High-degree cohomology of congruence subgroups of SLn(O) via cohomology of S-arithmetic groups

Abstract

If p is a prime ideal of a number ring O, then the top-degree cohomology of the principal congruence subgroup of level p is naturally a representation of SLn(O/p). We prove that the multiplicity of the Steinberg representation in this cohomology space is one. When O is Euclidean and p is suitably small -- for example a universal side divisor -- then we prove that the multiplicity of the Steinberg representation in the next-highest-degree cohomology space is zero. Our proof relies on a computation of the cohomology of an S-arithmetic group ouside of a linear range of degrees, derived from work of Blasius--Franke--Grunewald.

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