Complex polytopic Lyapunov functions and componentwise ultimate bounds for switched linear systems: a missing link

Haimovich, Hernan; Vallarella, Alexis J.; Seron, María M.

Title: Complex polytopic Lyapunov functions and componentwise ultimate bounds for switched linear systems: a missing link
Creator: Haimovich, Hernan; Vallarella, Alexis J.; Seron, María M.
Relation: 2015 XVI Workshop on Information Processing and Control (RPIC). Proceedings of the 2015 XVI Workshop on Information Processing and Control (Cordoba, Argentina 6-9 October, 2015)
Publisher Link: http://dx.doi.org/10.1109/RPIC.2015.7497070
Publisher: Institute of Electrical and Electronics Engineers (IEEE)
Resource Type: conference paper
Date: 2016
Description: This paper deals with switched linear systems with persistent disturbances and under arbitrary switching. For these systems, a systematic componentwise ultimate bound computation method has been previously developed. This method does not employ a Lyapunov function, yet yields a mixture of ellipsoidal and polyhedral sets, which are the type of level sets obtained via complex polytopic Lyapunov functions. In this context, our contribution is as follows: (a) we show that if the aforementioned componentwise method can be applied, then a complex polytopic Lyapunov function exists based on which the same ultimate bound is obtained; (b) we provide a novel algebraic condition for the existence of a complex polytopic Lyapunov function of minimum complexity; (c) we give an example for which a polytopic Lyapunov function exists but the componentwise method cannot be applied. These results serve to establish the precise connection between the two approaches.
Subject: Lyapunov methods; switches; linear systems; complexity theory; stability analysis; context; asymptotic stability
Identifier: http://hdl.handle.net/1959.13/1337374
Identifier: uon:27826
Identifier: ISBN:9781467384667
Language: eng
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