Lagrange Spectra in Teichm\"uller Dynamics via renormalization

TL;DR

This paper generalizes the classical Lagrange Spectrum to invariant loci in Teichmüller dynamics, using renormalization techniques to analyze spectral properties and their relation to pseudo-Anosov elements and bounded geodesics.

Contribution

It introduces Lagrange Spectra for invariant loci in Teichmüller space, providing formulas, density results, and connections to continued fractions and bounded geodesics.

Findings

Lagrange spectra are closed for invariant loci.

Values for pseudo-Anosov elements are dense in the spectra.

Spectra of arithmetic Teichmüller discs contain Hall's ray.

Abstract

We introduce Lagrange Spectra of closed-invariant loci for the action of SL(2,R) on the moduli space of translation surfaces, generalizing the classical Lagrange Spectrum, and we analyze them with renormalization techniques. A formula for the values in such spectra is established in terms of the Rauzy-Veech induction and it is used to show that any invariant locus has closed Lagrange spectrum and values corresponding to pseudo-Anosov elements are dense. Moreover we show that Lagrange spectra of arithmetic Teichm\"uller discs contain an Hall's ray, giving an explicit bound for it via a second formula which uses the classical continued fraction algorithm. In addition, we show the equivalence of several definitions of bounded Teichm\"uller geodesics and bounded type interval exchange transformations and we prove quantitative estimates on excursions to the boundary of moduli space in terms of norms of positive matrices in the Rauzy-Veech induction.