Global Hopf Bifurcation of a Diffusive Modified Leslie–Gower Predator–Prey Model with Delay and Michaelis–Menten Type Prey Harvesting

• Ke Wang ^[1] ; Xiaofeng Xu ^[1] ; Ming Liu ^[2]
  1. [1] Heilongjiang University
  2. [2] Northeast Forestry University
• Localización: Qualitative theory of dynamical systems, ISSN 1575-5460, Vol. 23, Nº 2, 2024
• Idioma: inglés
• Enlaces
  • Texto completo
• Resumen

  • In this paper, we investigate the global Hopf bifurcation of a diffusive modified Leslie– Gower predator–prey model with delay and Michaelis–Menten type prey harvesting.

    First, we obtain the stability of positive steady state and the existence of local Hopf bifurcation under certain conditions. Second, we get the permanence of the system by using the comparison theorem. Moreover, by constructing a suitable Lyapunov function, we derive sufficient conditions for the global attractivity of the unique positive steady state for the system without delay. Then, the global existence of positive periodic solutions is established by using the global Hopf bifurcation result of Wu. Finally, the results are verified by numerical simulation.

• Referencias bibliográficas
  • 1. Leslie, P., Gower, J.: The properties of a stochastic model for the predator–prey type of interaction between two species. Biometrica 47,...
  • 2. Yadav, R., Mukherjee, N., Sen, M.: Spatiotemporal dynamics of a prey-predator model with Allee effect in prey and hunting cooperation in...
  • 3. Lamontagne, Y., Coutu, C., Rousseau, C.: Bifurcation analysis of a predator–prey system with generalised holling type III functional response....
  • 4. Yang, R., Wei, J.: Stability and bifurcation analysis of a diffusive prey predator system in Holling type III with a prey refuge. Nonlinear...
  • 5. Liu, Z., Zhong, S., Yin, C., Chen, W.: Dynamics of impulsive reaction–diffusion predator–prey system with Holling type III functional response....
  • 6. Yang, W., Li, Y.: Dynamics of a diffusive predator–prey model with modified Leslie–Gower and Holling-type III schemes. Comput. Math. Appl....
  • 7. Huang, J., Ruan, S., Song, J.: Bifurcations in a predator–prey system of Leslie type with generalized Holling type III functional response....
  • 8. Zhang, Y., Meng, X.: Dynamic study of a stochastic Holling III predator-prey system with a prey refuge. J. Differ. Equ. 55–3, 73–78 (2022)
  • 9. Liu, C., Chang, L., Huang, Y.,Wang, Z.: Turing patterns in a predator–prey model on complex networks. Nonlinear Dyn. 99(4), 3313–3322 (2020)
  • 10. Blyuss, K., Kyrychko, S., Kyrychko, Y.: Time-delayed and stochastic effects in a predator–prey model with ratio dependence and Holling...
  • 11. Tiwari, V., Tripathi, J.P., Abbas, S., Wang, J.S., Sun, G.Q., Jin, Z.: Qualitative analysis of a diffusive Crowley–Martin predator-prey...
  • 12. Tripathi, J.P., Abbas, S., Sun, G.Q., Jana, D., Wang, C.H.: Interaction between prey and mutually interfering predator in prey reserve...
  • 13. May, R.M., Beddington, J.R., Clark, C.W., Holt, S.J., Laws, R.M.: Management of multispecies fisheries. Science 205(4403), 267–277 (1979)
  • 14. Clark, C.W.: Mathematical Bioeconomics: The Optimal Management of Renewable Resources. Wiley, New York (1976)
  • 15. Clark, C.W., Mangel, M.: Aggregation and fishery dynamics: a theoretical study of schooling and the purse seine tuna fisheries. Fish....
  • 16. Wang, W., Liu, Q., Jin, Z.: Spatiotemporal complexity of a ratio-dependent predator–prey system. Phys. Rev. E 75, 051913 (2007)
  • 17. Zhang, L., Wang, W., Xue, Y.: Spatiotemporal complexity of a predator–prey system with constant harvest rate. Chaos Soliton. Fract. 41,...
  • 18. Yuan, R., Jiang, W., Wang, Y.: Saddle-node-Hopf bifurcation in a modified Leslie–Gower predator– prey model with time-delay and prey harvesting....
  • 19. Yan, X., Zhang, C.: Global stability of a delayed diffusive predator–prey model with prey harvesting of Michaelis–Menten type. Appl. Math....
  • 20. Liu, B., Wu, R., Chen, L.: Patterns induced by super cross-diffusion in a predator–prey system with Michaelis–Menten type harvesting....
