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Computing equivalence classes of finite group actions on orientable surfaces: A dynamic survey

Ján Karabáš, Roman Nedela, Mária Skyvová

Abstract

This paper focuses on the classification of classes of topological equivalence of finite group actions on Riemann surfaces. By the Riemann-Hurwitz bound, there are just finitely many groups that act conformally on a closed orientable surface $\mathcal{S}_g$ of genus $g\geq 2$. With each such action of a group $\mathrm{G}$ on $\mathcal{S}_g$ one can associate the fundamental group $Γ=π(\mathcal{O})$ of the quotient orbifold $\mathcal{O}=\mathcal{S}_g/\mathrm{G}$, isomorphic to a Fuchsian group determined completely by orbifold's signature. The Riemann existence theorem reduces the problem of the existence of an action of $\mathrm{G}$ on $\mathcal{S}_g$ to a purely group-theoretical problem of deciding whether there is an smooth epimorphism mapping the Fuchsian group $Γ$ onto the group $\mathrm{G}$. Using computer algebra systems such as \textsc{Magma} or GAP, together with the library of small groups, the generation of all finite group actions on a surface of fixed small genus $g\geq 2$ becomes almost a routine procedure. The difficult part is to determine the classes of these actions with respect to topological equivalence. To achieve this, one needs to investigate the action of the automorphism group of a Fuchsian group on the set of finite group actions on $\mathcal{S}_g$ with the corresponding signature. In this paper we derive several results on the topological equivalence of finite group actions on Riemann surfaces. As an application, we derive complete lists of finite group actions of genus $g\leq 9$ distinguished up to the topological equivalence. A summary of the actions can be found in Appendix, the reader interested in more details is referred to the web page [22]. It is expected that we will be able to extend the list to higher genera, refreshed partial results are available on the web page. The following text is an extended version of the paper [23].

Computing equivalence classes of finite group actions on orientable surfaces: A dynamic survey

Abstract

This paper focuses on the classification of classes of topological equivalence of finite group actions on Riemann surfaces. By the Riemann-Hurwitz bound, there are just finitely many groups that act conformally on a closed orientable surface of genus . With each such action of a group on one can associate the fundamental group of the quotient orbifold , isomorphic to a Fuchsian group determined completely by orbifold's signature. The Riemann existence theorem reduces the problem of the existence of an action of on to a purely group-theoretical problem of deciding whether there is an smooth epimorphism mapping the Fuchsian group onto the group . Using computer algebra systems such as \textsc{Magma} or GAP, together with the library of small groups, the generation of all finite group actions on a surface of fixed small genus becomes almost a routine procedure. The difficult part is to determine the classes of these actions with respect to topological equivalence. To achieve this, one needs to investigate the action of the automorphism group of a Fuchsian group on the set of finite group actions on with the corresponding signature. In this paper we derive several results on the topological equivalence of finite group actions on Riemann surfaces. As an application, we derive complete lists of finite group actions of genus distinguished up to the topological equivalence. A summary of the actions can be found in Appendix, the reader interested in more details is referred to the web page [22]. It is expected that we will be able to extend the list to higher genera, refreshed partial results are available on the web page. The following text is an extended version of the paper [23].
Paper Structure (19 sections, 17 theorems, 23 equations, 1 table)

This paper contains 19 sections, 17 theorems, 23 equations, 1 table.

Key Result

Theorem 2.1

Group $\mathrm{G}\xspace$ acts on a surface $\mathcal{S}\xspace_g$ of genus $g$ with branch data $(\gamma;m_1,\dots,m_r)$ if and only if there is an smooth epimorphism $\mathrm{F}\xspace(\gamma;m_1,\dots,m_r)\to \mathrm{G}\xspace$.

Theorems & Definitions (28)

  • Theorem 2.1: Riemann existence theorem broughton1991classifyingharvey1966cyclic
  • Theorem 2.2: Lloyd
  • Corollary 2.3: broughton2022equivalence
  • Lemma 2.4
  • proof
  • Lemma 2.5
  • proof
  • Theorem 3.1: chow2002algebraical
  • Theorem 3.2: zieschang1966automorphismen
  • Lemma 3.3: tap88
  • ...and 18 more