Schwarz triangle mappings and Teichm\"uller curves: the Veech-Ward-Bouw-M\"oller curves

TL;DR

This paper investigates a family of Teichmüller curves T(n,m), simplifying their proof of being Teichmüller curves using Schwarz triangle mappings, and explores their geometric, algebraic, and dynamical properties.

Contribution

It provides a simplified proof that T(n,m) are Teichmüller curves and analyzes their structure, Lyapunov exponents, and algebraic primitivity, expanding understanding of these curves.

Findings

T(n,m) are generated by Hooper's lattice surface.

Lyapunov exponents are computed for all cases.

Every point on T(n,m) often covers points on other T(n',m').

Abstract

We study a family of Teichm\"uller curves T(n,m) constructed by Bouw and M\"oller, and previously by Veech and Ward in the cases n=2,3. We simplify the proof that T(n,m) is a Teichm\"uller curve, avoiding the use M\"oller's characterization of Teichm\"uller curves in terms of maximally Higgs bundles. Our key tool is a description of the period mapping of T(n,m) in terms of Schwarz triangle mappings. We prove that T(n,m) is always generated by Hooper's lattice surface with semiregular polygon decomposition. We compute Lyapunov exponents, and determine algebraic primitivity in all cases. We show that frequently, every point (Riemann surface) on T(n,m) covers some point on some distinct T(n',m'). The T(n,m) arise as fiberwise quotients of families of abelian covers of CP^1 branched over four points. These covers of CP^1 can be considered as abelian parallelogram-tiled surfaces, and this viewpoint facilitates much of our study.