Abstract
In this research work, we construct an epidemic model to understand COVID-19 transmission vaccination and therapy considerations. The model's equilibria were examined, and the reproduction parameter was calculated via a next-generation matrix method, symbolized by R0. We have shown that the infection-free steady state of our system is locally asymptotically stable for R0 < 1. Also, the local asymptotic stability of the endemic steady state has been established for R0 > 1. We have used a partial rank correlation coefficient method for sensitivity analysis of the threshold parameter R0. The contribution of vaccination to the threshold parameter is explored through graphical results. In addition to this, the uniqueness and existence of the solution to the postulated model of COVID-19 infection is shown. We ran various simulations of the proposed COVID-19 dynamics with varied input parameters to scrutinize the complex dynamics of COVID-19 infection. We illustrated the key factors of the system are visualized for the public health officials for the control of the infection.