Bifurcation analysis and Turing instability in a diffusive predator-prey model with herd behavior and hyperbolic mortality

•Consider a diffusive predator-prey model with herd behavior and hyperbolic mortality.•The stability and Turing instability of the positive equilibrium are investigated.•The detailed Hopf and steady state bifurcation analysis to PDE system is presented.•The stable spatially homogeneous and inhomogen...

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Bibliographic Details
Published in:Chaos, solitons and fractals solitons and fractals, 2015-12, Vol.81, p.303-314
Main Authors: Tang, Xiaosong, Song, Yongli
Format: Article
Language:English
Subjects:
Diffusion
Hopf bifurcation
Hyperbolic mortality
Predator-prey model with herd behavior
Steady state bifurcation
Turing instability
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Summary:•Consider a diffusive predator-prey model with herd behavior and hyperbolic mortality.•The stability and Turing instability of the positive equilibrium are investigated.•The detailed Hopf and steady state bifurcation analysis to PDE system is presented.•The stable spatially homogeneous and inhomogeneous periodic solutions are found. In this paper, we consider a predator-prey model with herd behavior and hyperbolic mortality subject to the homogeneous Neumann boundary condition. Firstly, we prove the existence and uniqueness of positive equilibrium for this model by analytical skills. Then we analyze the stability of the positive equilibrium, Turing instability, and the existence of Hopf, steady state bifurcations. Finally, by calculating the normal form on the center manifold, the formulas determining the direction and the stability of Hopf bifurcations are explicitly derived. Meanwhile, for the steady state bifurcation, the possibility of pitchfork bifurcation can be concluded by the normal form, which does also determine the stability of spatially inhomogeneous steady states. Furthermore, some numerical simulations to illustrate the theoretical analysis are also carried out and expand our theoretical results.
ISSN:0960-0779
1873-2887
DOI:10.1016/j.chaos.2015.10.001