| 具有周期传染率的SIR传染病模型的周期解 |
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| 引用本文: | 胡新利,周义仓. 具有周期传染率的SIR传染病模型的周期解[J]. 生物数学学报, 2008, 23(1): 91-100 |
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| 作者姓名: | 胡新利 周义仓 |
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| 作者单位: | 西安交通大学,理学院,陕西,西安710049 |
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| 摘 要: | 考虑了具有周期传染率的SIR流行病模型,定义了基本再生数^-R0=β/(μ+γ),分析了该模型的动力学性态,证明了当^-R0〈1时无病平衡点是全局稳定的;^-R0〉1时,无病平衡点是不稳定的,模型至少存在一个周期解。对小振幅的周期传染率模型,给出了模型周期解的近似表达式,证明了该周期解的稳定性,最后做了数值模拟,结果显示周期解可能是全局稳定的。
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| 关 键 词: | 周期传染率 重合度 周期解 |
| 文章编号: | 1001-9626(2008)01-0091-10 |
| 修稿时间: | 2006-10-17 |
The Periodic Solution of a SIR Epidemic Model with Periodic Infection Rate |
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| HU Xin-li,ZHOU Yi-cang. The Periodic Solution of a SIR Epidemic Model with Periodic Infection Rate[J]. Journal of Biomathematics, 2008, 23(1): 91-100 |
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| Authors: | HU Xin-li ZHOU Yi-cang |
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| Affiliation: | HU Xin-li ZHOU Yi-ca,ng (Science College, Xi'an diaotong University, Xi'an Shanxi 710049 China) |
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| Abstract: | In this paper a SIR model with periodic infection rate β(t) is studied. The basic reproductive number ^-R0= β/(μ+γ) is defined. The dynamical behavior of the model is analyzed. It is proved that the disease free equilibrium is globally stable if ^-R0〈 1. The disease free equilibrium is unstable when ^-R0〉 1. The existence of the periodic solution is investigated, and it is proved that the periodic model has at least one periodic solution if ^-R0〉 1. The unique- ness and stability of the periodic solution for sufficient small periodicity is obtained. We have the conjecture that the periodic endemic sohltion is globally stable when ^-R0〉 1. The numerical simulation suooorts our conjecture. |
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| Keywords: | Periodic infection rate Coincidence degree Periodic solution |
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