Global dynamics for a class of discrete SEIRS epidemic models with general nonlinear incidence

Xiaolin Fan; Lei Wang; Zhidong Teng

doi:10.1186/s13662-016-0846-y

Global dynamics for a class of discrete SEIRS epidemic models with general nonlinear incidence

Adv Differ Equ. 2016;2016(1):123. doi: 10.1186/s13662-016-0846-y. Epub 2016 May 6.

Authors

Xiaolin Fan^{1

2}, Lei Wang³, Zhidong Teng¹

Affiliations

¹ 1College of Mathematics and System Sciences, Xinjiang University, Urumqi, 830046 People's Republic of China.
² 2Department of Basic Education, Xinjiang Institute of Engineering, Urumqi, 830091 People's Republic of China.
³ 3Department of Medical Engineering and Technology, Xinjiang Medical University, Urumqi, 830054 People's Republic of China.

Abstract

In this paper, a class of discrete SEIRS epidemic models with general nonlinear incidence is investigated. Particularly, a discrete SEIRS epidemic model with standard incidence is also considered. The positivity and boundedness of solutions with positive initial conditions are obtained. It is shown that if the basic reproduction number $R_{0} \leq 1$ , then disease-free equilibrium is globally attractive, and if $R_{0} > 1$ , then the disease is permanent. When the model degenerates into SEIR model, it is proved that if $R_{0} > 1$ , then the model has a unique endemic equilibrium, which is globally attractive. Furthermore, the numerical examples verify an important open problem that when $R_{0} > 1$ , the endemic equilibrium of general SEIRS models is also globally attractive.

Keywords: basic reproduction number; discrete SEIRS epidemic model; global attractivity; nonlinear incidence; permanence.