Zkm-actions of signature (0;k,n+1…,k)

Abstract

An action of a finite group G is a pair (S,G), where S is a compact Riemann surface of genus g ≥slant 2 and G ≤slant Aut(S) is isomorphic to G. To each action (S,G) there is associated a signature (γ;k1,…,kr) that codifies the orbifold structure of S/G. Two actions of G, say (S1,G1) and (S2,G2), are topologically equivalent if there is an orientation-preserving homeomorphism :S1 S2 such that G1 -1=G2. Topologically equivalent actions necessarily must have the same signature. The problem of determining the number of different topological actions of G for a given signature is in general a difficult task. In this article, we describe, up to topological equivalence, those actions when G is an abelian group and quotient genus γ=0. We are particularly interested in the case G= Zkm and the quotient signature of the action to be of the form (0;k,n+1…,k).

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