less than unity will be sufficient to contain the infection.Numerical simulation was carried it to underscore the role of weak, medium and strong immune system on someepidemiological states, as well as the effect of infection and vaccination rates on the prevalence and susceptiblerespectively.