《山东大学学报(理学版)》 ›› 2022, Vol. 57 ›› Issue (6): 84-93.doi: 10.6040/j.issn.1671-9352.0.2021.793
• • 上一篇
王艳梅1,刘桂荣2*
WANG Yan-mei1, LIU Gui-rong2*
摘要: 研究了一类带有Markov切换和饱和发生率的随机SIQS传染病模型。首先通过构造适当的Lyapunov函数,得到模型全局正解的存在唯一性;其次利用Markov链的遍历性,得到疾病灭绝和均值持久的充分条件;最后运用数值模拟验证了理论结果。结果表明,若传染病在一个状态的子系统中是随机持久的,但在另一个状态的子系统中是随机灭绝的,则传染病在混合系统中既可能随机持久也可能随机灭绝,其结果依赖于Markov链在每个状态内停留的概率。电报噪声对疾病传播具有重要的影响。隔离对疾病传播具有抑制作用,从而隔离染病者更有助于控制疾病的传播。
中图分类号:
[1] HERBERT H, MA Zhien, LIAO Shengbing. Effects of quarantine in six endemic models for infectious diseases[J]. Mathematical Biosciences, 2002, 180(1/2):141-160. [2] 马知恩, 周义仓, 王稳地, 等. 传染病动力学的数学建模与研究[M]. 北京: 科学出版社, 2004. MA Zhien, ZHOU Yicang, WANG Wendi, et al. Mathematical modeling and research of infectious disease dynamics[M]. Beijing: Science Press, 2004. [3] CHEN Junjie. Local stability and global stability of SIQS models for disease[J]. International Journal of Biomathematics, 2004, 19(1):57-64. [4] WEI Fengying, CHEN Fangxiang. Stochastic permanence of an SIQS epidemic model with saturated incidence and independent random perturbations[J]. Physica A: Statistical Mechanics and its Applications, 2016, 453:99-107. [5] YANG Xiuxiang, LI Feng, CHENG Yuanji. Global stability analysis on the dynamics of an SIQ model with nonlinear incidence rate[J]. Advances in Intelligent and Soft Computing, 2012, 160:561-565. [6] GRAY A, GREENHALGH D, HU Linfeng, et al. A stochastic differential equation SIS epidemic model[J]. SIAM Journal on Applied Mathematics, 2011, 71:876-902. [7] LIN Yuguo, JIANG Daqing. Threshold behavior in a stochastic SIS epidemic model with standard incidence[J]. Journal of Dynamics and Differential Equations, 2014, 26:1079-1094. [8] CAI Yongli, KANG Yun, WANG Weiming. A stochastic SIRS epidemic model with nonlinear incidence rate[J]. Applied Mathematics and Computation, 2017, 305:221-240. [9] LIU Qun, JIANG Daqing, HAYAT T, et al. Dynamics of a stochastic multigroup SIQR epidemic model with standard incidence rates[J]. Journal of the Franklin Institute, 2019, 356:2960-2993. [10] ZHANG Xinhong, PENG Hao. Stationary distribution of a stochastic cholera epidemic model with vaccination under regime switching[J]. Applied Mathematics Letters, 2020, 102:106095. [11] ZHANG Xinhong, JIANG Daqing, ALSAEDI A, et al. Stationary distribution of stochastic SIS epidemic model with vaccination under regime switching[J]. Applied Mathematics Letters, 2016, 59:87-93. [12] PHU N D, OREGAN D, TUONG T D. Longtime characterization for the general stochastic epidemic SIS model under regime-switching[J]. Nonlinear Analysis: Hybrid Systems, 2020, 38(3):100951. [13] MAO Xuerong, YUAN Chenggui. Stochastic differential equations with Markovian Switching[M]. London: Imperial College Press, 2006. [14] MAO Xuerong, MARION G, RENSHAW E. Environmental brownian noise suppresses explosions in population dynamics[J]. Stochastic Processes and their Applications, 2002, 97(1):95-110. [15] LI Dan, LIU Shengqiang, CUI Jingan. Threshold dynamics and ergodicity of an SIRS epidemic model with markovian switching[J]. Journal of Differential Equations, 2017, 263(12):8873-8915. |
[1] | 张道祥,胡伟,陶龙,周文. 一类具有不同发生率的双疾病随机SIS传染病模型的动力学研究[J]. 山东大学学报(理学版), 2017, 52(5): 10-17. |
|