Liftability of periodic mapping classes under alternating covers

Abstract

Let Sg be the closed orientable surface of genus g ≥ 2, and let Mod(Sg) be the mapping class group of Sg. Let An denote the alternating group on n letters. We derive necessary and sufficient conditions under which a periodic mapping class has a conjugate that lifts under the branched cover Sg Sg/An induced by an action of An on Sg. This provides a classification of the subgroups of Mod(Sg) that are isomorphic to An Zm, up to a certain equivalence that we call weak conjugacy. As an application, we show that for n ≥ 7, such a subgroup of Mod(Sg) cannot have an irreducible periodic mapping class. Furthermore, we show that for n ≥ 5 and n ≠ 6, if the order of such a subgroup is greater than 5g-5, then m ≤ 26. Moreover, for g ≥ 2 and n ≥ 5, we establish that there exists no subgroup of Mod(Sg) that is isomorphic to An Z, where the Z-component is generated by a power of a Dehn twist. Finally, we provide a complete classification of the weak conjugacy classes of such subgroups in Mod(S10) and Mod(S11).