Title :
Stability of switching systems and generalized joint spectral radius
Author :
Ogura, M. ; Martin, Clyde F.
Author_Institution :
Dept. of Math. & Stat., Texas Tech Univ., Lubbock, TX, USA
Abstract :
This paper studies the mean stability of stochastic switching linear systems. We first show that the mean stability is characterized by an extended version of so called generalized joint spectral radius. Then it is shown that, under an invariance condition, the quantity can be computed as the spectral radius of a certain matrix associated with the given switching system. Also we show that the mean square stability is equivalent to the existence of a Lyapunov function. Our results are illustrated by numerical examples.
Keywords :
Lyapunov methods; invariance; least mean squares methods; linear systems; stability; stochastic systems; time-varying systems; Lyapunov function; generalized joint spectral radius; invariance condition; mean square stability; stochastic switching linear systems; switching systems stability; Joints; Manganese; Numerical stability; Stability criteria; Switches; Switching systems;
Conference_Titel :
Control Conference (ECC), 2013 European
Conference_Location :
Zurich
