Demou Luo scite author profile

This article is concerned with a generalized almost periodic predatorprey model with impulsive effects and time delays. By utilizing comparison theorem and constructing a feasible Lyapunov functional, we obtain sufficient conditions to guarantee the permanence and global asymptotic stability of the system. By applying Arzelà-Ascoli theorem, we establish the existence and uniqueness of almost-periodic positive solutions. A feasible numerical simulation is provided to explain the suitability of our main criteria.

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Global bifurcation for a reaction–diffusion predator–prey model with Holling-II functional response and prey–taxis

Luo

2021

Chaos, Solitons & Fractals

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Global boundedness of solutions in a reaction–diffusion system of Beddington–DeAngelis-type predator–prey model with nonlinear prey-taxis and random diffusion

Luo

2018

Bound Value Probl

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In this paper, a reaction-diffusion system of a predator-prey model with Beddington-DeAngelis functional response is considered. This model describes a prey-taxis mechanism that is an immediate movement of the predator u in response to a change of the prey v (which leads to the collection of u). We use some approaches to prove the global existence-boundedness of classical solutions and overcome the substantial difficulty of the existence of a nonlinear prey-taxis term. MSC: Primary 35A01; secondary 35K57

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Demou Luo

The Study of Global Stability of a Periodic Beddington–DeAngelis and Tanner Predator-Prey Model

Global bifurcation and pattern formation for a reaction–diffusion predator–prey model with prey-taxis and double Beddington–DeAngelis functional responses

Dynamic analysis on an almost periodic predator-prey system with impulsive effects and time delays

Global bifurcation for a reaction–diffusion predator–prey model with Holling-II functional response and prey–taxis

Global boundedness of solutions in a reaction–diffusion system of Beddington–DeAngelis-type predator–prey model with nonlinear prey-taxis and random diffusion

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