Attractors and limit cycles of discrete-time switching affine systems : nominal and uncertain cases

This paper deals with the robust stabilization of uncertain discrete-time switched affine systems using a control Lyapunov approach and a min-switching state-feedback control law. After presenting some preliminaries on limit cycles, a constructive stabilization theorem, expressed as linear matrix inequalities, guarantees that the solutions to the nominal closed-loop system converge to a limit cycle. This method is extended to the case of uncertain systems, for which the notion of limit cycle needs to be adapted. The theoretical results are evaluated on academic examples and demonstrate the potential of the method over the recent literature.

Mots clés

Switched affine systems Robust Stabilization Uncertain systems LMI Control Lyapunov function

Domaines

Automatique / Robotique

Fichier principal

2023_AUT_MS_AttractorSAS.pdf (1.73 Mo)

Origine : Fichiers produits par l'(les) auteur(s)

Alexandre Seuret : Connectez-vous pour contacter le contributeur

https://laas.hal.science/hal-03110340

Soumis le : mercredi 14 septembre 2022-09:34:45

Dernière modification le : lundi 15 janvier 2024-14:26:03

Dates et versions

hal-03110340 , version 1 (14-01-2021)

hal-03110340 , version 2 (14-09-2022)

Identifiants

HAL Id : hal-03110340 , version 2
DOI : 10.1016/j.automatica.2022.110691

Citer

Mathias Serieye, Carolina Albea-Sanchez, Alexandre Seuret, Marc Jungers. Attractors and limit cycles of discrete-time switching affine systems : nominal and uncertain cases. Automatica, 2023, 149, pp.110691. ⟨10.1016/j.automatica.2022.110691⟩. ⟨hal-03110340v2⟩

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