极限环
李雅普诺夫指数
混乱的
数学
控制理论(社会学)
平衡点
极限(数学)
理论(学习稳定性)
分叉
非线性系统
李雅普诺夫函数
分岔理论
统计物理学
应用数学
计算机科学
物理
数学分析
人工智能
机器学习
控制(管理)
微分方程
量子力学
作者
Pijush Panday,Nikhil Pal,Sudip Samanta,Joydev Chattopadhyay
标识
DOI:10.1142/s0218127418500098
摘要
In the present paper, we investigate the impact of fear in a tri-trophic food chain model. We propose a three-species food chain model, where the growth rate of middle predator is reduced due to the cost of fear of top predator, and the growth rate of prey is suppressed due to the cost of fear of middle predator. Mathematical properties such as equilibrium analysis, stability analysis, bifurcation analysis and persistence have been investigated. We also describe the global stability analysis of the equilibrium points. Our numerical simulations reveal that cost of fear in basal prey may exhibit bistability by producing unstable limit cycles, however, fear in middle predator can replace unstable limit cycles by a stable limit cycle or a stable interior equilibrium. We observe that fear can stabilize the system from chaos to stable focus through the period-halving phenomenon. We conclude that chaotic dynamics can be controlled by the fear factors. We apply basic tools of nonlinear dynamics such as Poincaré section and maximum Lyapunov exponent to identify the chaotic behavior of the system.
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