Minimality, distality and equicontinuity for semigroup actions on compact Hausdorff spaces

Abstract

Let π T× X→ X with phase map (t,x) tx, denoted (π,T,X), be a semiflow on a compact Hausdorff space X with phase semigroup T. If each t∈ T is onto, (π,T,X) is called surjective; and if each t∈ T is 1-1 onto (π,T,X) is called invertible and in latter case it induces π-1 X× T→ X by (x,t) xt:=t-1x, denoted (π-1,X,T). In this paper, we show that (π,T,X) is equicontinuous surjective iff it is uniformly distal iff (π-1,X,T) is equicontinuous surjective. As applications of this theorem, we also consider the minimality, distality, and sensitivity of (π-1,X,T) if (π,T,X) is invertible with these dynamics. We also study the pointwise recurrence and Gottschalk's weak almost periodicity of Z-flow with compact zero-dimensional phase space.