数学
同宿轨道
博格达诺夫-塔肯分岔
同宿分支
异宿分岔
霍普夫分叉
鞍结分岔
干草叉分叉
分叉理论的生物学应用
分岔图
跨临界分岔
分叉
简并能级
尖点(奇点)
极限(数学)
数学分析
分岔理论
余维数
非线性系统
物理
几何学
量子力学
作者
Yue Yang,Yancong Xu,Libin Rong,Shigui Ruan
摘要
Abstract In this paper, we study a predator–prey mite model of Leslie type with generalized Holling IV functional response. The model is shown to have very rich bifurcation dynamics, including subcritical and supercritical Hopf bifurcations, degenerate Hopf bifurcation, focus‐type and cusp‐type degenerate Bogdanov–Takens bifurcations of codimension 3, originating from a nilpotent focus or cusp of codimension 3 that acts as the organizing center for the bifurcation set. Coexistence of multiple steady states, multiple limit cycles, and homoclinic cycles is also found. Interestingly, the coexistence of two limit cycles is guaranteed by investigating generalized Hopf bifurcation and degenerate homoclinic bifurcation, and we also find that two generalized Hopf bifurcation points are connected by a saddle‐node bifurcation curve of limit cycles, which indicates the existence of global regime for two limit cycles. Our work extends some results in the literature.
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