Linear dynamics of random products of operators

Abstract

We study the linear dynamics of the random sequence (Tn(.))n ≥ 1 of the operators Tn(ω) = T(τn-1ω) …m T(τ ω) T(ω), n ≥ 1. These products depend on an ergodic measure-preserving transformation τ : T T on the probability space (T, m) and on a strongly measurable map T : T B(X), where X is a separable Fr\'echet space. We will be focusing on the case where T(ω) is equal to an operator T1 on X for every ω ∈ A1 and equal to an operator T2 on X for every ω ∈ A2, where A1, A2 are two disjoint Borel subsets of [0,1) such that A1 A2 = [0,1) and m(Ak) > 0 for k = 1,2. More precisely, we will be focusing on the case where the operators T1 and T2 are adjoints of multiplication operators on the Hardy space H2(D), as well as the case where T1 and T2 are entire functions of exponential type of the derivation operator on the space of entire functions. Finally, we will study the linear dynamics of a case of a random product Tn(ω) for which the operators T(τi ω), i ≥ 0, do not commute. We will give particular importance to the case where the ergodic transformation is an irrational rotation or the doubling map on T.