English

Generalized superelliptic Riemann surfaces

Algebraic Geometry 2025-01-23 v4

Abstract

A closed Riemann surface X\mathcal X, of genus g2g \geq 2, is called a generalized superelliptic curve of level n2n \geq 2 if it admits an order nn conformal automorphism τ\tau so that X/τ\mathcal X/\langle \tau \rangle has genus zero and τ\tau is central in Aut(X){\rm Aut}(\mathcal X); the cyclic group H=τH=\langle \tau \rangle is called a generalized superelliptic group of level nn for X\mathcal X. These Riemann surfaces are natural generalizations of hyperelliptic Riemann surfaces (when n=2n=2). We provide an algebraic curve description of these Riemann surfaces in terms of their groups of automorphisms. Also, we observe that the generalized superelliptic group HH of level nn is unique, with the exception of a very particular family of exceptional generalized superelliptic Riemann surfaces for nn even. In particular, the uniqueness holds if either: (i) nn is odd or (ii) the quotient X/H\mathcal X/H has all its cone points of order nn (for instance, when X\mathcal X is a superelliptic curve of level nn). In the non-exceptional case, we use this uniqueness property of its generalized superelliptic group HH to observe that the corresponding curves are definable over their fields of moduli if Aut(X)/H{\rm Aut}(\mathcal X)/H is neither trivial or cyclic.

Keywords

Cite

@article{arxiv.1609.09576,
  title  = {Generalized superelliptic Riemann surfaces},
  author = {Ruben A. Hidalgo and Saúl Quispe and Tony Shaska},
  journal= {arXiv preprint arXiv:1609.09576},
  year   = {2025}
}

Comments

Some editio/correctionsn to the first five sections

R2 v1 2026-06-22T16:06:08.760Z