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 , equipped with bi-invariant metrics . We consider the case (resp. ), equipped with the normalized Hilbert-Schmidt metric (resp. the normalized Hamming metric ). Our main result is that if is infinite, hyperlinear (resp. sofic) and has Property , then it is not stable with respect to (resp. ). This answers a question of Hadwin and Shulman regarding the stability of . We also deduce that the mapping class group , , and , , are not stable with respect to . Our main result exhibits a difference between stability with respect to the normalized Hilbert-Schmidt metric on and the (unnormalized) -Schatten metrics, since many groups with Property 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 and .
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