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| 离散的SI和SIS传染病模型的研究 | |
| 引用本文: | 李建全,娄洁,娄梅枝.离散的SI和SIS传染病模型的研究[J].应用数学和力学,2008,29(1):104-110. |
| 作者姓名: | 李建全 娄洁 娄梅枝 |
| 作者单位: | 1. 空军工程大学,应用数学物理系,西安,710051;运城学院,数学系,山西运城,040000 2. 上海大学,数学系,上海,200444 3. 河南公安高等专科学校,郑州,450052 |
| 基金项目: | 国家自然科学基金 , 国家自然科学基金 , 空军工程大学校科研和教改项目 |
| 摘 要: | 为了描述个体的死亡、染病者的恢复以及疾病的传染,引入了相应的概率.基于总种群中个体数量为常数的假设,根据染病者能否恢复分别建立了具有生命动力学的离散SI和SIS传染病模型.所得到的结果显示:它们具有与相应连续模型相同的动力学性态,并确定了各自的阈值.在它们的阈值之下,传染病最终将灭绝;在它们的阈值之上,传染病将会发展成为地方病,染病者的数量将趋向于一确定的正常数. |
| 关 键 词: | 离散传染病模型 动力学性态 不动点 稳定性 离散 传染病 连续模型 研究 Models Epidemic Discrete 地方病 发展 灭绝 阈值 力学性态 显示 结果 生命动力学 假设 常数 个体数 概率 疾病 |
| 文章编号: | 1000-0887(2008)01-0104-07 |
| 收稿时间: | 2006-09-11 |
| 修稿时间: | 2007-12-19 |
Study of Some Discrete SI and SIS Epidemic Models |
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| LI Jian-quan,LOU Jie,LOU Mei-zhi.Study of Some Discrete SI and SIS Epidemic Models[J].Applied Mathematics and Mechanics,2008,29(1):104-110. | |
| Authors: | LI Jian-quan LOU Jie LOU Mei-zhi |
| Abstract: | The probability is introduced to formulate the death of individuals, the recovery of the infected individuals and incidence of epidemic disease. Based on the assumption that the number of individuals in population is a constant, discrete-time SI and SIS epidemic models with vital dynamics are established respectively corresponding to the case that the infectives can recover from the disease or not. For these two models, the results obtained show that there is the same dynamical behavior as their corresponding continuous ones. And the threshold determining its dynamical behavior is found. Below the threshold the epidemic disease dies out eventually. Above the threshold the epidemic disease becomes an endemic eventually. The number of the infectives approaches a positive constant. |
| Keywords: | discrete epidemic model dynamical behavior fixed point stability |
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