The stability of an SIR epidemic model with time delays

被引:0
|
作者
Jin, Z [1 ]
Ma, Z
机构
[1] N Univ China, Dept Math, Taiyuan 030051, Peoples R China
[2] Xian Jiaotong Univ, Dept Appl Math, Xian 710049, Peoples R China
来源
MATHEMATICAL BIOSCIENCES AND ENGINEERING | 2006年 / 3卷 / 01期
关键词
SIR epidemic model; time delay; global asymptotic stability; Lyapunov functional;
D O I
暂无
中图分类号
Q [生物科学];
学科分类号
07 ; 0710 ; 09 ;
摘要
In this paper, an SIR epidemic model for the spread of an infectious disease transmitted by direct contact among humans and vectors (mosquitoes) which have an incubation time to become infectious is formulated. It is shown that a disease-free equilibrium point is globally stable if no endemic equilibrium point exists. Further, the endemic equilibrium point (if it exists) is globally stable with respect to a "weak delay". Some known results are generalized.
引用
收藏
页码:101 / 109
页数:9
相关论文
共 50 条
  • [1] Delay-independent stability of an SIR epidemic model with two time delays
    Song, Mei
    Liu, Guangchen
    Dong, Zhen
    [J]. DYNAMICS OF CONTINUOUS DISCRETE AND IMPULSIVE SYSTEMS-SERIES A-MATHEMATICAL ANALYSIS, 2006, 13 : 315 - 318
  • [2] Permanence of an SIR epidemic model with distributed time delays
    Ma, WB
    Takeuchi, Y
    Hara, T
    Beretta, E
    [J]. TOHOKU MATHEMATICAL JOURNAL, 2002, 54 (04) : 581 - 591
  • [3] Global stability of an SIR epidemic model with time delay
    Ma, WB
    Mei, S
    Takeuchi, Y
    [J]. APPLIED MATHEMATICS LETTERS, 2004, 17 (10) : 1141 - 1145
  • [4] Global Stability of an SIS Epidemic Model with Time Delays
    Zhan, Liping
    Wang, Huinan
    [J]. PROCEEDINGS OF THE 6TH CONFERENCE OF BIOMATHEMATICS, VOLS I AND II: ADVANCES ON BIOMATHEMATICS, 2008, : 834 - 837
  • [5] Local stability of an SIR epidemic model and effect of time delay
    Tchuenche, Jean M.
    Nwagwo, Alexander
    [J]. MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2009, 32 (16) : 2160 - 2175
  • [6] Stability of epidemic model with time delays influenced by stochastic perturbations
    Beretta, E
    Kolmanovskii, V
    Shaikhet, L
    [J]. MATHEMATICS AND COMPUTERS IN SIMULATION, 1998, 45 (3-4) : 269 - 277
  • [7] Local exponential Stability of an SIS Epidemic Model with Time Delays
    Zhang, Li-ping
    Wang, Hui-nan
    [J]. PROCEEDINGS OF 2008 INTERNATIONAL PRE-OLYMPIC CONGRESS ON COMPUTER SCIENCE, VOL II: INFORMATION SCIENCE AND ENGINEERING, 2008, : 413 - 415
  • [8] Delay-independent Stability of an SIR Epidemic Model with Time Delay
    Song, Mei
    Liu, Guangchen
    Li, Zhaohui
    Wu, Haiyan
    [J]. PROCEEDINGS OF THE 6TH CONFERENCE OF BIOMATHEMATICS, VOLS I AND II: ADVANCES ON BIOMATHEMATICS, 2008, : 389 - 392
  • [9] BIFURCATION AND STABILITY ANALYSIS OF A DISCRETE TIME SIR EPIDEMIC MODEL WITH VACCINATION
    Gumus, Ozlem A. K.
    Selvam, A. George Maria
    Vianny, D. Abraham
    [J]. INTERNATIONAL JOURNAL OF ANALYSIS AND APPLICATIONS, 2019, 17 (05): : 809 - 820
  • [10] GLOBAL STABILITY AND BIFURCATION ANALYSIS OF A DISCRETE TIME SIR EPIDEMIC MODEL
    Gumus, Ozlem Ak
    Cui, Qianqian
    Selvam, George Maria
    Vianny, Abraham
    [J]. MISKOLC MATHEMATICAL NOTES, 2022, 23 (01) : 193 - 210
12345