The Stable Homology of Congruence Subgroups

Abstract

In a previous paper, the author (together with Matthew Emerton) proved that the completed cohomology groups of SLN(Z) are stable in fixed degree as N goes to infinity (Z may be replaced by the ring OF of integers of any number field). In this paper, we relate these completed cohomology groups to K-theory and Galois cohomology. Various consequences include showing that Borel's stable classes become infinitely p-divisible up the p-congruence tower if and only if a certain p-adic zeta value is non-zero. We use our results to compute H2(GammaN(p),Fp) (for sufficiently large N) where GammaN(p) is the full level-p congruence subgroup of SLN(Z).