Uniqueness of a topological Furstenberg system

Abstract

Given a semigroup G and a bounded function f: G C, a topological Furstenberg system of f is a topological dynamical system X=(X, (Tg)g ∈ G) that encodes the dynamical behaviour of f. We show that X is unique up to topological isomorphism, thus providing a topological analogue of the measurable case established by Bergelson and Ferr\'e Moragues for amenable semigroups. We also provide necessary and sufficient conditions for subsets of a group to have isomorphic Furstenberg systems. In addition, we study sets with minimal Furstenberg systems and identify them as a special subclass of dynamically syndetic sets. Moreover, we use this notion to obtain a new characterization of sets of topological recurrence.

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