Stable periodic solution of a discrete periodic Lotka-Volterra competition system with a feedback control

This paper discusses a discrete Lotka-Volterra competition system with feedback controls. We first obtain the persistence of the system. Assuming that the coefficients in the system are periodic, we obtain the existence of a periodic solution. Moreover, under some additional conditions, this periodic solution is globally stable.

[1]  Giuseppe Mulone,et al.  Global stability of discrete population models with time delays and fluctuating environment , 2001 .

[2]  The effect of delays on the permanence for Lotka-Volterra systems , 1995 .

[3]  Yasuhiro Takeuchi,et al.  Permanence and global attractivity for competitive Lotka-Volterra systems with delay , 1994 .

[4]  Y. Takeuchi Global Dynamical Properties of Lotka-Volterra Systems , 1996 .

[5]  Wanbiao Ma,et al.  A Necessary and Sufficient Condition for Permanence of a Lotka–Volterra Discrete System with Delays , 2001 .

[6]  Wan-Tong Li,et al.  Positive periodic solutions of a class of delay differential system with feedback control , 2004, Appl. Math. Comput..

[7]  K. Gopalsamy,et al.  FEEDBACK REGULATION OF LOGISTIC GROWTH , 1993 .

[8]  J. Hofbauer,et al.  Coexistence for systems governed by difference equations of Lotka-Volterra type , 1987, Journal of mathematical biology.

[9]  V. Hutson,et al.  Persistence of species obeying difference equations , 1982 .

[10]  杨帆,et al.  EXISTENCE AND GLOBAL ATTRACTIVITY OF POSITIVE PERIODIC SOLUTION OF A LOGISTIC GROWTH SYSTEM WITH FEEDBACK CONTROL AND DEVIATING ARGUMENTS , 2001 .

[11]  MengFAN,et al.  Periodicity and Stability in Periodic n-Species Lotka-Volterra Competition System with Feedback Controls and Deviating Arguments , 2003 .

[12]  Xiaoxin Chen,et al.  Sufficient conditions for the existence positive periodic solutions of a class of neutral delay models with feedback control , 2004, Appl. Math. Comput..

[13]  翁佩萱 GLOBAL ATTRACTIVITY IN A PERIODIC COMPETITION SYSTEM WITH FEEDBACK CONTROLS , 1996 .

[14]  M. Hassell,et al.  Discrete time models for two-species competition. , 1976, Theoretical population biology.

[15]  M. Zhien,et al.  Harmless delays for uniform persistence , 1991 .

[16]  Peixuan Weng Existence and global stability of positive periodic solution of periodic integrodifferential systems with feedback controls , 2000 .

[17]  Zhengyi Lu,et al.  Permanence and global attractivity for Lotka–Volterra difference systems , 1999, Journal of mathematical biology.

[18]  H. I. Freedman,et al.  Uniform Persistence in Functional Differential Equations , 1995 .

[19]  Zhan Zhou,et al.  Stable periodic solution of a discrete periodic Lotka–Volterra competition system , 2003 .

[20]  T. Gard,et al.  Extinction in predator-prey models with time delay. , 1993, Mathematical biosciences.

[21]  T. D. Rogers,et al.  Chaos in Systems in Population Biology , 1981 .

[22]  Tang Sanyi,et al.  Permanence and periodic solution in competitive system with feedback controls , 1998 .

[23]  T D Rogers,et al.  The discrete dynamics of symmetric competition in the plane , 1987, Journal of mathematical biology.

[24]  Josef Hofbauer,et al.  The theory of evolution and dynamical systems , 1988 .