Density of Stable Interval Translation Maps
Abstract
Assume that the interval I=[0,1) is partitioned into finitely many intervals I1,…,Ir and consider a map T I I so that T Is is a translation for each 1 s r. We do not assume that the images of these intervals are disjoint. Such maps are called Interval Translation Maps. Let ITM(r) be the space of all such transformations, where we fix r but not the intervals I1,…,Ir, nor the translations. The set X(T):=n 0 Tn[0,1) can be a finite union of intervals (in which case the map is called of finite type), or is a disjoint union of finitely many intervals and a Cantor set (in which case the map is called of infinite type). In this paper we show that there exists an open and dense subset S(r) of ITM(r) consisting of stable maps, i.e. each T∈ S(r) is of finite type, the first return map to any component of X(T) corresponds to a circle rotation and S(r) T X(T) is continuous in the Hausdorff topology.
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