周期系统的差分神经网络辨识器:一种Floquet理论方法

Differential Neural Network Identifiers for Periodic Systems, a Floquet’s Theory Approach

IEEE Transactions on Systems, Man, and Cybernetics: Systems · 2024
被引 0
ABS 3

中文导读

提出一种基于Floquet理论的差分神经网络辨识器,用于对数学模型不确定的周期系统进行建模,通过周期微分Lyapunov方程设计学习律,实现权重单周期收敛。

Abstract

The precise modeling of dynamic systems with periodic trajectories is required to describe diverse systems in mechanical, electrical, and many other disciplines. Nevertheless, the modeling task based on traditional methodologies could be complicated, considering the specific nature of periodic motions in actual systems. Differential neural networks (DNNs) are modeling tools for dynamic systems that can be useful for developing precise representations of periodic systems. This study presents the design of a novel family of DNN identifiers that could reproduce the trajectories of periodic systems with an uncertain mathematical model. The suggested DNN identifiers may produce an approximate model with periodic properties similar to the system under analysis exhibiting an one-period convergence of DNN weights. The fundamentals of the Floquet’s theory drive the design of the learning laws to ensure the reproduction of the periodic properties in the DNN. The design of a controlled Lyapunov function allows the learning laws to be derived for the DNN weights whose evolution depends on the positive definite solution of a periodic differential Lyapunov equation. Several numerical evaluations on periodic systems confirmed the modeling performance of the proposed identifier when the approximation performance is compared with traditional DNN identifiers using sigmoidal functions.

神经网络系统辨识周期系统控制理论非线性系统