数学
独特性
颂歌
分叉
非线性系统
扩散
稳态(化学)
应用数学
霍普夫分叉
反应扩散系统
常量(计算机编程)
数学分析
分叉理论的生物学应用
热力学
物理
物理化学
化学
程序设计语言
量子力学
计算机科学
作者
Conghui Zhang,Haifeng Zhang,Shanbing Li
标识
DOI:10.1080/00036811.2023.2173184
摘要
A reaction-diffusion-ODE system of stoichiometric producer-grazer type is considered in this paper. Since the system has nonsmooth nonlinearity, it is shown that the system has new dynamics different from the smooth case. We construct various types of discontinuous steady states and investigate their asymptotic behavior. In addition, the steady-state bifurcation near a constant solution is studied by treating the diffusion coefficient as a bifurcation parameter and the existence of Hopf bifurcation is derived. Our results cover the case where the number of positive equilibria of the kinetic system (i.e. without diffusion) changes from one to three in the spatial interval. Finally, some numerical simulations are given to illustrate the theoretical results.
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