On the Global Stability Analysis of Corona Virus Disease (COVID-19) Mathematical Model
William Atokolo *
Department of Mathematical Sciences, Kogi State University, Anyigba, Kogi State, Nigeria.
Achonu Omale Joseph
Department of Mathematical Sciences, Kogi State University, Anyigba, Kogi State, Nigeria.
Rose Veronica Paul
Department of Mathematical Sciences, Kogi State University, Anyigba, Kogi State, Nigeria.
Abdul Sunday
Department of Mathematics, Kogi State College of Education, Ankpa, Kogi State, Nigeria.
Thomas Ugbojoide Onoja
Department of Mathematical Sciences, Kogi State University, Anyigba, Kogi State, Nigeria.
*Author to whom correspondence should be addressed.
Abstract
In this present work, we investigated the Global Stability Analysis of Corona virus disease model formulated by Atokolo et al in [11]. The COVID‑19 pandemic, also known as the coronavirus pandemic, is an ongoing pandemic that is ravaging the whole world. By constructing a Lyapunov function, we investigated the stability of the model Endemic Equilibrium state to be globally asymptotically stable. This results epidemiologically implies that the COVID-19 will invade the population in respective of the initial conditions (population) considered.
Keywords: Corona virus disease, global, stability