Permanence of an SIR epidemic model with density dependent birth rate and distributed time delay |
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| Authors: | Chun-Hsien Li |
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| Affiliation: | a Department of Mathematics, National Central University, Jhongli City, Taoyuan County 32001, Taiwan
b Department of Computer Science and Information Engineering, Nanya Institute of Technology, Jhongli City, Taoyuan County 32091, Taiwan |
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| Abstract: | In this paper, we investigate the permanence of an SIR epidemic model with a density-dependent birth rate and a distributed time delay. We first consider the attractivity of the disease-free equilibrium and then show that for any time delay, the delayed SIR epidemic model is permanent if and only if an endemic equilibrium exists. Numerical examples are given to illustrate the theoretical analysis. The results obtained are also compared with those from the analog system with a discrete time delay. |
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| Keywords: | SIR epidemic model Time delay Asymptotic stability Permanence |
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