In this research work, we present a mathematical model for novel coronavirus-19 infectious disease which consists of three different compartments: susceptible, infected, and recovered under convex incident rate involving immigration rate. We first derive the formulation of the model. Also, we give some qualitative aspects for the model including existence of equilibriums and its stability results by using various tools of nonlinear analysis. Then, by means of the nonstandard finite difference scheme (NSFD), we simulate the results for the data of Wuhan city against two different sets of values of immigration parameter. By means of simulation, we show how protection, exposure, death, and cure rates affect the susceptible, infected, and recovered population with the passage of time involving immigration. On the basis of simulation, we observe the dynamical behavior due to immigration of susceptible and infected classes or one of these two.
【저자키워드】 mathematical model, Novel coronavirus-19, Nonstandard finite difference scheme, Immigration rate, 【초록키워드】 Infectious disease, stability, Wuhan, Research, death, Analysis, parameter, Affect, susceptible, observé, mathematical, 【제목키워드】 COVID-19, Transmission dynamics, mathematical,