Group stability and Property (T)

Abstract

In recent years, there has been a considerable amount of interest in the stability of a finitely-generated group with respect to a sequence of groups \Gn\n=1∞, equipped with bi-invariant metrics \dn\n=1∞. We consider the case Gn=U(n) (resp. Gn=Sym(n)), equipped with the normalized Hilbert-Schmidt metric dnHS (resp. the normalized Hamming metric dnHamming). Our main result is that if is infinite, hyperlinear (resp. sofic) and has Property (T), then it is not stable with respect to (U(n),dnHS) (resp. (Sym(n),dnHamming)). This answers a question of Hadwin and Shulman regarding the stability of SL3(Z). We also deduce that the mapping class group MCG(g), g≥ 3, and Aut(Fn), n≥ 3, are not stable with respect to (Sym(n),dnHamming). Our main result exhibits a difference between stability with respect to the normalized Hilbert-Schmidt metric on U(n) and the (unnormalized) p-Schatten metrics, since many groups with Property (T) are stable with respect to the latter metrics, as shown by De Chiffre-Glebsky-Lubotzky-Thom and Lubotzky-Oppenheim. We suggest a more flexible notion of stability that may repair this deficiency of stability with respect to (U(n),dnHS) and (Sym(n),dnHamming).