https://orcid.org/0000-0002-4964-569X
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ABSTRACT
In this paper, we consider the problem of constraint management in Linear Periodic (LP) systems using Reference Governors (RG). First, we introduce the periodic-invariant maximal output admissible sets for LP systems. We extend the earlier results in the literature to Lyapunov stable LP systems with output constraints, which arise in RG applications. We show that, while the invariant sets for these systems may not be finitely determined, a finitely-determined inner approximation, which is periodically invariant, can be obtained by constraint tightening. We then analyze the geometric and algebraic relationship between these sets and show that these sets are related via simple transformations, implying that it suffices to compute only one of them for real-time applications. This greatly reduces the memory burden of RG (or other similar constraint management strategies), at the expense of an increase in processing requirements. We present a thorough analysis of this trade-off. In the second part of this paper, we present two RG formulations, and discuss their properties and algorithms for their computation. Numerical simulations demonstrate the efficacy of the approach.
Acknowledgements
The authors greatly appreciate the valuable discussions with Dr. Mads Almassalkhi, Dr. Uroš Kalabić, and Dr. Ilya Kolmanovsky. Comments and suggestions by anonymous reviewers are also greatly appreciated.
Disclosure statement
No potential conflict of interest was reported by the author.
ORCID
H. R. Ossareh http://orcid.org/0000-0002-4964-569X
Notes
1. Plots are generated by MPT 3.0 Toolbox in Matlab (Herceg, Kvasnica, Jones, & Morari, Citation2013).