EXISTENCE AND UNIQUENESS OF THE POSITIVE STEADY STATE SOLUTION FOR A LOTKA-VOLTERRA PREDATOR-PREY MODEL WITH A CROWDING TERM

doi:10.1007/s10473-020-0622-7

Abstract

Abstract: This paper deals with a Lotka-Volterra predator-prey model with a crowding term in the predator equation. We obtain a critical value $\lambda_1^D(\Omega_0)$, and demonstrate that the existence of the predator in $\overline{\Omega}_0$ only depends on the relationship of the growth rate $\mu$ of the predator and $\lambda_1^D(\Omega_0)$, not on the prey. Furthermore, when $\mu<\lambda_1^D(\Omega_0)$, we obtain the existence and uniqueness of its positive steady state solution, while when $\mu\geq \lambda_1^D(\Omega_0)$, the predator and the prey cannot coexist in $\overline{\Omega}_0$. Our results show that the coexistence of the prey and the predator is sensitive to the size of the crowding region $\overline{\Omega}_0$, which is different from that of the classical Lotka-Volterra predator-prey model.

Key words: Lotka-Volterra predator-prey model, crowding term, critical value, coexistence

CLC Number:

35J57

Xianzhong ZENG, Lingyu LIU, Weiyuan XIE. EXISTENCE AND UNIQUENESS OF THE POSITIVE STEADY STATE SOLUTION FOR A LOTKA-VOLTERRA PREDATOR-PREY MODEL WITH A CROWDING TERM[J].Acta mathematica scientia,Series B, 2020, 40(6): 1961-1980.

