Linear dynamics and recurrence properties defined via essential idempotents of β N

Abstract

Consider F a non-empty set of subsets of N. An operator T on X satisfies property PF if for any U non-empty open set in X, there exists x∈ X such that \n∈N: Tnx∈ U\∈ F. Let BD the collection of sets in N with positive upper Banach density. Our main result is a characterization of sequence of operators satisfying property PBD, for which we have used a strong result of Bergelson and Mccutcheon in the vein of Szemer\'edi's theorem. It turns out that operators having property PBD satisfy a kind of recurrence described in terms of essential idempotents of β N. We will also discuss the case of weighted backward shifts. Finally, we obtain a characterization of reiteratively hypercyclic operators.