Stability and Hopf Bifurcation of a Delayed Density-Dependent Predator-Prey System with Beddington-DeAngelis Functional Response

In this paper, we investigate the stability and Hopf bifurcation of a delayed density-dependent predator–prey system with Beddington–DeAngelis functional response, where not only the prey density dependence but also the predator density dependence are considered such that the studied predator–prey system conforms to the realistically biological environment. We start with the geometric criterion introduced by Beretta and Kuang [2002] and then investigate the stability of the positive equilibrium and the stability switches of the system with respect to the delay parameter τ. Especially, we generalize the geometric criterion in [Beretta & Kuang, 2002] by introducing the condition (i′) which can be assured by the condition (H2′), and adopting the technique of lifting to define the function Sn(τ) for alternatively determining stability switches at the zeroes of Sn(τ)s. Afterwards, by the Poincare normal form for Hopf bifurcation in [Kuznetsov, 1998] and the bifurcation formulae in [Hassard et al., 1981], we qualitatively analyze the properties for the occurring Hopf bifurcations of the system (3). Finally, an example with numerical simulations is given to illustrate the obtained results.

[1]  K. Cooke,et al.  Discrete delay, distributed delay and stability switches , 1982 .

[2]  Zhikun She,et al.  Dynamics of a density-dependent stage-structured predator–prey system with Beddington–DeAngelis functional response , 2013 .

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

[4]  Y. Kuang Delay Differential Equations: With Applications in Population Dynamics , 2012 .

[5]  Y. Kuznetsov Elements of Applied Bifurcation Theory , 2023, Applied Mathematical Sciences.

[6]  H. I. Freedman,et al.  A time-delay model of single-species growth with stage structure. , 1990, Mathematical biosciences.

[7]  Jun Cao,et al.  Bifurcation Analysis and Chaos Switchover Phenomenon in a Nonlinear Financial System with Delay Feedback , 2015, Int. J. Bifurc. Chaos.

[8]  Lansun Chen,et al.  Optimal harvesting and stability for a two-species competitive system with stage structure. , 2001, Mathematical biosciences.

[9]  D. Baĭnov,et al.  Systems with impulse effect : stability, theory, and applications , 1989 .

[10]  B. Hassard,et al.  Theory and applications of Hopf bifurcation , 1981 .

[11]  Zhikun,et al.  A DENSITY-DEPENDENT PREDATOR-PREY MODEL OF BEDDINGTON-DEANGELIS TYPE , 2014 .

[12]  Haiyin Li,et al.  Dynamics of the density dependent predator–prey system with Beddington–DeAngelis functional response , 2011 .

[13]  Xiao Fan Wang,et al.  Complex Networks: Topology, Dynamics and Synchronization , 2002, Int. J. Bifurc. Chaos.

[14]  Yang Kuang,et al.  Geometric Stability Switch Criteria in Delay Differential Systems with Delay Dependent Parameters , 2002, SIAM J. Math. Anal..

[15]  Zhikun She,et al.  Dynamics of a non-autonomous density-dependent predator–prey model with Beddington–DeAngelis type , 2016 .

[16]  J. Beddington,et al.  Mutual Interference Between Parasites or Predators and its Effect on Searching Efficiency , 1975 .

[17]  Guilie Luo,et al.  Asymptotic behaviors of competitive Lotka–Volterra system with stage structure , 2002 .

[18]  J. Kwon,et al.  The twisted Daehee numbers and polynomials , 2014 .

[19]  Donald L. DeAngelis,et al.  A MODEL FOR TROPHIC INTERACTION , 1975 .

[20]  Martin Bohner,et al.  Impulsive differential equations: Periodic solutions and applications , 2015, Autom..

[21]  Shengqiang Liu,et al.  A Stage-structured Predator-prey Model of Beddington-DeAngelis Type , 2006, SIAM J. Appl. Math..

[22]  Fuyun Lian,et al.  Hopf bifurcation analysis of a predator-prey system with Holling type IV functional response and time delay , 2009, Appl. Math. Comput..

[23]  J. Rotman An Introduction to Algebraic Topology , 1957 .

[24]  Jingyuan Yu,et al.  A stage-structured predator-prey model with Beddington-DeAngelis functional response , 2008 .

[25]  Donald L. DeAngelis,et al.  A Model for Tropic Interaction , 1975 .

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

[27]  Matthijs Vos,et al.  Functional responses modified by predator density , 2009, Oecologia.

[28]  Zhikun She,et al.  Uniqueness of periodic solutions of a nonautonomous density-dependent predator–prey system , 2015 .