THRESHOLD DYNAMICS IN A TIME-DELAYED PERIODIC SIS EPIDEMIC MODEL

被引:38
|
作者
Lou, Yijun [1 ]
Zhao, Xiao-Qiang [1 ]
机构
[1] Mem Univ Newfoundland, Dept Math, St John, NF A1C 5S7, Canada
来源
DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS-SERIES B | 2009年 / 12卷 / 01期
基金
加拿大自然科学与工程研究理事会;
关键词
Periodic epidemic model; Maturation delay; Basic reproduction ratio; Periodic solutions; Uniform persistence; MONOTONE;
D O I
10.3934/dcdsb.2009.12.169
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
The global dynamics of a periodic SIS epidemic model with maturation delay is investigated. We first obtain sufficient conditions for the single population growth equation to admit a globally attractive positive periodic solution. Then we introduce the basic reproduction ratio R-0 for the epidemic model, and show that the disease dies out when R-0 < 1, and the disease remains endemic when R-0 > 1. Numerical simulations are also provided to confirm our analytic results.
引用
收藏
页码:169 / 186
页数:18
相关论文
共 50 条
  • [41] A deterministic time-delayed SVIRS epidemic model with incidences and saturated treatment
    Kanica Goel
    Abhishek Kumar
    Journal of Engineering Mathematics, 2020, 121 : 19 - 38
  • [42] Analysis and numerical effects of time-delayed rabies epidemic model with diffusion
    Jawaz, Muhammad
    Rehman, Muhammad Aziz-Ur
    Ahmed, Nauman
    Baleanu, Dumitru
    Iqbal, Muhammad Sajid
    Rafiq, Muhammad
    Raza, Ali
    INTERNATIONAL JOURNAL OF NONLINEAR SCIENCES AND NUMERICAL SIMULATION, 2023, 24 (06) : 2179 - 2194
  • [43] A deterministic time-delayed SVIRS epidemic model with incidences and saturated treatment
    Goel, Kanica
    Kumar, Abhishek
    Nilam
    JOURNAL OF ENGINEERING MATHEMATICS, 2020, 121 (01) : 19 - 38
  • [44] Threshold dynamics for a HFMD epidemic model with periodic transmission rate
    Liu, Junli
    NONLINEAR DYNAMICS, 2011, 64 (1-2) : 89 - 95
  • [45] Threshold dynamics for a cholera epidemic model with periodic transmission rate
    Zhou, Xue-yong
    Cui, Jing-an
    APPLIED MATHEMATICAL MODELLING, 2013, 37 (05) : 3093 - 3101
  • [46] Threshold dynamics for a HFMD epidemic model with periodic transmission rate
    Junli Liu
    Nonlinear Dynamics, 2011, 64 : 89 - 95
  • [47] On the stochastic SIS epidemic model in a periodic environment
    Bacaer, Nicolas
    JOURNAL OF MATHEMATICAL BIOLOGY, 2015, 71 (02) : 491 - 511
  • [48] Nonlinear dynamics of a time-delayed epidemic model with two explicit aware classes, saturated incidences, and treatment
    Goel, Kanica
    Kumar, Abhishek
    Nilam
    NONLINEAR DYNAMICS, 2020, 101 (03) : 1693 - 1715
  • [49] A deterministic time-delayed SIR epidemic model: mathematical modeling and analysis
    Abhishek Kumar
    Kanica Goel
    Theory in Biosciences, 2020, 139 : 67 - 76
  • [50] A deterministic time-delayed SIR epidemic model: mathematical modeling and analysis
    Kumar, Abhishek
    Goel, Kanica
    Nilam
    THEORY IN BIOSCIENCES, 2020, 139 (01) : 67 - 76
12345