Cardinality of the Ellis semigroup on compact metric countable spaces

Abstract

Let E(X,f) be the Ellis semigroup of a dynamical system (X,f) where X is a compact metric space. We analyze the cardinality of E(X,f) for a compact countable metric space X. A characterization when E(X,f) and E(X,f)* = E(X,f) \ fn : n ∈ N\ are both finite is given. We show that if the collection of all periods of the periodic points of (X,f) is infinite, then E(X,f) has size 20. It is also proved that if (X,f) has a point with a dense orbit and all elements of E(X,f) are continuous, then |E(X,f)| ≤ |X|. For dynamical systems of the form (ω2 +1,f), we show that if there is a point with a dense orbit, then all elements of E(ω2+1,f) are continuous functions. We present several examples of dynamical systems which have a point with a dense orbit. Such systems provide examples where E(ω2+1,f) and ω2+1 are homeomorphic but not algebraically homeomorphic, where ω2+1 is taken with the usual ordinal addition as semigroup operation.