Turing instability of periodic solutions for the Gierer–Meinhardt model with cross-diffusion

We consider the effect of time delay and cross diffusion on the dynamics of a modified Leslie-Gower predator-prey model incorporating a prey refuge. Based on the stability analysis, we demonstrate that delayed feedback may generate Hopf and Turing instability under some conditions, resulting in spatial patterns. One of the most interesting findings is that the model exhibits complex pattern replication: the model dynamics exhibits a delay and diffusion controlled formation growth not only to spots, stripes, and holes, but also to spiral pattern self-replication. The results indicate that time delay and cross diffusion play important roles in pattern formation.

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Turing Instability and Hopf Bifurcation in a Modified Leslie–Gower Predator–Prey Model with Cross-Diffusion

International Journal of Bifurcation and Chaos ◽

10.1142/s021812741850089x ◽

2018 ◽

Vol 28 (07) ◽

pp. 1850089 ◽

Cited By ~ 2

Author(s):

Walid Abid ◽

R. Yafia ◽

M. A. Aziz-Alaoui ◽

Ahmed Aghriche

Keyword(s):

Spatial Dynamics ◽

Real Life ◽

Reaction Diffusion ◽

Turing Instability ◽

Spatiotemporal Pattern ◽

Predator Prey ◽

Interior Equilibrium ◽

Cross Diffusion ◽

Predator Prey Model ◽

Prey Model

This paper is concerned with some mathematical analysis and numerical aspects of a reaction–diffusion system with cross-diffusion. This system models a modified version of Leslie–Gower functional response as well as that of the Holling-type II. Our aim is to investigate theoretically and numerically the asymptotic behavior of the interior equilibrium of the model. The conditions of boundedness, existence of a positively invariant set are proved. Criteria for local stability/instability and global stability are obtained. By using the bifurcation theory, the conditions of Hopf and Turing bifurcation critical lines in a spatial domain are proved. Finally, we carry out some numerical simulations in order to support our theoretical results and to interpret how biological processes affect spatiotemporal pattern formation which show that it is useful to use the predator–prey model to detect the spatial dynamics in the real life.

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Pattern Formation in a Predator-Prey Model with Both Cross Diffusion and Time Delay

Abstract and Applied Analysis ◽

10.1155/2014/392435 ◽

2014 ◽

Vol 2014 ◽

pp. 1-7 ◽

Cited By ~ 2

Author(s):

Boli Xie ◽

Zhijun Wang ◽

Yakui Xue

Keyword(s):

Time Delay ◽

Spatial Dynamics ◽

Turing Instability ◽

Predator Prey ◽

Cross Diffusion ◽

Predator Prey Model ◽

Prey Model ◽

Real Model ◽

Diffusion Controlled ◽

And Diffusion

A predator-prey model with both cross diffusion and time delay is considered. We give the conditions for emerging Turing instability in detail. Furthermore, we illustrate the spatial patterns via numerical simulations, which show that the model dynamics exhibits a delay and diffusion controlled formation growth not only of spots and stripe-like patterns, but also of the two coexist. The obtained results show that this system has rich dynamics; these patterns show that it is useful for the diffusive predation model with a delay effect to reveal the spatial dynamics in the real model.

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Nonlinear Dynamics of a Toxin-Phytoplankton-Zooplankton System with Self- and Cross-Diffusion

Discrete Dynamics in Nature and Society ◽

10.1155/2016/4893451 ◽

2016 ◽

Vol 2016 ◽

pp. 1-11

Author(s):

Pengfei Wang ◽

Min Zhao ◽

Hengguo Yu ◽

Chuanjun Dai ◽

Nan Wang ◽

...

