On a triply periodic polyhedral surface whose vertices are Weierstrass points

Abstract

In this paper, we will construct an example of a closed Riemann surface X that can be realized as a quotient of a triply periodic polyhedral surface ⊂ R3 where the Weierstrass points of X coincide with the vertices of . First we construct by attaching Platonic solids in a periodic manner and consider the surface of this solid. Due to periodicity we can find a compact quotient of this surface, which has genus g = 3. We claim that the resulting surface is not hyperelliptic and also that it is regular. By regular, we mean that the automorphism group of X is transitive on flags. The symmetries of X allow us to construct hyperbolic structures and various translation structures on X that are compatible with its conformal type. The translation structures are the geometric representations of the holomorphic 1-forms of X, which allow us to identify the Weierstrass points.