Consequences of fear effect and prey refuge on the Turing patterns in a delayed predator–prey system

中央歧管 数学 霍普夫分叉 阿利效应 消光(光学矿物学) 分叉 人口 捕食 控制理论(社会学) 双稳态 理论(学习稳定性) 鞍结分岔 统计物理学 不稳定性 应用数学 数学分析 物理 生态学 计算机科学 机械 生物 非线性系统 光学 社会学 人口学 人工智能 机器学习 量子力学 控制(管理)
作者
None Anshu,Balram Dubey,Sourav Kumar Sasmal,Anand Sudarshan
出处
期刊:Chaos [American Institute of Physics]
卷期号:32 (12): 123132-123132
标识
DOI:10.1063/5.0126782
摘要

This study presents a qualitative analysis of a modified Leslie–Gower prey–predator model with fear effect and prey refuge in the presence of diffusion and time delay. For the non-delayed temporal system, we examined the dissipativeness and persistence of the solutions. The existence of equilibria and stability analysis is performed to comprehend the complex behavior of the proposed model. Bifurcation of codimension-1, such as Hopf-bifurcation and saddle-node, is investigated. In addition, it is observed that increasing the strength of fear may induce periodic oscillations, and a higher value of fear may lead to the extinction of prey species. The system shows a bistability attribute involving two stable equilibria. The impact of providing spatial refuge to the prey population is also examined. We noticed that prey refuge benefits both species up to a specific threshold value beyond which it turns detrimental to predator species. For the non-spatial delayed system, the direction and stability of Hopf-bifurcation are investigated with the help of the center manifold theorem and normal form theory. We noticed that increasing the delay parameter may destabilize the system by producing periodic oscillations. For the spatiotemporal system, we derived the analytical conditions for Turing instability. We investigated the pattern dynamics driven by self-diffusion. The biological significance of various Turing patterns, such as cold spots, stripes, hot spots, and organic labyrinth, is examined. We analyzed the criterion for Hopf-bifurcation for the delayed spatiotemporal system. The impact of fear response delay on spatial patterns is investigated. Numerical simulations are illustrated to corroborate the analytical findings.

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