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References

[1] Berestycki H, Nirenberg L, Varadhan S R S. The principal eigenvalue and maximum principle for secondorder elliptic operators in general domains. Comm Pure Appl Math, 1994, 47(1):47-92
[2] Cano-Casanova S, Lopez-Gomez J. Properties of the principal eigenvalues of a general class of non-classical mixed boundary value problems. J Differential Equations, 2002, 178(1):123-211
[3] Cirstea F C, Radulescu V. Existence and uniqueness of blow-up solutions for a class of logistic equations. Comm Comtemp Math, 2002, 4:559-586
[4] Cirstea F C, Radulescu V. Uniqueness of the blow-up boundary solution of logistic equations with absorbtion. C R Acad Sci Paris Ser I, 2002, 335:447-452
[5] Cirstea F C, Radulescu V. Asymptotics of the blow-up boundary solution of logistic equations with absorption. C R Acad Sci Paris Ser I, 2003, 336:231-236
[6] Crandall M G, Rabinowitz P H. Bifurcation from simple eigenvalues. J Funct Anal, 1971, 8:321-340
[7] Cui R, Shi J, Wu B. Strong Allee effect in a diffusive predator-prey system with a protection zone. J Differential Equations, 2014, 256:108-129
[8] Dancer E N. Global solution branches for positive mappings. Arch Rat Mech Anal, 1973, 52:181-192
[9] Dancer E N. On the structure of solutions of non-linear eigenvalue problem. Ind Univ Math J, 1974, 23:1069-1974
[10] Dancer E N. Bifurcation from simple eigenvalues and eigenvalues of geometric multiplicity one. Bull London Math Soc, 2002, 34(5):533-538
[11] Du Y. Effects of a degeneracy in the competition model, II. Perturbation and dynamical behaviour. J Differential Equations, 2002, 181(1):133-164
[12] Du Y. Spatial patterns for population models in a heterogeneous environment. Taiwanese J Math, 2004, 8(2):155-182
[13] Du Y, Shi J. Allee effect and bistability in a spatially heterogeneous predator-prey model. Trans Amer Math Soc, 2007, 359(9):4557-4593
[14] Du Y, Hsu S B. A diffusive predator-prey model in heterogeneous environment. J Differential Equations, 2004, 203(2):331-364
[15] Du Y, Shi J. A diffusive predator-prey model with a protection zone. J Differential Equations, 2006, 229(1):63-91
[16] Du Y, Huang Q. Blow-up solutions for a class of semilinear elliptic and parabolic equations. SIAM J Math Anal, 1999, 31(1):1-18
[17] Du Y. Asymptotic behavior and uniqueness results for boundary blow-up solutions. Differential and Integral Equations, 2004, 17:819-834
[18] Fraile J M, Koch P, Lopez-Gomez J, Merino S. Elliptic eigenvalue problems and unbounded continua of positive solutions of a semilinear elliptic equation. J Differential Equations, 1996, 127:295-319
[19] Liu D, Mu C. Extinction for a quasilinear parabolic equation with a nonlinear gradient source. Taiwanese Journal of Mathematics, 2014, 18(5):1329-1343
[20] Lopez-Gomez J, Molina-Meyer M. Superlinear indefinite systems:Beyond Lotka-Volterra models. J Differential Equations, 2006, 221(2):343-411
[21] Lopez-Gomez J. Spectral Theory and Nonlinear Functional Analysis. Research Notes in Mathematics 426. Boca Raton (Florida, USA):Chapman and Hall/CRC, 2001
[22] Lopez-Gomez J, Sabina de Lis J C. First variations of principal eigenvalues with respect to the domain and point-wise growth of positive solutions for problems where bifurcation from infinity occurs. J Differential Equations, 1998, 148:47-64
[23] Lopez-Gomez J. The maximum principle and the existence of principal eigenvalues for some linear weighted boundary value problems. J Differential Equations, 1996, 127:263-294
[24] Lopez-Gomez J. Dynamics of parabolic equations. From classical solutions to metasolutions. Differential and Integral Equations, 2003, 16:813-828
[25] Lopez-Gomez J. The boundary blow-up rate of large solutions. J Differential Equations, 2003, 195(1):25-45
[26] Lopez-Gomez J. Optimal uniqueness theorems and exact blow-up rates of large solutions. J Differential Equations, 2006, 224(2):385-439
[27] Li S, Wu J. Asymptotic behavior and stability of positive solutions to a spatially heterogeneous predatorprey system. J Differential Equations, 2018, 265(8):3754-3791
[28] Li S, Wu J, Dong Y. Effects of a degeneracy in a diffusive predator-prey model with Holling II functional response. Nonlinear Analysis:Real World Applications, 2018, 43:78-95
[29] Min N, Wang M. Dynamics of a diffusive prey-predator system with strong Allee effect growth rate and a protection zone for the prey. Discrete and Continuous Dynamical Systems-Series B, 2018, 23(4):1721-1737
[30] Oeda K. Effect of cross-diffusion on the stationary problem of a prey-predator model with a protection zone. J Differential Equations, 2011, 250(10):3988-4009
[31] Ouyang T. On the positive solutions of semilinear equations Δu+λu-hu^p=0 on the compact manifolds. Trans Amer Math Soc, 1992, 331(2):503-527
[32] Peng R. Long-time behavior of a cooperative periodic-parabolic system in a spatiotemporally degenerate environment. J Differ Equ, 2015, 259(7):2903-2947
[33] Rabinowitz P H. Some global results for nonlinear eigenvalue problems. J Func Anal, 1971, 7:487-513
[34] Wang Y, Li W. Effects of cross-diffusion and heterogeneous environment on positive steady states of a prey-predator system. Nonlinear Analysis:Real World Applications, 2013, 14(2):1235-1246
[35] Wang Y, Li W. Effect of cross-diffusion on the stationary problem of a diffusive competition model with a protection zone. Nonlinear Analysis:Real World Applications, 2013, 14(1):224-245
[36] Wang B. Positive steady states of a diffusive predator-prey system with predator cannibalism. Acta Math Sci, 2017, 37B(5):1385-1398
[37] Wang C, Li N, Zhou Y, et al. On a multi-delay Lotka-Volterra predator-prey model with feedback controls and prey diffusion. Acta Math Sci, 2019, 39B(2):429-448
[38] Zeng X, Liu Z. Nonconstant positive steady states for a ratio-dependent predator-prey system with crossdiffusion. Nonlinear Analysis:Real World Applications, 2010, 11(1):372-390
[39] Zeng X, Zhang J, Gu Y. Uniqueness and stability of positive steady state solutions for a ratio-dependent predator-prey system with a crowding term in the prey equation. Nonlinear Analysis:Real World Applications, 2015, 24:163-174
[40] Zeng X, Gu Y. Persistence and the global dynamics of the positive solutions for a ratio-dependent predatorprey system with a crowding term in the prey equation. Acta Mathematica Scientia, 2016, 36B(3):689-703
[41] Zeng X, Gu Y. Existence and the dynamical behaviors of the positive solutions for a ratio-dependent predator-prey system with the crowing term and the weak growth. J Differ Equ, 2018, 264(5):3559-3595
[42] Zeng X, Zeng W, Liu L. Effect of the protection zone on coexistence of the species for a ratio-dependent predator-prey model. J Math Anal Appl, 2018, 462(2):1605-1626
[43] Zhou L, Song K. The analysis of Hopf bifurcation for the prey-predator system with diffusion and delay. Acta Math Sci, 1991, 11B(2):142-163