Keyword(s):

Nonlinear Dynamics ◽

Spatial Distribution ◽

Theoretical Analysis ◽

Numerical Simulations ◽

Reaction Diffusion ◽

Turing Instability ◽

Reaction Diffusion Equations ◽

Diffusion Equations ◽

Cross Diffusion ◽

The Rich

A nonlinear system describing the interaction between toxin-producing phytoplankton and zooplankton was investigated analytically and numerically, where the system was represented by a couple of reaction-diffusion equations. We analyzed the effect of self- and cross-diffusion on the system. Some conditions for the local and global stability of the equilibrium were obtained based on the theoretical analysis. Furthermore, we found that the equilibrium lost its stability via Turing instability and patterns formation then occurred. In particular, the analysis indicated that cross-diffusion can play an important role in pattern formation. Subsequently, we performed a series of numerical simulations to further study the dynamics of the system, which demonstrated the rich dynamics induced by diffusion in the system. In addition, the numerical simulations indicated that the direction of cross-diffusion can influence the spatial distribution of the population and the population density. The numerical results agreed with the theoretical analysis. We hope that these results will prove useful in the study of toxic plankton systems.

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Turing instability and traveling fronts for a nonlinear reaction–diffusion system with cross-diffusion

Mathematics and Computers in Simulation ◽

10.1016/j.matcom.2011.11.004 ◽

2012 ◽

Vol 82 (6) ◽

pp. 1112-1132 ◽

Cited By ~ 55

Author(s):

G. Gambino ◽

M.C. Lombardo ◽

M. Sammartino

Keyword(s):

Reaction Diffusion ◽

Turing Instability ◽

Reaction Diffusion System ◽

Diffusion System ◽

Cross Diffusion ◽

Traveling Fronts ◽

Nonlinear Reaction

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Pattern Dynamics in a Predator–Prey Model with Schooling Behavior and Cross-Diffusion

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127419501463 ◽

2019 ◽

Vol 29 (11) ◽

pp. 1950146

Author(s):

Wen Wang ◽

Shutang Liu ◽

Zhibin Liu ◽

Da Wang

Keyword(s):

Spatial Dynamics ◽

Multiple Scale ◽

Turing Instability ◽

Predator Prey ◽

Cross Diffusion ◽

Predator Prey Model ◽

Schooling Behavior ◽

Pattern Dynamics ◽

Prey Model ◽

Pattern Formations

In this paper, a diffusive predator–prey model is considered in which the predator and prey populations both exhibit schooling behavior. The system’s spatial dynamics are captured via a suitable threshold parameter, and a sequence of spatiotemporal patterns such as hexagons, stripes and a mixture of the two are observed. Specifically, the linear stability analysis is applied to obtain the conditions for Hopf bifurcation and Turing instability. Then, employing the multiple-scale analysis, the amplitude equations near the critical point of Turing bifurcation are derived, through which the selection and stability of pattern formations are investigated. The theoretical results are verified by numerical simulations.

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Turing Patterns in a Predator-Prey System with Self-Diffusion

Abstract and Applied Analysis ◽

10.1155/2013/891738 ◽

2013 ◽

Vol 2013 ◽

pp. 1-10 ◽

Cited By ~ 3

Author(s):

Hongwei Yin ◽

Xiaoyong Xiao ◽

Xiaoqing Wen

Keyword(s):

Spatial Patterns ◽

Nonlinear Diffusion ◽

Turing Instability ◽

Turing Patterns ◽

Predator Prey ◽

Self Diffusion ◽

Cross Diffusion ◽

Prey System ◽

Diffusion Parameters ◽

Normal Diffusion

For a predator-prey system, cross-diffusion has been confirmed to emerge Turing patterns. However, in the real world, the tendency for prey and predators moving along the direction of lower density of their own species, called self-diffusion, should be considered. For this, we investigate Turing instability for a predator-prey system with nonlinear diffusion terms including the normal diffusion, cross-diffusion, and self-diffusion. A sufficient condition of Turing instability for this system is obtained by analyzing the linear stability of spatial homogeneous equilibrium state of this model. A series of numerical simulations reveal Turing parameter regions of the interaction of diffusion parameters. According to these regions, we further demonstrate dispersion relations and spatial patterns. Our results indicate that self-diffusion plays an important role in the spatial patterns.

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