Metacyclic actions on surfaces

Abstract

Let Mod(Sg) be the mapping class group of the closed orientable surface Sg of genus g≥ 2. In this paper, we derive necessary and sufficient conditions under which two torsion elements in Mod(Sg) will have conjugates that generate a finite metacyclic subgroup of Mod(Sg). This yields a complete solution to the problem of liftability of periodic mapping classes under finite cyclic covers. As applications of the main result, we show that 4g is a realizable upper bound on the order of a non-split metacyclic action on Sg and this bound is realized by the action of a dicyclic group. Moreover, we give a complete characterization of the dicyclic subgroups of Mod(Sg) up to a certain equivalence that we will call weak conjugacy. Furthermore, we show that every periodic mapping class in a non-split metacyclic subgroup of Mod(Sg) is reducible. We provide necessary and sufficient conditions under which a non-split metacyclic action on Sg factors via a split metacyclic action. Finally, we provide a complete classification of the weak conjugacy classes of the finite non-split metacyclic subgroups of Mod(S10) and Mod(S11).