A spatial SIS model with Holling II incidence rate

A diffusive SIS epidemic model with Holling II incidence rate is studied in this paper. We introduce the basic reproduction number R-0 first. Then the existence of endemic equilibrium (EE) can be determined by the sizes of R-0 as well as the diffusion rates of susceptible and infected individuals. We also investigate the effect of diffusion rates on asymptotic profile of EE. Our results conclude that the infected population will die out if the diffusion rate of susceptible individuals is small and the total population N is below a certain level; while the two populations persist eventually if at least one of the diffusion rates of the susceptible and infected individuals is large.