Non-vanishing unitary cohomology of low-rank integral special linear groups
Abstract
We construct explicit finite-dimensional orthogonal representations πN of SLN(Z) for N ∈ \3,4\ all of whose invariant vectors are trivial, and such that HN - 1(SLN(Z),πN) is non-trivial. This implies that for N as above, the group SLN(Z) does not have property (TN-1) of Bader-Sauer and therefore is not (N-1)-Kazhdan in the sense of De Chiffre-Glebsky-Lubotzky-Thom, both being higher versions of Kazhdan's property T.
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