Dichotomy for the Hausdorff dimension of nonergodic directions on translation surfaces

TL;DR

This paper investigates the Hausdorff dimension of nonergodic directions on a class of translation surfaces formed by gluing tori, establishing a dichotomy based on a number-theoretic condition and extending previous results.

Contribution

It extends the dichotomy result for Hausdorff dimensions of nonergodic directions to a broader class of translation surfaces and characterizes this dichotomy via the Pe9rez-Marco condition.

Findings

Hausdorff dimension of nonergodic directions is 0 or 1/2.

Dichotomy is characterized by the Pe9rez-Marco condition.

The Pe9rez-Marco condition is norm-independent.

Abstract

We study the ergodic properties of the translation surface $X_{\lambda,\mu}$ formed by gluing two flat tori along a slit with holonomy $(\lambda,\mu) \in \mathbb{R}^2$. Extending the dichotomy result of Cheung, Hubert, and Masur for the case $\mu = 0$, we prove the following: for slits not parallel to any absolute homology class, the Hausdorff dimension of the set of nonergodic directions is either $0$ or $\frac{1}{2}$. This dichotomy is completely characterized by the P\'erez-Marco condition expressed in terms of best approximation denominators. As a corollary, we obtain that the P\'erez-Marco condition for best approximation denominators is norm-independent.