Dynamical analysis of a delayed diffusive predator–prey model with schooling behaviour and Allee effect

Meng, Xin-You; Jiao-guo, Wang

doi:10.1080/17513758.2020.1850892

Cited by 14 publications

(2 citation statements)

References 40 publications

(50 reference statements)

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“…Time delays have been widely used to describe the influence of a population on its status in biological systems. In physics, ecology, biology, and other applications, delay differential equations are often more practical than ordinary differential equations since a time delay could cause a stable equilibrium to become unstable and cause the population to fluctuate [1][2][3][4][5][6][7].…”

Section: Introductionmentioning

confidence: 99%

Stability Analysis of a Stage-Structure Predator–Prey Model with Holling III Functional Response and Cannibalism

Wei

2022

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This paper considers the time taken for young predators to become adult predators as the delay and constructs a stage-structured predator–prey system with Holling III response and time delay. Using the persistence theory for infinite-dimensional systems and the Hurwitz criterion, the permanent persistence condition of this system and the local stability condition of the system’s coexistence equilibrium are given. Further, it is proven that the system undergoes a Hopf bifurcation at the coexistence equilibrium. By using Lyapunov functions and the LaSalle invariant principle, it is shown that the trivial equilibrium and the coexistence equilibrium are globally asymptotically stable, and sufficient conditions are derived for the global stability of the coexistence equilibrium. Some numerical simulations are carried out to illustrate the main results.

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Section: Introductionmentioning

confidence: 99%

Stability Analysis of a Stage-Structure Predator–Prey Model with Holling III Functional Response and Cannibalism

Wei

2022

Axioms

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“…is spatial diffusion is subject to Fick's law. erefore, the influence of spatial diffusion on the phytoplankton-plankton model has been paid more attention by many scholars [35][36][37][38][39][40][41][42][43][44][45]. In the work by Jia et al [46], a three-component plankton model with spatial diffusion and time delay is proposed, which describes the relationship between a zooplankton and two phytoplankton.…”

Section: Introductionmentioning

confidence: 99%

Stability and Bifurcation for a Delayed Diffusive Two‐Zooplankton One‐Phytoplankton Model with Two Different Functions

Meng

Xiao

2021

Complexity

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In this paper, a diffusion two-phytoplankton one-zooplankton model with time delay, Beddington–DeAnglis functional response, and Holling II functional response is proposed. First, the existence and local stability of all equilibria of such model are studied. Then, the existence of Hopf bifurcation of the corresponding model without diffusion is given by taking time delay as the bifurcation parameter. Next, the direction of Hopf bifurcation and the stability of the bifurcating periodic solutions are investigated by using the normal form theory and center manifold theorem. Furthermore, due to the local bifurcation theory of partial functional differential equations, Hopf bifurcation of the model is investigated by considering time delay as the bifurcation parameter. The explicit formulas to determine the properties of Hopf bifurcation are given by the method of the normal form theory and center manifold theorem for partial functional differential equations. Finally, some numerical simulations are performed to check out our theoretical results.

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Hopf and Turing–Hopf bifurcation analysis of a delayed predator–prey model with schooling behavior

Ding,

Yang

2023

Z. Angew. Math. Phys.

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Dynamical analysis of a delayed diffusive predator–prey model with schooling behaviour and Allee effect

Cited by 14 publications

References 40 publications

Stability Analysis of a Stage-Structure Predator–Prey Model with Holling III Functional Response and Cannibalism

Stability Analysis of a Stage-Structure Predator–Prey Model with Holling III Functional Response and Cannibalism

Stability and Bifurcation for a Delayed Diffusive Two‐Zooplankton One‐Phytoplankton Model with Two Different Functions

Hopf and Turing–Hopf bifurcation analysis of a delayed predator–prey model with schooling behavior

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