Teichm\"uller curves in genus two: Square-tiled surfaces and modular curves

Abstract

This work is a contribution to the classification of Teichm\"uller curves in the moduli space 2 of Riemann surfaces of genus 2. While the classification of primitive Teichm\"uller curves in 2 is complete, the classification of the imprimitive curves, which is related to branched torus covers and square-tiled surfaces, remains open. Conjecturally, the classification is completed as follows. Let Wd2[n] ⊂ 2 be the 1-dimensional subvariety consisting of those X ∈ 2 that admit a primitive degree d holomorphic map π: X E to an elliptic curve E, branched over torsion points of order n. It is known that every imprimitive Teichm\"uller curve in 2 is a component of some Wd2[n]. The parity conjecture states that (with minor exceptions) Wd2[n] has two components when n is odd, and one when n is even. In particular, the number of components of Wd2[n] does not depend on d. In this work we establish the parity conjecture in the following three cases: (1) for all n when d=2,3,4,5; (2) when d and n are prime and n > (d3-d)/4; and (3) when d is prime and n > Cd, where Cd is an implicit constant that depends on d. In the course of the proof we will see that the modular curve X(d) = / (d) is itself a square-tiled surface equipped with a natural action of . The parity conjecture is equivalent to the classification of the finite orbits of this action. It is also closely related to the following illumination conjecture: light sources at the cusps of the modular curve illuminate all of X(d), except possibly some vertices of the square-tiling. Our results show that the illumination conjecture is true for d 5.