数学
不稳定性
中央歧管
分岔图
分叉
霍普夫分叉
分叉理论的生物学应用
鞍结分岔
跨临界分岔
数学分析
分岔理论
常微分方程
干草叉分叉
常量(计算机编程)
博格达诺夫-塔肯分岔
倍周期分岔
应用数学
微分方程
机械
物理
非线性系统
计算机科学
量子力学
程序设计语言
作者
Hailong Yuan,You Zhou,Xiaoyi Yang,Yang Lv,Gaihui Guo
标识
DOI:10.1142/s0218127424501098
摘要
This paper is concerned with a spatial [Formula: see text] epidemic model with nonlinear incidence rate. First, the existence of the equilibrium is discussed in different conditions. Then the main criteria for the stability and instability of the constant steady-state solutions are presented. In addition, the effect of diffusion coefficients on Turing instability is described. Next, by applying the normal form theory and the center manifold theorem, the existence and direction of Hopf bifurcation for the ordinary differential equations system and the partial differential equations system are given, respectively. The bifurcation diagrams of Hopf and Turing bifurcations are shown. Moreover, a priori estimates and local steady-state bifurcation are investigated. Furthermore, our analysis focuses on providing specific conditions that can determine the local bifurcation direction and extend the local bifurcation to the global one. Finally, the numerical results demonstrate that the intrinsic growth rate, denoted as [Formula: see text], has significant influence on the spatial pattern. Specifically, different patterns appear, with the increase of [Formula: see text]. The obtained results greatly expand on the discovery of pattern formation in the epidemic model.
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