Topological Prevalence of Finite Type Interval Translation Maps

Abstract

An interval translation map (ITM) is a map T I I defined as a piecewise translation on a finite partition of an interval I into r 2 subintervals. Unlike classical interval exchange transformations (IETs), the images of these subintervals are allowed to overlap, making ITMs a natural generalisation of IETs. An ITM T is said to be of finite type if its attractor n 0 Tn(I) is a finite union of intervals; in this case, restricted to this invariant set, T is bijective and hence behaves like an IET. Otherwise, T is of infinite type. In this paper, for every r 2, we prove that the set of finite type ITMs contains an open and dense subset in the space of all possible ITMs on r subintervals. This confirms a topological version of a long-standing conjecture due to Boshernitzan and Kornfeld.