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Bibliographic Details
Main Authors: De Persis, C., Gadginmath, D., Pasqualetti, F., Tesi, P.
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2308.11229
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author De Persis, C.
Gadginmath, D.
Pasqualetti, F.
Tesi, P.
author_facet De Persis, C.
Gadginmath, D.
Pasqualetti, F.
Tesi, P.
contents Controlling nonlinear systems, especially when data are being used to offset uncertainties in the model, is hard. A natural approach when dealing with the challenges of nonlinear control is to reduce the system to a linear one via change of coordinates and feedback, an approach commonly known as feedback linearization. Here we consider the feedback linearization problem of an unknown system when the solution must be found using experimental data. We propose a new method that learns the change of coordinates and the linearizing controller from a library (a dictionary) of candidate functions with a simple algebraic procedure - the computation of the null space of a data-dependent matrix. Remarkably, we show that the solution is valid over the entire state space of interest and not just on the dataset used to determine the solution.
format Preprint
id arxiv_https___arxiv_org_abs_2308_11229
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Feedback linearization through the lens of data
De Persis, C.
Gadginmath, D.
Pasqualetti, F.
Tesi, P.
Systems and Control
Optimization and Control
Controlling nonlinear systems, especially when data are being used to offset uncertainties in the model, is hard. A natural approach when dealing with the challenges of nonlinear control is to reduce the system to a linear one via change of coordinates and feedback, an approach commonly known as feedback linearization. Here we consider the feedback linearization problem of an unknown system when the solution must be found using experimental data. We propose a new method that learns the change of coordinates and the linearizing controller from a library (a dictionary) of candidate functions with a simple algebraic procedure - the computation of the null space of a data-dependent matrix. Remarkably, we show that the solution is valid over the entire state space of interest and not just on the dataset used to determine the solution.
title Feedback linearization through the lens of data
topic Systems and Control
Optimization and Control
url https://arxiv.org/abs/2308.11229