A vanishing theorem for the homology of discrete subgroups of Sp(n,1) and F4-20
Abstract
For any discrete, torsion-free subgroup of Sp(n,1) (resp.\ F4-20) with no parabolic elements, we prove that H4n-1(;V)=0 (resp.\ Hi(;V)=0 for i=13,14,15) for any --module V. The main technical advance is a new bound on the p--Jacobian of the barycenter map of Besson--Courtois--Gallot. We also apply this estimate to obtain an inequality between the critical exponent and homological dimension of , improving on work of M.~Kapovich.
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