Complexity and chaos control in a discrete-time prey-predator model

Abstract We investigate the complex behavior and chaos control in a discrete-time prey-predator model. Taking into account the Leslie-Gower prey-predator model, we propose a discrete-time prey-predator system with predator partially dependent on prey and investigate the boundedness, existence and uniqueness of positive equilibrium and bifurcation analysis of the system by using center manifold theorem and bifurcation theory. Various feedback control strategies are implemented for controlling the bifurcation and chaos in the system. Numerical simulations are provided to illustrate theoretical discussion.

[1]  Q. Din,et al.  Behavior of a Competitive System of Second-Order Difference Equations , 2014, TheScientificWorldJournal.

[2]  Alessandro Astolfi,et al.  Stability of Dynamical Systems - Continuous, Discontinuous, and Discrete Systems (by Michel, A.N. et al.; 2008) [Bookshelf] , 2007, IEEE Control Systems.

[3]  Qamar Din Global Stability of Beddington Model , 2017 .

[4]  Stephen Lynch,et al.  Dynamical Systems with Applications using Mathematica , 2007 .

[5]  Li Li,et al.  Global stability of periodic solutions for a discrete predator–prey system with functional response , 2013 .

[6]  S. Wiggins Introduction to Applied Nonlinear Dynamical Systems and Chaos , 1989 .

[7]  Qamar Din Global behavior of a host-parasitoid model under the constant refuge effect , 2016 .

[8]  Guang Zhang,et al.  Dynamic behavior of a discrete modified Ricker & Beverton-Holt model , 2009, Comput. Math. Appl..

[9]  Qamar Din Global stability of a population model , 2014 .

[10]  Qamar Din,et al.  Dynamics of a discrete Lotka-Volterra model , 2013, Advances in Difference Equations.

[11]  Qamar Din Qualitative behavior of a discrete SIR epidemic model , 2016 .

[12]  P. Holmes,et al.  Nonlinear Oscillations, Dynamical Systems, and Bifurcations of Vector Fields , 1983, Applied Mathematical Sciences.

[13]  Dongmei Xiao,et al.  Complex dynamic behaviors of a discrete-time predator–prey system , 2007 .

[14]  T. Donchev,et al.  Global character of a host-parasite model , 2013 .

[15]  K. Khan,et al.  Stability Analysis of a System of Exponential Difference Equations , 2014 .

[16]  Rui Peng,et al.  Effect of a protection zone in the diffusive Leslie predator-prey model , 2009 .

[17]  Linda J. S. Allen,et al.  An introduction to mathematical biology , 2006 .

[18]  Qamar Din,et al.  Stability analysis of a discrete ecological model , 2014 .

[19]  R. Macarthur,et al.  Graphical Representation and Stability Conditions of Predator-Prey Interactions , 1963, The American Naturalist.

[20]  Katsuhiko Ogata,et al.  Modern Control Engineering , 1970 .

[21]  Juan Zhang,et al.  Pattern formation of a spatial predator-prey system , 2012, Appl. Math. Comput..

[22]  S. Elaydi An introduction to difference equations , 1995 .

[23]  Leah Edelstein-Keshet,et al.  Mathematical models in biology , 2005, Classics in applied mathematics.

[24]  P. H. Leslie SOME FURTHER NOTES ON THE USE OF MATRICES IN POPULATION MATHEMATICS , 1948 .

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

[26]  Xingyuan Wang,et al.  Chaotic control of Hénon map with feedback and nonfeedback methods , 2011 .

[27]  Yanling Zhu,et al.  Existence and global attractivity of positive periodic solutions for a predator–prey model with modified Leslie–Gower Holling-type II schemes , 2011 .

[28]  J. Dhar,et al.  Discrete-time bifurcation behavior of a prey-predator system with generalized predator , 2015 .

[29]  Gui-Quan Sun,et al.  Mathematical modeling of population dynamics with Allee effect , 2016, Nonlinear Dynamics.

[30]  S. Elaydi,et al.  Local Stability Implies Global Stability for the Planar Ricker Competition Model , 2014 .

[31]  Qamar Din,et al.  Global stability and Neimark-Sacker bifurcation of a host-parasitoid model , 2017, Int. J. Syst. Sci..

[32]  Zhujun Jing,et al.  Bifurcation and chaos in discrete-time predator–prey system , 2006 .

[33]  Qamar Din Global behavior of a plant-herbivore model , 2015, Advances in Difference Equations.

[34]  R. P. Gupta,et al.  Bifurcation analysis of modified Leslie–Gower predator–prey model with Michaelis–Menten type prey harvesting , 2013 .

[35]  Daqing Jiang,et al.  Analysis of a predator-prey model with modified Leslie-Gower and Holling-type II schemes with stochastic perturbation , 2009 .

[36]  Ying-Cheng Lai,et al.  Controlling chaos , 1994 .

[37]  Saber Elaydi,et al.  Discrete Chaos: With Applications in Science and Engineering , 2007 .

[38]  Global Dynamics of Triangular Maps , 2014 .

[39]  Yieh-Hei Wan,et al.  Computation of the Stability Condition for the Hopf Bifurcation of Diffeomorphisms on $\mathbb{R}^2 $ , 1978 .

[40]  C. Robinson Dynamical Systems: Stability, Symbolic Dynamics, and Chaos , 1994 .

[41]  Xitao Yang,et al.  Uniform persistence and periodic solutions for a discrete predator–prey system with delays☆ , 2006 .

[42]  William W. Murdoch,et al.  Consumer-resource dynamics , 2003 .

[43]  Juan Zhang,et al.  Global dynamics of a predator-prey system modeling by metaphysiological approach , 2016, Appl. Math. Comput..

[44]  Qamar Din Asymptotic behavior of an anti-competitive system of second-order difference equations , 2016 .

[45]  Zhimin He,et al.  Bifurcation and chaotic behavior of a discrete-time predator–prey system ☆ , 2011 .

[46]  Q. Din,et al.  Stability analysis of a biological network , 2014 .

[47]  M. A. Aziz-Alaoui,et al.  Boundedness and global stability for a predator-prey model with modified Leslie-Gower and Holling-type II schemes , 2003, Appl. Math. Lett..

[48]  Zhen Jin,et al.  Influence of isolation degree of spatial patterns on persistence of populations , 2016 .

[49]  M. Khan,et al.  Qualitative Behaviour of Generalised Beddington Model , 2016 .