-transitivity for several transformations and an application to the coboundary problem

Abstract

Given a compact and complete metric space X with several continuous transformations T1, T2, … TH: X X, we find sufficient conditions for the existence of a point x∈ X such that (x,x,…,x)∈ XH has dense orbit for the transformation T:=T1× T2×·s× TH. We use these conditions together with Livsic theorem, to obtain that for α-H\"older maps f1,f2,…,fH: X R, the product Πi=1H fi(xi) is a smooth coboundary with respect to T is equivalent to the existence of a non-empty open subset U ⊂ X such that N x∈ U| Σj=0N Πi=1H fi (Tij x) | < ∞.