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Species Permanence Analysis of an Ecological Model with an Impulsive Control Strategy 被引量:1

Species Permanence Analysis of an Ecological Model with an Impulsive Control Strategy
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摘要 In this paper,on the basis of the theories and methods of ecology and ordinary differential equations,an ecological model with an impulsive control strategy is established.By using the theories of impulsive equations,small amplitude perturbation skills and compar-ison technique,we get the condition which guarantees the global asymptotical stability of the prey-x-eradication and predator-y-eradication periodic solution.It is proved that the system is permanent.Furthermore,numerical simulations are also illustrated which agree well with our theoretical analysis.All these results may be useful in study of the dynamic complexity of ecosystems. In this paper,on the basis of the theories and methods of ecology and ordinary differential equations,an ecological model with an impulsive control strategy is established.By using the theories of impulsive equations,small amplitude perturbation skills and compar-ison technique,we get the condition which guarantees the global asymptotical stability of the prey-x-eradication and predator-y-eradication periodic solution.It is proved that the system is permanent.Furthermore,numerical simulations are also illustrated which agree well with our theoretical analysis.All these results may be useful in study of the dynamic complexity of ecosystems.
出处 《Journal of Mathematical Research and Exposition》 CSCD 2011年第6期1035-1046,共12页 数学研究与评论(英文版)
基金 Supported by the National Natural Science Foundation of China (Grant No.60804015) National Basic Research Program of China (Grant No.2010CB732501)
关键词 impulsive control strategy locally asymptotically stable complex dynamics peri-odic solution. impulsive control strategy locally asymptotically stable complex dynamics peri-odic solution.
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  • 1SCHAFFER W M. Order and chaos in ecological systems [J]. Ecology., 1985,66:93-106:.
  • 2UPADHYAY R K, RAI V. Crisis-limited chaotic dynamics in ecological systems [J]. Chaos Solitons Fractals, 2001, 12(2): 205-218.
  • 3HASTINGS A, POWELL T. Order chaos in three species food chain [J]. Ecology., 1991, 12: 896-903.
  • 4KLEBANOFF A, HASTINGS A. Chaos in three-species food chains [J]. J. Math. Biol., 1994, 32(5): 427-451.
  • 5LETELLIER C, AZIZ-ALAOUI M A. Analysis of the dynamics of a realistic ecological model [J]. Chaos, Solitons Fractals, 2002, 13: 95-107.
  • 6RAI V, UPADHYAY R K. Chaotic population dynamics and biology of the top-predator [J]. Chaos Solitons Fractals, 2004, 21(5): 1195-1204.
  • 7NAJI R K, BALASIM A T. On the dynamical behavior of three species food web model [J]. Chaos Solitons Fractals, 2007, 34(5): 1636-1648.
  • 8LAKSHMIKANTHAM V, BAINOV D D, SIMEONOV P C. Theory oflmpulslve Differential Equations [M]. World Scientific Publishing Co., Inc., Teaneck, N J, 1989.
  • 9BENCHOHRA M, HENDERSON J, NTOUYAS S. Impulsive Differential Equations and Inclusions [M]. Hindawi Publishing Corporation, New York, 2006.
  • 10ZAVALISHCHIN S T. SESEKIN A N. Dynamic Impulsive Systems: Theory and Applications, Mathematics and its Applications, 394 [M]. Kluwer Academic Publishers Group, Dordrecht, 1997.

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