多稳态
参数化复杂度
油藏计算
分叉
动力系统理论
分叉理论的生物学应用
应用数学
动力系统(定义)
数学
弹道
计算机科学
分岔图
复杂动力学
霍普夫分叉
分岔理论
系统动力学
控制理论(社会学)
对偶(语法数字)
复杂系统
状态变量
倍周期分岔
算法
统计物理学
鞍结分岔
稳态(化学)
计算机模拟
数学优化
作者
Jianming Liu,X X Xu,Eric Li
出处
期刊:Chaos
[American Institute of Physics]
日期:2026-05-01
卷期号:36 (5)
摘要
Parameterized time-delay systems exhibit rich dynamics, with multistability as a typical phenomenon. This leads to multiple bifurcation diagrams, as the system's asymptotic state depends critically on initial conditions, resulting in distinct evolutionary paths under parameter variation. Predicting the multistability is essential for understanding the system's global behavior. Reservoir computing, an efficient machine learning model widely used in dynamics prediction, is employed here to address this challenge. To capture the system's intrinsic characteristics, we train the model with data from various parameter values and initial functions. For two systems, one with dual Hopf bifurcation diagrams and the other with dual period-doubling bifurcation diagrams, the model yields prediction error rates of 0.215% and 0.033%, respectively. The numerical results demonstrate that the complex dynamics exhibited by parameterized time-delay systems can be effectively predicted using the reservoir computing approach. This study thus provides a framework for extending the application of reservoir computing to intricate, multistable dynamical systems.
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