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Smooth Generalized Interval Exchange Transformations with Wandering Intervals, from explicit Derived from pseudo-Anosov maps

Published 23 Apr 2021 in math.DS | (2104.11625v2)

Abstract: Starting from any pseudo-Anosov map $\varphi$ on a surface of genus $g \geqslant 2$, we construct explicitly a family of Derived from pseudo-Anosov maps $f$ by adapting the construction of Smale's Derived from Anosov maps on the two-torus. This is done by perturbing $\varphi$ at some fixed points. We first consider perturbations at every conical fixed point and then at regular fixed points. We establish the existence of a measure $\mu$, supported by the non-trivial unique minimal component of the stable foliation of $f$, with respect to which $f$ is mixing. In the process, we construct a uniquely ergodic Generalized Interval Exchange Transformation with a wandering interval that is semi-conjugated to a self-similar Interval Exchange Transformation. This Generalized Interval Exchange Transformation is obtained as the Poincar\'e map of a flow renormalized by $f$ which parametrizes stable foliation. When $f$ is $\mathcal{C}2$, the flow and the Generalized Interval Exchange Transformation are~$\mathcal{C}1$.

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