Extensions of finite cyclic group actions on bordered surfaces

  1. Emilio Bujalance 1
  2. Francisco Javier Cirre 1
  3. Marston D. E. Conder 2
  1. 1 Universidad Nacional de Educación a Distancia
    info

    Universidad Nacional de Educación a Distancia

    Madrid, España

    ROR https://ror.org/02msb5n36

  2. 2 University of Auckland
    info

    University of Auckland

    Auckland, Nueva Zelanda

    ROR https://ror.org/03b94tp07

Journal:
Revista matemática iberoamericana

ISSN: 0213-2230

Year of publication: 2015

Volume: 31

Issue: 1

Pages: 349-372

Type: Article

DOI: 10.4171/RMI/837 DIALNET GOOGLE SCHOLAR

More publications in: Revista matemática iberoamericana

Abstract

We study the question of the extendability of the action of a finite cyclic group on a compact bordered Klein surface (either orientable or non-orientable). This extends previous work by the authors for group actions on unbordered surfaces. It is shown that if such a cyclic action is realised by means of a non-maximal NEC signature, then the action always extends. For a given integer g≥2, we determine the order of the largest cyclic group that acts as the full automorphism group of a bordered surface of algebraic genus g, and the topological type of the surfaces on which the largest action takes place. In addition, we calculate the smallest algebraic genus of a bordered surface on which a given cyclic group acts as the full automorphism group of the surface. For this, we deal separately with orientable and non-orientable surfaces, and we also determine the topological type of the surfaces attaining the bounds.