Spatial diffusion and periodic evolving of domain in an SIS epidemic model

Abstract

In order to explore the impact of periodically evolving domain on the transmission of disease, we study a SIS reaction-diffusion model with logistic term on a periodically evolving domain. The basic reproduction number R0 is given by the next generation infection operator, and relies on the evolving rate of the periodically evolving domain, diffusion coefficient of infected individuals dI and size of the space. The monotonicity of R0 with respect to dI, evolving rate (t) and interval length L are derived, and asymptotic property of R0 if dI or L is small enough or large enough in one-dimensional space are discussed. R0 as threshold can be used to characterize whether the disease-free equilibrium is stable or not. Our theoretical results and numerical simulations indicate that small evolving rate, small diffusion of infected individuals and small interval length have positive impact on prevention and control of disease.