Automorphism groups of origami curves

Abstract

A closed Riemann surface S (of genus at least one) is called an origami curve if it admits a non-constant holomorphic map β:S E with at most one branch value, where E is a genus one Riemann surface. In this case, (S,β) is called an origami pair and Aut(S,β) is the group of conformal automorphisms φ of S such that β=β φ. Let G be a finite group. It is a known fact that G can be realized as a subgroup of Aut(S,β) for a suitable origami pair (S,β). It is also known that G can be realized as a group of conformal automorphisms of a Riemann surface X of genus g ≥ 2 and with quotient orbifold X/G also of genus γ ≥ 2. Given a conformal action of G on a surface X as before, we prove that there is an origami pair (S,β), where S has genus g and G Aut(S,β) such that the actions of Aut(S,β) on S and that of G on X are topologically equivalent.