RETRACTED: Bifurcation analysis in the delayed Leslie–Gower predator–prey system

In this paper, the delayed Leslie-Gower predator-prey system is investigated. By choosing the delay as a bifurcation parameter, we show that Hopf bifurcations can occur as the delay crosses some critical values. By deriving the equation describing the flow on the center manifold, we can determine the direction of the Hopf bifurcations and the stability of the bifurcating periodic solutions. In addition, special attention is paid to the global continuation of local Hopf bifurcations. Using a global Hopf bifurcation result of Wu [J. Wu, Symmetric functional differential equations neural networks with memory, Trans. Am. Math. Soc. 350 (1998) 4799―4838] for functional differential equations, we may show the global existence of periodic solutions.

[1]  Rong Yuan,et al.  Stability and bifurcation in a harvested one-predator–two-prey model with delays , 2006 .

[2]  K. Gopalsamy Harmless delays in model systems , 1983 .

[3]  R. May,et al.  Stability and Complexity in Model Ecosystems , 1976, IEEE Transactions on Systems, Man, and Cybernetics.

[4]  Xiang-Ping Yan,et al.  Hopf bifurcation in a delayed Lokta–Volterra predator–prey system , 2008 .

[5]  Teresa Faria,et al.  Stability and Bifurcation for a Delayed Predator–Prey Model and the Effect of Diffusion☆ , 2001 .

[6]  Jack K. Hale,et al.  Introduction to Functional Differential Equations , 1993, Applied Mathematical Sciences.

[7]  L. Magalhães,et al.  Normal Forms for Retarded Functional Differential Equations and Applications to Bogdanov-Takens Singularity , 1995 .

[8]  Dongmei Xiao,et al.  STABILITY AND BIFURCATION IN A DELAYED RATIO-DEPENDENT PREDATOR–PREY SYSTEM , 2002, Proceedings of the Edinburgh Mathematical Society.

[9]  K. Gopalsamy,et al.  Delayed responses and stability in two-species systems , 1984, The Journal of the Australian Mathematical Society. Series B. Applied Mathematics.

[10]  Rong Yuan,et al.  Stability and bifurcation in a delayed predator–prey system with Beddington–DeAngelis functional response , 2004 .

[11]  L. Magalhães,et al.  Normal Forms for Retarded Functional Differential Equations with Parameters and Applications to Hopf Bifurcation , 1995 .

[12]  Rong Yuan,et al.  Bifurcations in predator–prey systems with nonmonotonic functional response , 2005 .

[13]  Junjie Wei,et al.  Bifurcations for a predator-prey system with two delays ✩ , 2008 .

[14]  PETER A. BRAZA,et al.  The Bifurcation Structure of the Holling--Tanner Model for Predator-Prey Interactions Using Two-Timing , 2003, SIAM J. Appl. Math..

[15]  Junjie Wei,et al.  Local Hopf bifurcation and global periodic solutions in a delayed predator–prey system , 2005 .

[16]  J. Hale,et al.  Methods of Bifurcation Theory , 1996 .

[17]  James T. Tanner,et al.  THE STABILITY AND THE INTRINSIC GROWTH RATES OF PREY AND PREDATOR POPULATIONS , 1975 .

[18]  J. Gower,et al.  The properties of a stochastic model for the predator-prey type of interaction between two species , 1960 .

[19]  Yang Kuang,et al.  Convergence Results in a Well-Known Delayed Predator-Prey System , 1996 .

[20]  Y. Kuang,et al.  Global analyses in some delayed ratio-dependent predator-prey systems , 1998 .

[21]  Dongmei Xiao,et al.  Multiple Bifurcations in a Delayed Predator–prey System with Nonmonotonic Functional Response , 2022 .

[22]  Sze-Bi Hsu,et al.  Global Stability for a Class of Predator-Prey Systems , 1995, SIAM J. Appl. Math..

[23]  Jianhong Wu SYMMETRIC FUNCTIONAL DIFFERENTIAL EQUATIONS AND NEURAL NETWORKS WITH MEMORY , 1998 .

[24]  Jim M Cushing,et al.  Integrodifferential Equations and Delay Models in Population Dynamics , 1977 .

[25]  Wan-Tong Li,et al.  Hopf bifurcation and global periodic solutions in a delayed predator-prey system , 2006, Appl. Math. Comput..

[26]  Robert M. May,et al.  Time‐Delay Versus Stability in Population Models with Two and Three Trophic Levels , 1973 .

[27]  K. Gopalsamy Stability and Oscillations in Delay Differential Equations of Population Dynamics , 1992 .

[28]  J B Collings,et al.  Bifurcation and stability analysis of a temperature-dependent mite predator-prey interaction model incorporating a prey refuge , 1995, Bulletin of mathematical biology.