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Journal of Taibah University for Science Volume 18, 2024 - Issue 1
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Research Article

Codimension-one bifurcation analysis and chaos of a discrete prey–predator system

Abdul Qadeer KhanDepartment of Mathematics, University of Azad Jammu and Kashmir, Muzaffarabad, PakistanCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0002-0278-1352
ORCID Icon &
Syeda Noor-ul-Huda NaqviDepartment of Mathematics, University of Azad Jammu and Kashmir, Muzaffarabad, Pakistan
Article: 2317505 | Received 12 May 2023, Accepted 07 Feb 2024, Published online: 28 Feb 2024

References

  • Freedman HI. Deterministic mathematical models in population ecology. New York: Marcel Dekker Incorporated; 1980.
  • Arditi R, Ginzburg LR, Akcakaya HR. Variation in plankton densities among lakes: a case for ratio-dependent predation models. Am Nat. 1991;138(5):1287–1296. doi: 10.1086/285286
  • Akcakaya HR, Arditi R, Ginzburg LR. Ratio-dependent predation: an abstraction that works. Ecology. 1995;76(3):995–1004. doi: 10.2307/1939362
  • Cosner C, DeAngelis DL, Ault JS, et al. Effects of spatial grouping on the functional response of predators. Theor Popul Biol. 1999;56(1):65–75. doi: 10.1006/tpbi.1999.1414
  • Arditi R, Ginzburg LR. Coupling in predator–prey dynamics: ratio-dependence. J Theor Biol. 1989;139(3):311–326. doi: 10.1016/S0022-5193(89)80211-5
  • Kuang Y, Beretta E. Global qualitative analysis of a ratio-dependent predator–prey system. J Math Biol. 1998;36(4):389–406. doi: 10.1007/s002850050105
  • Hsu SB, Hwang TW, Kuang Y. Global analysis of the Michaelis–Menten-type ratio-dependent predator–prey system. J Math Biol. 2001;42(6):489–506. doi: 10.1007/s002850100079
  • Singh A, Malik P. Bifurcations in a modified Leslie–Gower predator–prey discrete model with Michaelis–Menten prey harvesting. J Appl Math Comput. 2021;67(1-2):143–174. doi: 10.1007/s12190-020-01491-9
  • Ma R, Bai Y, Wang F. Dynamical behavior analysis of a two-dimensional discrete predator–prey model with prey refuge and fear factor. J Appl Anal Comput. 2020;10(4):1683–1697.
  • Santra PK, Panigoro HS, Mahapatra GS. Complexity of a discrete-time predator–prey model involving prey refuge proportional to predator. Jambura J Math. 2022;4(1):50–63. doi: 10.34312/jjom.v4i1
  • Chen J, Chen Y, Zhu Z, et al. Stability and bifurcation of a discrete predator–prey system with Allee effect and other food resource for the predators. J Appl Math Comput. 2023;69(1):529–548.
  • Tunç C, Tunç O. Qualitative analysis for a variable delay system of differential equations of second order. J Taibah Univ Sci. 2019;13(1):468–477. doi: 10.1080/16583655.2019.1595359
  • Tunç C. Stability to vector Lienard equation with constant deviating argument. Nonlinear Dyn. 2013;73(3):1245–1251. doi: 10.1007/s11071-012-0704-8
  • Tunç C. A note on boundedness of solutions to a class of non-autonomous differential equations of second order. Appl Anal Discret Math. 20104:361–372. doi: 10.2298/AADM100601026T
  • Wikan A. Discrete dynamical systems with an introduction to discrete optimization problems. London (UK): Bookboon. com; 2013.
  • Kulenović MRS, Ladas G. Dynamics of second order rational difference equations: with open problems and conjectures. New York: Chapman and Hall/CRC; 2001.
  • Camouzis E, Ladas G. Dynamics of third-order rational difference equations with open problems and conjectures. New York: CRC Press; 2007.
  • Guckenheimer J, Holmes P. Nonlinear oscillations, dynamical systems, and bifurcations of vector fields. New York: Springer Science & Business Media; 2013.
  • Kuznetsov YA, Kuznetsov IA, Kuznetsov Y. Elements of applied bifurcation theory. New York: Springer; 1998.
  • Rana SM. Chaotic dynamics and control of discrete ratio-dependent predator–prey system. Discrete Dyn Nat Soc. 2017;2017:1–13.
  • Al-Basyouni KS, Khan AQ. Discrete-time predator–prey model with bifurcations and chaos. Math Probl Eng. 2020;2020:1–14. doi: 10.1155/2020/8845926
  • Chakraborty P, Ghosh U, Sarkar S. Stability and bifurcation analysis of a discrete prey–predator model with square-root functional response and optimal harvesting. J Biol Syst. 2020;28(01):91–110. doi: 10.1142/S0218339020500047
  • Liu W, Cai D. Bifurcation, chaos analysis and control in a discrete-time predator–prey system. Adv Differ Equ. 2019;2019(1):1–22. doi: 10.1186/1687-1847-2012-1
  • Agiza HN, Elabbasy EM, El-Metwally H, et al. Chaotic dynamics of a discrete prey–predator model with Holling type II. Nonlinear Anal Real World Appl. 2009;10(1):116–129. doi: 10.1016/j.nonrwa.2007.08.029
  • Liu X, Xiao D. Complex dynamic behaviors of a discrete-time predator–prey system. Chaos Solit Fractals. 2007;32(1):80–94. doi: 10.1016/j.chaos.2005.10.081
  • Khan AQ, Ma J, Xiao D. Bifurcations of a two-dimensional discrete time plant-herbivore system. Commun Nonlinear Sci Numer Simul. 2016;39:185–198. doi: 10.1016/j.cnsns.2016.02.037
  • Khan AQ, Ma J, Xiao D. Global dynamics and bifurcation analysis of a host-parasitoid model with strong Allee effect. J Biol Dyn. 2017;11(1):121–146. doi: 10.1080/17513758.2016.1254287
  • Ott E, Grebogi C, Yorke JA. Controlling chaos. Phys Rev Lett. 1990;64(11):1196–1199. doi: 10.1103/PhysRevLett.64.1196
  • Elaydi S. An introduction to difference equations. New York: Springer-Verlag; 1996.
  • Lynch S. Dynamical systems with applications using mathematica. Boston: Birkhäuser; 2007.
  • Luo XS, Chen G, Wang BH, et al. Hybrid control of period-doubling bifurcation and chaos in discrete nonlinear dynamical systems. Chaos Solit Fractals. 2003;18(4):775–783. doi: 10.1016/S0960-0779(03)00028-6

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