Mathematical modeling of optimized SIRS epidemic model and some dynamical behaviors of the solution

In this paper, a generalized mathematical model of spread of infectious disease as SIRS epidemic model is considered as a nonlinear system of differential equations. We prove that for positive initial conditions the resulting equivalence system has positive solution and under some hypotheses, this system with initial positive condition, has a positive T-periodic solution which is globally asymp- totically stable. For numerical simulations the fourth order Runge-Kutta method is applied to the nonlinear system of differential equations.