JIAO Jian-jun, CHEN Lan-sun, Juan J. Nieto, Torres Angela. Permanence and Global Attractivity of a Stage-Structured Predator-Prey Model With Continuous Harvesting on Predator and Impulsive Stocking on Prey[J]. Applied Mathematics and Mechanics, 2008, 29(5): 589-600.
Citation: JIAO Jian-jun, CHEN Lan-sun, Juan J. Nieto, Torres Angela. Permanence and Global Attractivity of a Stage-Structured Predator-Prey Model With Continuous Harvesting on Predator and Impulsive Stocking on Prey[J]. Applied Mathematics and Mechanics, 2008, 29(5): 589-600.

Permanence and Global Attractivity of a Stage-Structured Predator-Prey Model With Continuous Harvesting on Predator and Impulsive Stocking on Prey

  • Received Date: 2007-09-30
  • Rev Recd Date: 2008-03-18
  • Publish Date: 2008-05-15
  • A stage-structured delayed predator-prey model with impulsive stocking on prey and continuous harvesting on predator is investigated.According to the fact of biological resource management,the assumption of a predator-prey model with stage structure for predator population that each individual predator has the same ability to capture prey was improved.It was assumed that the immature individuals and the mature individuals of the predator population were divided by a fixed age and that immature predator population does not have the ability to attack prey'sufficient conditions, which guarantee the global attractivity of predator-extinction periodic solution and the permanence of the system,were obtained.The results show that the behavior of impulsive stocking on prey plays an important role for the permanence of the system,and provides tactical basis for the biological resource management.Furthermore,numerical analysis is inserted to illuminate the dynamics of the system.
  • loading
  • [1]
    Nieto J J,Rodriguez-Lopez R.Periodic boundary value problems for non-Lipschitzian impulsive functional differential equations[J].J Math Anal Appl,2006,31(8):593-610.
    [2]
    Saker S H.Oscillation and global attractivity of impulsive periodic delay respiratory dynamics model[J].Chinese Ann Math,Ser B,2005,26(4):511-522. doi: 10.1142/S0252959905000403
    [3]
    d'Onofrio A.A general framework for modeling tumor-immune system competition and immunotherapy: Mathematical analysis and biomedical inferences[J].Physica D: Nonlinear Phenomena,2005,20(8):220-235.
    [4]
    GAO Shu-jing,CHEN Lan-sun.Pulse vaccination strategy in a delayed SIR epidemic model with vertical transmission[J].Discrete and Continuous Dynamical Systems,Ser B,2007,7(1):77-86.
    [5]
    Clark C W.Mathematical Bioeconomics[M].New York:Wiley,1990.
    [6]
    JIAO Jian-jun,MENG Xin-zhu,CHEN Lan-sun.A stage-structured Holling mass defence predator-prey 3 model with impulsive perturbations on predators[J].Applied Mathematics and Computation,2007,189(2):1448-1458. doi: 10.1016/j.amc.2006.12.043
    [7]
    SON Xin-yu,LI Yong-feng.Dynamic complexities of a Holling Ⅱ two-prey one-predator system with impulsive effect[J].Chaos,Solitons and Fractals,2007,33(2):463-478. doi: 10.1016/j.chaos.2006.01.019
    [8]
    Aiello W G,Freedman H I.A time-delay model of single-species growth with stage-structure[J].Math Biosci,1990,101(2):139-153. doi: 10.1016/0025-5564(90)90019-U
    [9]
    Freedman H I,Gopalsamy K.Global stability in time-delayed single species dynamics[J].Bull Math Biol,1986,48(5/6):485-492.
    [10]
    Beretta E,Kuang Y.Global analysis in some delayed ratio-dependent predator-prey system[J].Nonlinear Anal,1998,32(3):381-408. doi: 10.1016/S0362-546X(97)00491-4
    [11]
    YANG Kuang.Delay Differential Equation With Application in Population Dynamics[M].N Y:Academic Press,1993,67-70.
    [12]
    Wang W,Chen L.A predator-prey system with stage structure for predator[J].Comput Math Appl,1997,33(8):83-91.
    [13]
    JIAO Jian-jun,PANG Guo-ping,CHEN Lan-sun,et al.A delayed stage-structured predator-prey model with impulsive stocking on prey and continuous harvesting on predator[J].Applied Mathematics and Computation,2008,195(1):316-325. doi: 10.1016/j.amc.2007.04.098
    [14]
    SONG Xin-yu,CHEN Lan-sun.Optimal harvesting policy and stability for a single-species growth model with stage structure[J].Journal of System Sciences and Complex,2002,15(2):194-201.
    [15]
    DONG Ling-zhen,CHEN Lan-sun,SUN Li-hua.Extinction and permanence of the predator-prey system with stocking of prey and harvesting of predator impulsively[J].Math Methods Appl Sci,2006,29(4):415-425. doi: 10.1002/mma.688
    [16]
    Wang W,Mulone G,Salemi F,et al.Permanence and stability of a stage-structured predator-prey model[J].J Math Anal Appl,2001,262(2):499-528. doi: 10.1006/jmaa.2001.7543
    [17]
    Lakshmikantham V,Bainov D D,Simeonov P.Theory of Impulsive Differential Equations[M].Singapor:World Scientific,1989.
    [18]
    Bainov D,Simeonov P.Impulsive Differential Equations: Periodic Solutions and Applications[M].66.New York:Longman,1993.
    [19]
    Caltagirone L E,Doutt R L.Global behavior of an SEIRS epidemic model with delays,the history of the vedalia beetle importation to California and its impact on the development of biological control[J].Ann Rev Entomol,1989,34:1-16. doi: 10.1146/annurev.en.34.010189.000245
  • 加载中

Catalog

    通讯作者: 陈斌, bchen63@163.com
    • 1. 

      沈阳化工大学材料科学与工程学院 沈阳 110142

    1. 本站搜索
    2. 百度学术搜索
    3. 万方数据库搜索
    4. CNKI搜索

    Article Metrics

    Article views (2325) PDF downloads(537) Cited by()
    Proportional views
    Related

    /

    DownLoad:  Full-Size Img  PowerPoint
    Return
    Return