On the gap between deterministic and probabilistic joint spectral radii for discrete-time linear systems

Abstract

Given a discrete-time linear switched system ( A) associated with a finite set A of matrices, we consider the measures of its asymptotic behavior given by, on the one hand, its deterministic joint spectral radius d( A) and, on the other hand, its probabilistic joint spectral radii p(,P, A) for Markov random switching signals with transition matrix P and a corresponding invariant probability . Note that d( A) is larger than or equal to p(,P, A) for every pair (, P). In this paper, we investigate the cases of equality of d( A) with either a single p(,P, A) or with the supremum of p(,P, A) over (,P) and we aim at characterizing the sets A for which such equalities may occur.