Equicontinuous mappings on finite trees

Abstract

If X is a finite tree and f X X is a map, as the Main Theorem of this paper we find eight conditions, each of which is equivalent to the fact that f is equicontinuous. To name just a few of the results obtained: the equicontinuity of f is equivalent to the fact that there is no arc A ⊂eq X satisfying A ⊂neq fn[A] for some n∈ N. It is also equivalent to the fact that for some nonprincial ultrafilter u, the function fu X X is continuous (in other words, failure of equicontinuity of f is equivalent to the failure of continuity of every element of the Ellis remainder g∈ E(X,f)*). One of the tools used in the proofs is the Ramsey-theoretic result known as Hindman's theorem. Our results generalize the ones shown by Vidal-Escobar and Garc\'ia-Ferreira, and complement those of Bruckner and Ceder, Mai, and Camargo, Rinc\'on and Uzc\'ategui.