Liftable mapping class groups of regular cyclic covers

Abstract

Let Mod(Sg) be the mapping class group of the closed orientable surface of genus g ≥ 1. For k ≥ 2, we consider the standard k-sheeted regular cover pk: Sk(g-1)+1 Sg, and analyze the liftable mapping class group LModpk(Sg) associated with the cover pk. In particular, we show that LModpk(Sg) is the stabilizer subgroup of Mod(Sg) with respect to a collection of vectors in H1(Sg,Zk), and also derive a symplectic criterion for the liftability of a given mapping class under pk. As an application of this criterion, we obtain a normal series of LModpk(Sg), which generalizes a well known normal series of congruence subgroups in SL(2,Z). Among other applications, we describe a procedure for obtaining a finite generating set for LModpk(Sg) and examine the liftability of certain finite-order and pseudo-Anosov mapping classes.