English

Group stability and Property (T)

Group Theory 2019-02-25 v2

Abstract

In recent years, there has been a considerable amount of interest in the stability of a finitely-generated group Γ\Gamma with respect to a sequence of groups {Gn}n=1\left\{G_{n}\right\}_{n=1}^{\infty}, equipped with bi-invariant metrics {dn}n=1\left\{d_{n}\right\}_{n=1}^{\infty}. We consider the case Gn=U(n)G_{n}=\operatorname{U}\left(n\right) (resp. Gn=Sym(n)G_{n}=\operatorname{Sym}\left(n\right)), equipped with the normalized Hilbert-Schmidt metric dnHSd_{n}^{\operatorname{HS}} (resp. the normalized Hamming metric dnHammingd_{n}^{\operatorname{Hamming}}). Our main result is that if Γ\Gamma is infinite, hyperlinear (resp. sofic) and has Property (T)\operatorname{(T)}, then it is not stable with respect to (U(n),dnHS)\left(\operatorname{U}\left(n\right),d_{n}^{\operatorname{HS}}\right) (resp. (Sym(n),dnHamming)\left(\operatorname{Sym}\left(n\right),d_{n}^{\operatorname{Hamming}}\right)). This answers a question of Hadwin and Shulman regarding the stability of SL3(Z)\operatorname{SL}_{3}\left(\mathbb{Z}\right). We also deduce that the mapping class group MCG(g)\operatorname{MCG}\left(g\right), g3g\geq 3, and Aut(Fn)\operatorname{Aut}\left(\mathbb{F}_n\right), n3n\geq 3, are not stable with respect to (Sym(n),dnHamming)\left(\operatorname{Sym}\left(n\right),d_{n}^{\operatorname{Hamming}}\right). Our main result exhibits a difference between stability with respect to the normalized Hilbert-Schmidt metric on U(n)\operatorname{U}\left(n\right) and the (unnormalized) pp-Schatten metrics, since many groups with Property (T)\operatorname{(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)\left(\operatorname{U}\left(n\right),d_{n}^{\operatorname{HS}}\right) and (Sym(n),dnHamming)\left(\operatorname{Sym}\left(n\right),d_{n}^{\operatorname{Hamming}}\right).

Keywords

Cite

@article{arxiv.1809.00632,
  title  = {Group stability and Property (T)},
  author = {Oren Becker and Alexander Lubotzky},
  journal= {arXiv preprint arXiv:1809.00632},
  year   = {2019}
}

Comments

20 pages; v2 includes new results in Section 3 and an appendix

R2 v1 2026-06-23T03:52:53.046Z