The congruence subgroup property for the hyperelliptic modular group: the open surface case

Abstract

Let Mg,n and Hg,n, for 2g-2+n>0, be, respectively, the moduli stack of n-pointed, genus g smooth curves and its closed substack consisting of hyperelliptic curves. Their topological fundamental groups can be identified, respectively, with g,n and Hg,n, the so called Teichm\"uller modular group and hyperelliptic modular group. A choice of base point on Hg,n defines a monomorphism Hg,ng,n. Let Sg,n be a compact Riemann surface of genus g with n points removed. The Teichm\"uller group g,n is the group of isotopy classes of diffeomorphisms of the surface Sg,n which preserve the orientation and a given order of the punctures. As a subgroup of g,n, the hyperelliptic modular group then admits a natural faithful representation Hg,nOut(π1(Sg,n)). The congruence subgroup problem for Hg,n asks whether, for any given finite index subgroup Hλ of Hg,n, there exists a finite index characteristic subgroup K of π1(Sg,n) such that the kernel of the induced representation Hg,nOut(π1(Sg,n)/K) is contained in Hλ. The main result of the paper is an affirmative answer to this question for n≥ 1.