Topological Dynamics of Enveloping Semigroups

Abstract

A compact metric space X and a discrete topological acting group T give a flow (X,T). Robert Ellis had initiated the study of dynamical properties of the flow (X,T) via the algebraic properties of its "Enveloping Semigroup" E(X). This concept of Enveloping Semigroups that he defined, has turned out to be a very fundamental tool in the abstract theory of `topological dynamics'. The flow (X,T) induces the flow (2X,T). Such a study was first initiated by Eli Glasner who studied the properties of this induced flow by defining and using the notion of a `circle operator' as an action of β T on 2X, where β T is the Stone-Cech compactification of T and also a universal enveloping semigroup. We propose that the study of properties for the induced flow (2X,T) be made using the algebraic properties of E(2X) on the lines of Ellis' \ theory, instead of looking into the action of β T on 2X via the circle operator as done by Glasner. Such a study requires extending the present theory on the flow (E(X),T). In this article, we take up such a study giving some subtle relations between the semigroups E(X) and E(2X) and some interesting associated consequences.