On the top dimensional cohomology groups of congruence subgroups of SLn(Z)

Abstract

Let n(p) be the level-p principal congruence subgroup of SLn(Z). Borel-Serre proved that the cohomology of n(p) vanishes above degree n2. We study the cohomology in this top degree n2. Let Tn(Q) denote the Tits building of SLn(Q). Lee-Szczarba conjectured that Hn2(n(p)) is isomorphic to Hn-2(Tn(Q)/n(p)) and proved that this holds for p=3. We partially prove and partially disprove this conjecture by showing that a natural map Hn2(n(p)) → Hn-2(Tn(Q)/n(p)) is always surjective, but is only injective for p ≤ 5. In particular, we completely calculate Hn2(n(5)) and improve known lower bounds for the ranks of Hn2(n(p)) for p ≥ 5.