An approximation principle for congruence subgroups

Abstract

The motivating question of this paper is roughly the following: given a group scheme G over Zp, p prime, with semisimple generic fiber GQp, how far are open subgroups of G(Zp) from subgroups of the form X(Zp)Kp(pn), where X is a subgroup scheme of G and Kp(pn) is the principal congruence subgroup Ker (G(Zp)→ G(Z/pnZ))? More precisely, we will show that for GQp simply connected there exist constants J1 and >0, depending only on G, such that any open subgroup of G (Zp) of level pn admits an open subgroup of index J which is contained in X(Zp)Kp(p n) for some proper connected algebraic subgroup X of G defined over Qp. Moreover, if G is defined over Z, then and J can be taken independently of p. We also give a correspondence between natural classes of Zp-Lie subalgebras of gZp and of closed subgroups of G(Zp) that can be regarded as a variant over Zp of Nori's results on the structure of finite subgroups of GL(N0,Fp) for large p. As an application we give a bound for the volume of the intersection of a conjugacy class in the group G (Z) = Πp G (Zp), for G defined over Z, with an arbitrary open subgroup. In a future paper, this result will be applied to the limit multiplicity problem for arbitrary congruence subgroups of the arithmetic lattice G (Z).