English

Reduction Theorems for Hybrid Dynamical Systems

Optimization and Control 2018-07-17 v3

Abstract

This paper presents reduction theorems for stability, attractivity, and asymptotic stability of compact subsets of the state space of a hybrid dynamical system. Given two closed sets Γ1Γ2n\Gamma_1 \subset \Gamma_2 \subset \Re^n, with Γ1\Gamma_1 compact, the theorems presented in this paper give conditions under which a qualitative property of Γ1\Gamma_1 that holds relative to Γ2\Gamma_2 (stability, attractivity, or asymptotic stability) can be guaranteed to also hold relative to the state space of the hybrid system. As a consequence of these results, sufficient conditions are presented for the stability of compact sets in cascade-connected hybrid systems. We also present a result for hybrid systems with outputs that converge to zero along solutions. If such a system enjoys a detectability property with respect to a set Γ1\Gamma_1, then Γ1\Gamma_1 is globally attractive. The theory of this paper is used to develop a hybrid estimator for the period of oscillation of a sinusoidal signal.

Keywords

Cite

@article{arxiv.1712.03450,
  title  = {Reduction Theorems for Hybrid Dynamical Systems},
  author = {Manfredi Maggiore and Mario Sassano and Luca Zaccarian},
  journal= {arXiv preprint arXiv:1712.03450},
  year   = {2018}
}

Comments

This paper has been provisionally accepted for publication in the IEEE Transactions on Automatic Control. Revised July, 2018

R2 v1 2026-06-22T23:13:18.752Z