Dynamics of a Stochastic Epidemic Model with Vaccination and General Incidence Rate

In this paper, we consider the dynamics of the spread of infectious diseases for a stochastic SIVS (Susceptible - Infected - Vaccinated - Susceptible) epidemic model perturbed by white noise with general incidence rate. By constructing a threshold lambda via parameters of the model, we can give conditions to determine whenever the disease is extinct or permanent. Precisely, it is proved that lambda < 0 implies the disease-free point (S-*; 0; V-*) to be exponentially stable, i.e., the disease will eventually disappear with an exponential rate meanwhile lambda > 0 shows that the epidemic exists permanently in the population.