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Autores principales: K., Lakshmi Priya P., Schwung, Andreas
Formato: Preprint
Publicado: 2025
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Acceso en línea:https://arxiv.org/abs/2508.13241
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author K., Lakshmi Priya P.
Schwung, Andreas
author_facet K., Lakshmi Priya P.
Schwung, Andreas
contents Discovering the governing equations of a physical system and designing an effective feedback controller remains one of the most challenging and intensive areas of ongoing research. This task demands a deep understanding of the system behavior, including the nonlinear factors that influence its dynamics. In this article, we propose a novel methodology for identifying a feedback linearized physical system based on known prior dynamic behavior. Initially, the system is identified using a sparse regression algorithm, subsequently a feedback controller is designed for the discovered system by applying Lie derivatives to the dictionary of output functions to derive an augmented constraint which guarantees that no internal dynamics are observed. Unlike the prior related works, the novel aspect of this article combines the approach of stacked regression algorithm and relative degree conditions to discover and feedback linearize the true governing equations of a physical model.
format Preprint
id arxiv_https___arxiv_org_abs_2508_13241
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Data driven feedback linearization of nonlinear control systems via Lie derivatives and stacked regression approach
K., Lakshmi Priya P.
Schwung, Andreas
Machine Learning
Discovering the governing equations of a physical system and designing an effective feedback controller remains one of the most challenging and intensive areas of ongoing research. This task demands a deep understanding of the system behavior, including the nonlinear factors that influence its dynamics. In this article, we propose a novel methodology for identifying a feedback linearized physical system based on known prior dynamic behavior. Initially, the system is identified using a sparse regression algorithm, subsequently a feedback controller is designed for the discovered system by applying Lie derivatives to the dictionary of output functions to derive an augmented constraint which guarantees that no internal dynamics are observed. Unlike the prior related works, the novel aspect of this article combines the approach of stacked regression algorithm and relative degree conditions to discover and feedback linearize the true governing equations of a physical model.
title Data driven feedback linearization of nonlinear control systems via Lie derivatives and stacked regression approach
topic Machine Learning
url https://arxiv.org/abs/2508.13241