On the Ellis semigroup of a cascade on a compact metric countable space
Abstract
Let X be a compact metric countable space, let f:X X be a homeomorphism and let E(X,f) be its Ellis semigroup. Among other results we show that the following statements are equivalent: (i) (X,f) is equicontinuous, (ii) (X,f) is distal and (iii) every point is periodic. We use this result to give a direct proof of a theorem of Ellis saying that (X,f) is distal if, and only if, E(X,f) is a group.
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