Linearization of generalized interval exchange maps

Abstract

A standard interval exchange map is a one-to-one map of the interval which is locally a translation except at finitely many singularities. We define for such maps, in terms of the Rauzy-Veech continuous fraction algorithm, a diophantine arithmetical condition called restricted Roth type which is almost surely satisfied in parameter space. Let T0 be a standard interval exchange map of restricted Roth type, and let r be an integer ≥ 2. We prove that, amongst Cr+3 deformations of T0 which are Cr+3 tangent to T0 at the singularities, those which are conjugated to T0 by a Cr diffeomorphism close to the identity form a C1 submanifold of codimension (g-1)(2r+1) +s. Here, g is the genus and s is the number of marked points of the translation surface obtained by suspension of T0. Both g and s can be computed from the combinatorics of T0.