JOURNAL OF SHANDONG UNIVERSITY(NATURAL SCIENCE) ›› 2019, Vol. 54 ›› Issue (9): 54-61.doi: 10.6040/j.issn.1671-9352.0.2018.667

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Qualitative analysis of a diffusive predator-prey model with density dependence

LI Hai-xia   

  1. Institute of Mathematics and Information Science, Baoji University of Arts and Sciences, Baoji 721013, Shaanxi, China
  • Online:2019-09-20 Published:2019-07-30

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Abstract: The uniqueness of coexistence solutions and asymptotic behavior for a diffusive predator-prey model with density dependence are studied. The sufficient conditions of the existence of coexistence solutions are given by means of the fixed point index theory. Then, by making use of the perturbation theory for linear operators, we discuss the stability and uniqueness of coexistence solutions. Finally, the conditions of the extinction and permanence for the system by the comparison principle for parabolic equations, and the theoretical results of asymptotic behavior for the system are verified by some numerical simulations. The results show that the two species can coexist and the system has a unique coexistence solution under certain conditions.

Key words: a diffusive predator-prey model, density dependence, fixed point index, perturbation theory, uniqueness, asymptotic behaviour

CLC Number: 

  • O175.26
[1] WU J H. Stability and persistence for prey-predator model with saturation[J].Chinese Science Bulletin,1998, 43(24):2102-2103.
[2] DU Y H, SHI J P. A diffusive predator-prey model with a protection zone[J]. Journal of Differential Equations, 2006, 229(1):63-91.
[3] PENG R, WANG M X. Note on a ratio-dependent predator-prey system with diffusion[J]. Nonlinear Analysis: Real World Applications, 2006, 1(7):1-11.
[4] KO W, KYU K. Qualitative analysis of a predator-prey model with Holling type-II functional response incorporating a prey refuge[J]. Journal of Differential Equations, 2006, 231(2):534-550.
[5] WANG Z G, WU J H. Qualitative analysis for a ratio-dependent predator-prey model with stage structure and diffusion[J]. Nonlinear Analysis, 2008, 9(5):2270-2287.
[6] PENG R, SHI J P. Non-existence of non-constant positive steady states of two Holling type-II predator-prey systems: strong interaction case[J]. Journal of Differential Equations, 2009, 247(3):866-886.
[7] YI F Q, WEI J J, SHI J P. Bifurcation and spatiotemporal patterns in a homogeneous diffusive predator-prey system[J]. Journal of Differential Equations, 2009, 246(5):1944-1977.
[8] JIA Y F, WU J H, NIE H. The coexistence states of a predator-prey model with non-monotonic functional response and diffusion[J]. Acta Applicandae Mathematicae, 2009, 108(2):413-428.
[9] GUO G H, WU J H. Multiplicity and uniqueness of positive solutions for a predator-prey model with B-D functional response[J]. Nonlinear Analysis, 2010, 72(3/4):1632-1646.
[10] WEI M H, WU J H, GUO G H. The effect of predator competition on positive solutions for a predator-prey model with diffusion[J]. Nonlinear Analysis, 2012, 75(13):5053-5068.
[11] YANG W S, LI Y Q. Dynamics of a diffusive predator-prey model with modified Leslie-Gower and Holling-type III schemes[J]. Computers and Mathematics with Applications, 2013, 65(11):1727-1737.
[12] ZHOU J, SHI J P. The existence, bifurcation and stability of positive stationary solutions of a diffusive Leslie-Gower predator-prey model with Holling-type II functional responses[J]. Journal of Mathematical Analysis and Applications, 2013, 405(2):618-630.
[13] LI H X. Asymptotic behavior and multiplicity for a diffusive Leslie-Gower predator-prey system with Crowley-Martin functional response[J]. Computers and Mathematics with Applications, 2014, 68(7):693-705.
[14] 李海侠.带有保护区域的加法Allee效应捕食-食饵模型的共存解[J].山东大学学报(理学版),2015,50(5):9-15. LI Haixia. Coexistence solutions for a predator-prey model with additive Allee effect and a protection zone[J]. Journal of Shandong University(Natural Science), 2015, 50(5):9-15.
[15] JIANG H L, WANG L J, YAO R F. Numerical simulation and qualitative analysis for a predator-prey model with B-D functional response[J]. Mathematics and Computers in Simulation, 2015, 117(2):39-53.
[16] LI S B, WU J H. Qualitative analysis of a predator-prey model with predator saturation and competition[J]. Acta Applicandae Mathematicae, 2016, 141(1):165-185.
[17] LI H X, LI Y L,YANG W B. Existence and asymptotic behavior of positive solutions for a one-prey and two-competing-predators system with diffusion[J]. Nonlinear Analysis: Real World Applications, 2016, 27:261-282.
[18] 李海侠. 一类食物链模型正解的稳定性和唯一性[J].数学物理学报A辑,2017,37(6):1094-1104. LI Haixia. Stability and uniqueness of positive solutions for a food-chain model[J]. Acta Mathematica Scientia-Series A, 2017, 37(6):1094-1104.
[19] HUANG K G, CAI L, FU S M. Positive steady states of a density-dependent predator-prey model with diffusion[J]. Discrete and Continuous Dynamical Systems-Series B, 2018, 23(8):3087-3107.
[20] DANCER E N. On the indices of fixed points of mapping in cones and applications [J]. Journal of Mathematical Analysis and Applications, 1983, 91(1):131-151.
[21] PAO C V. Quasisolutions and global attractor of reaction-diffusion systems[J]. Nonlinear Analysis, 1996, 26(12): 1889-1903.
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