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LyZNet: A Lightweight Python Tool for Learning and Verifying Neural Lyapunov Functions and Regions of Attraction


Alapfogalmak
A lightweight Python tool, LyZNet, integrates learning and verification of neural Lyapunov functions for stability analysis.
Kivonat

LyZNet is a Python framework that learns neural Lyapunov functions using physics-informed neural networks (PINNs) to solve Zubov’s equation. It distinguishes itself by providing verified regions of attraction close to the domain of attraction. The tool offers automatic decomposition of nonlinear systems into low-dimensional subsystems for compositional verification. By embracing non-convex optimization problems, LyZNet proves more successful than convex optimization methods like semidefinite programming in capturing the domain of attraction. Several numerical examples demonstrate the tool's effectiveness on both low-dimensional and high-dimensional systems.

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Statisztikák
The tool relies on dReal for verification through interval analysis. The training loss consists of residual error, boundary conditions, and data loss terms. Verification conditions ensure solutions reach target sets within specified bounds.
Idézetek
"LyZNet distinguishes itself by providing verified regions of attraction close to the domain of attraction." "Our neural network framework proves more successful than convex optimization methods in capturing the domain of attraction." "The tool offers automatic decomposition of coupled nonlinear systems into low-dimensional subsystems for compositional verification."

Főbb Kivonatok

by Jun Liu,Yimi... : arxiv.org 03-18-2024

https://arxiv.org/pdf/2403.10013.pdf
LyZNet

Mélyebb kérdések

How does LyZNet compare to other tools in terms of computational efficiency

LyZNet stands out in terms of computational efficiency compared to other tools due to its ability to provide verified regions of attraction close to the domain of attraction. By incorporating Zubov's equation into the training of neural Lyapunov functions, LyZNet can achieve more accurate and less conservative results than traditional methods like sums-of-squares (SOS) techniques. This approach allows for a more precise characterization of the domain of attraction, leading to better performance in estimating regions where solutions converge towards equilibrium points.

What are the limitations or potential drawbacks of using neural networks for computing Lyapunov functions

While using neural networks for computing Lyapunov functions offers several advantages, there are also limitations and potential drawbacks. One limitation is the need for large amounts of data for training, which can be challenging to obtain in some systems. Additionally, ensuring that the learned neural network actually represents a valid Lyapunov function requires careful verification processes. Neural networks are also susceptible to overfitting and may not always generalize well beyond the training data, potentially leading to inaccuracies in stability analysis.

How can the concept of maximal Lyapunov function be practically applied in real-world systems beyond theoretical analysis

The concept of maximal Lyapunov function has practical applications beyond theoretical analysis in real-world systems. In control engineering, maximal Lyapunov functions can be used for designing robust controllers that guarantee stability under various uncertainties or disturbances. By constructing these functions based on system dynamics and constraints, engineers can ensure safe operation and performance optimization in complex systems such as autonomous vehicles, robotics, power grids, and aerospace systems. Maximal Lyapunov functions offer a systematic way to analyze stability properties while accounting for nonlinearities and external factors present in real-world scenarios.
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