Toral or non locally connected minimal sets for suspensions of R-closed surface homeomorphisms
Abstract
Let M be an orientable connected closed surface and f be an R-closed homeomorphism on M which is isotopic to identity. Then the suspension of f satisfies one of the following condition: 1) the closure of each element of it is minimal and toral. 2) there is a minimal set which is not locally connected. Moreover, we show that any positive iteration of an R-closed homeomorphism on a compact metrizable space is R-closed.
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