The hyperspace ω(f) when f is a transitive dendrite mapping

Abstract

Let X be a compact metric space. By 2X we denote the hyperspace of all closed and non-empty subsets of X endowed with the Hausdorff metric. Let f:X X be a continuous function. In this paper we study some topological properties of the hyperspace ω(f), the collection of all omega limits sets ω(x,f) with x∈ X. We prove the following: i) If X has no isolated points, then, for every continuous function f:X X, int2X(ω(f))=. ii) If X is a dendrite for which every arc contains a free arc and f:X X is transitive, then the hyperspace ω(f) is totally disconnected. iii) Let D∞ be the Wazewski's universal dendrite. Then there exists a transitive continuous function f:D∞ D∞ for which the hyperspace ω(f) contains an arc; hence, ω(f) is not totally disconnected.

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