A presentation of symplectic Steinberg modules and cohomology of Sp2n(Z)

Abstract

Borel-Serre proved that the integral symplectic group Sp2n(Z) is a virtual duality group of dimension n2 and that the symplectic Steinberg module Stωn(Q) is its dualising module. This module is the top-dimensional homology of the Tits building associated to Sp2n(Q). We find a presentation of this Steinberg module and use it to show that the codimension-1 rational cohomology of Sp2n(Z) vanishes for n ≥ 2, Hn2 -1(Sp2n(Z);Q) 0. Equivalently, the rational cohomology of the moduli stack An of principally polarised abelian varieties of dimension 2n vanishes in the same degree. Our findings suggest a vanishing pattern for high-dimensional cohomology in degree n2-i, similar to the one conjectured by Church-Farb-Putman for special linear groups.