Benjamin Hoffman
Published 2013-11-03Version 1
In this paper we consider the long-term behavior of points in ${\mathbb R}$ under iterations of continuous functions. We show that, given any Cantor set $\Lambda^*$ embedded in ${\mathbb R}$, there exists a continuous function $F^*:{\mathbb R}\to{\mathbb R}$ such that the points that are bounded under iterations of $F^*$ are just those points in $\Lambda^*$. In the course of this, we find a striking similarity between the way in which we construct the Cantor middle-thirds set, and the way in which we find the points bounded under iterations of certain continuous functions.
Topologies on the group of homeomorphisms of a Cantor set
On the union of middle-$(1-2β)$ Cantor set with its translations
The Cantor set of linear orders on N is the universal minimal S_\infty-system
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