Dynamics on Hyperspace of Pointwise Periodic Homeomorphisms
Abstract
In this paper, we first prove that the topological entropy of induced map of any distal homeomorphism of a compact metric space is null. Then we consider induced map 2f of an arbitrary pointwise periodic homeomorphism f:X X of a compact metric space X, we show that the set of almost periodic points coincides with the set of uniformly recurrent points, i.e. AP(2f)=UR(2f). Furthermore, we prove that inside any infinite ω-limit set ω2f(A) there is a unique minimal set and this minimal set is an adding machine. As a consequence, (2X,2f) has no Devaney chaotic subsystems. In contrast to these rigidity properties, we obtain some results with chaotic flavor. In fact, we prove the following dichotomy, the hyperspace system (2X,2f) is either equicontinuous or choatic with respect to Li-Yorke chaos and ω-chaos. It is shown that the later case occurs if and only if R(2f) AP(2f)≠. This enables us to provide simple examples of pointwise periodic homeomorphisms with chaotic induced systems.
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