Bifurcation analysis and chaos control of discrete prey–predator model incorporating novel prey–refuge concept

IF 0.9 Q3 MATHEMATICS, APPLIED Computational and Mathematical Methods Pub Date : 2021-08-11 DOI:10.1002/cmm4.1185
Prasun K. Santra, Ghanshaym S. Mahapatra, Ganga R. Phaijoo
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引用次数: 9

Abstract

This article investigates a prey–predator model incorporating a novel refuge proportional to prey and inverse proportion to the predator. We find conditions for the local asymptotic stability of fixed points of the proposed prey–predator model. This article presents Neimark–Sacker bifurcation (NSB) and period-doubling bifurcation (PDB) at particular parameter values for positive equilibrium points of the proposed refuge-based prey–predator system. The system exhibits the chaotic dynamics at increasing values of the bifurcation parameter. The hybrid control methodology will control the chaos of the proposed prey–predator dynamical system and discuss the chaotic situation for different biological parameters through graphical analysis. Numerical simulations support the theoretical outcome and long-term chaotic behavior over a broad range of parameters.

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包含新猎物-避难所概念的离散猎物-捕食者模型的分岔分析与混沌控制
本文研究了一个包含与猎物成正比和与捕食者成反比的新型避难所的捕食者-捕食者模型。我们找到了该模型不动点局部渐近稳定的条件。本文给出了特定参数值下的neimmark - sacker分岔(NSB)和倍周期分岔(PDB)。当分岔参数增大时,系统表现出混沌动力学特性。混合控制方法将控制所提出的食饵-捕食者动力系统的混沌性,并通过图形分析讨论不同生物参数下的混沌情况。数值模拟支持理论结果和在广泛参数范围内的长期混沌行为。
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