Dynamical behavior of a vector-host epidemic model with demographic structure

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Abstract

In the paper, we propose a model that tracks the dynamics of many diseases spread by vectors, such as malaria, dengue, or West Nile virus (all spread by mosquitoes). Our model incorporates demographic structure with variable population size which is described by nonlinear birth rate and linear death rate. The stability of the system is analyzed for the existence of the disease-free and endemic equilibria points. We find the basic reproduction number R0 in terms of measurable epidemiological and demographic parameters is the threshold condition that determines the dynamics of disease infection: if R0<1 the disease fades out, and for R0>1 the disease remains endemic. The threshold condition provides important guidelines for accessing control of the vector diseases, and implies that it is an efficient way to halt the spread of vector epidemic by reducing the carrying capacity of the environment for the vector and the host. Moreover, sufficient conditions are also obtained for the global stability of the unique endemic equilibrium E.

Keywords

Vector-host
Epidemic model
Global stability
Nonlinear birth
The reproduction number

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The research of this paper is supported by the National Natural Science Foundation of China (No. 10801074).