快速傅里叶变换
分岔图
分叉
倍周期分岔
逻辑图
数学
鞍结分岔
谐波
混乱的
分叉理论的生物学应用
控制理论(社会学)
计算机科学
算法
非线性系统
物理
人工智能
量子力学
电压
控制(管理)
作者
Nazanin Zandi-Mehran,Fahimeh Nazarimehr,Karthikeyan Rajagopal,Dibakar Ghosh,Sajad Jafari,Guanrong Chen
标识
DOI:10.1016/j.amc.2022.126986
摘要
This paper presents FFT bifurcation as a tool for investigating complex dynamics. Firstly, two well-known chaotic systems (Rössler and Lorenz) are discussed from the frequency viewpoint. Then, both discrete-time and continuous-time systems are studied. Various systems with different properties are discussed. In discrete-time systems, Logistic map and a biological map are investigated. For continuous-time systems, a system with a stable equilibrium, forced van der Pol system, and a system with a line of equilibria are discussed. For each system under investigation, the proposed FFT bifurcation diagrams are compared with the conventional bifurcation diagrams, showing some interesting information uncovered by the FFT bifurcation. For periodic trajectories, the FFT bifurcations show high power at the dominant frequency and harmonics. By doubling the periods, their dominant frequencies are halved, and more harmonics emerge in the studied frequency intervals. For the chaotic dynamics, the FFT bifurcation shows a wideband power spectrum. The FFT bifurcation shows interesting results in comparison to conventional bifurcation diagrams.
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