Iterates of dynamical systems on compact metrizable countable spaces

Abstract

Given a dynamical system (X,f), we let E(X,f) denote its Ellis semigroup and E(X,f)* = E(X,f) \fn : n ∈ N\. We analyze the Ellis semigroup of a dynamical system having a compact metric countable space as a phase space. We show that if (X,f) is a dynamical system such that X is a compact metric countable space and every accumulation point X' is periodic, then either each function of E(X,f)* is continuous or each function of E(X,f)* is discontinuous. We describe an example of a dynamical system (X,f) where X is a compact metric countable space, the orbit of each accumulation point is finite and E(X,f)* contains continuous and discontinuous functions.