On recurrence in zero-dimensional locally compact flow with compactly generated phase group

Abstract

Let X be a zero-dimensional locally compact Hausdorff space not necessarily metric and G a compactly generated topological group not necessarily abelian or countable. We define recurrence at a point for any continuous action of G on X, and then, show that if Gx is compact for all x∈ X, the conditions (i) this dynamics is pointwise recurrent, (ii) X is a union of G-minimal sets, (iii) the G-orbit closure relation is closed in X× X, and (iv) X x Gx∈ 2X is continuous, are pairwise equivalent. Consequently, if this dynamics is distal, then it is equicontinuous.