Hyperlinearity, stability and asymptotic spectral gap of higher rank lattices

Abstract

We prove that if the group SL2( Z[1/p]) is flexibly Hilbert--Schmidt stable for some prime p, then it admits a non-hyperlinear finite central extension. Consequently, a positive answer to the following question would yield an explicit example of a non-hyperlinear group: If two representations of the modular group SL2(Z) almost agree on an Iwahori subgroup B, must they be close to representations that agree on B? More generally, we investigate spectral gap properties for asymptotic representations of higher rank lattices and groups with property (T:FD). In this setting, we prove that character rigidity is equivalent to a weak form of stability.