Equivalence of cyclic p-squared actions on handlebodies

Abstract

In this paper we consider all orientation-preserving Zp2-actions on 3-dimensional handlebodies Vg of genus g>0 for p an odd prime. To do so, we examine particular graphs of groups ((v),G(v)) in canonical form for some 5-tuple v =(r,s,t,m,n) with r+s+t+m>0. These graphs of groups correspond to the handlebody orbifolds V((v),G(v)) that are homeomorphic to the quotient spaces Vg/Zp2 of genus less than or equal to g. This algebraic characterization is used to enumerate the total number of Zp2-actions on such handlebodies, up to equivalence.