  • 21. Hu, D., Cao, H.: Stability and bifurcation analysis in a predator–prey system with Michaelis–Menten type predator harvesting. Nonlinear...
  • 22. Liu, W., Jiang, Y.: Bifurcation of a delayed Gause predator–prey model with Michaelis–Menten type harvesting. J. Theor. Biol. 438, 116–132...
  • 23. Gupta, R., Peeyush, C.: Bifurcation analysis of modified Leslie–Gower predator–prey model with Michaelis–Menten type prey harvesting....
  • 24. Zhang, X., Zhao, H.: Stability and bifurcation of a reaction–diffusion predator–prey model with nonlocal delay and Michaelis-=Menten-type...
  • 25. Jiang, J., Li, X., Wu, X.: The dynamics of a bioeconomic model with Michaelis–Menten type prey harvesting. B. Malays Math. Sci. So. 46(2),...
  • 26. Zuo, W., Ma, Z., Cheng, Z.: Spatiotemporal dynamics induced by Michaelis–Menten type prey harvesting in a diffusive Leslie–Gower predator–prey...
  • 27. Liu, M., Hu, D., Meng, F.: Stability and bifuration analysis in a delay-induced predator–prey model with Michaelis–Menten type predator...
  • 28. Liu, W., Jiang, Y.: Bifurcation of a delayed Gause predator–prey model with Michaelis–Menten type harvesting. J. Theor. Biol. 438, 116–132...
  • 29. Tiwari, V., Tripathi, J.P., Mishra, S., Upadhyay, R.K.: Modeling the fear effect and stability of nonequilibrium patterns in mutually...
  • 30. Tiwari, V., Tripathi, J.P., Jana, D., Tiwari, S.K., Upadhyay, R.K:. Exploring complex dynamics of spatial predator-prey system: role of...
  • 31. Kohlmeier, C., Ebenhoh, W.: The stabilizing role of cannibalism in a predator–prey system. B. Math. Biol. 57, 401–411 (1995)
  • 32. Vaidyaa, N.K., Wu, J.H.: Modeling Spruce Budworm population revisited: impact of physiological structure on outbreak control. B. Math....
  • 33. Yang, R., Nie, C., Jin, D.: Spatiotemporal dynamics induced by nonlocal competition in a diffusive predator–prey system with habitat complexity....
  • 34. Yang, R.,Wang, F., Jin, D.: Spatially inhomogeneous bifurcating periodic solutions induced by nonlocal competition in a predator–prey...
  • 35. Xu, C., Zhang, W., Aouiti, C., Liu, Z., Yao, Y.: Bifurcation insight for a fractional-order stage-structured predator–prey system incorporating...
  • 36. Yang, R., Zhang, C.: Dynamics in a diffusive modified Leslie–Gower predator–prey model with time delay and prey harvesting. Nonlinear...
  • 37. Yang, R., Wei, J.: The effect of delay on a diffusive predator–prey system with modified Leslie–Gower functional response. Bull. Malays....
  • 38. Tian, Y., Weng, P.: Asymptotic stability of diffusive predator-prey model with modified Leslie–Gower and Holling-type II schemes and nonlocal...
  • 39. Chen, S., Shi, J., Wei, J.: Global stability and Hopf bifurcation in a delayed diffusive Leslie–Gower predator–prey system. Int. J. Bifurc....
  • 40. Song, Y., Peng, Y., Wei, J.: Bifurcations for a predator–prey system with two delays. J. Math. Anal. Appl. 337(1), 466–479 (2008)
  • 41. Li, Y., Wang, M.: Hopf bifurcation and global stability of a delayed predator–prey model with prey harvesting. Comput. Math. Appl. 69(5),...
  • 42. Yan, X., Zhang, C.: Global stability of a delayed diffusive predator–prey model with prey harvesting of Michaelis–Menten type. Appl. Math....
  • 43. Xu, X., Liu, M.: Global Hopf bifurcation of a general predator-prey system with diffusion and stage structures. J. Differ. Equ. 269, 8370–8386...
  • 44. Liu, M., Cao, J.: Global Hopf bifurcation in a phytoplankton–zooplankton system with delay and diffusion. Int. J. Bifurc. Chaos. 31(8),...
  • 45. Xu, X., Wei, J.: Bifurcation analysis of a spruce budworm model with diffusion and physiological structures. J. Differ. Equ. 262(10),...
  • 46. Su, Y., Wei, J., Shi, J.: Hopf bifurcation in a diffusive logistic equation with mixed delayed and instantaneous density dependence. J....
  • 47. Wu, J.: Theory and Applications of Partial Functional Differential Equations. Springer-Verlag, New York (1996)
  • 48. Hsu, S., Hwang, T.: Global stability for a class of predator–prey systems. SIAM J. Appl. Math. 55, 763–783 (1995)
  • 49. Du, Y., Hsu, S.: A diffusive predator–prey model: in heterogeneous environment. J. Differ. Equ. 203, 331–364 (2004)