Local rigidity for periodic generalised interval exchange transformations
Abstract
In this article we study local rigidity properties of generalised interval exchange maps using renormalisation methods. We study the dynamics of the renormalisation operator acting on the space of -generalised interval exchange transformations at fixed points (which are standard periodic type IETs). We show that is hyperbolic and that the number of unstable direction is exactly that predicted by the ergodic theory of IETs and the work of Forni and Marmi-Moussa-Yoccoz. As a consequence we prove that the local -conjugacy class of a periodic interval exchange transformation, with intervals, whose associated surface has genus and whose Lyapounoff exponents are all non zero is a codimension -submanifold of the space of -generalised interval exchange transformations. This solves a particular case of a conjecture of Marmi-Moussa-Yoccoz.
Cite
@article{arxiv.1907.05646,
title = {Local rigidity for periodic generalised interval exchange transformations},
author = {Selim Ghazouani},
journal= {arXiv preprint arXiv:1907.05646},
year = {2020}
}
Comments
29 pages