Stability for product groups and property (τ)

Abstract

We study the notion of permutation stability (or P-stability) for countable groups. Our main result provides a wide class of non-amenable product groups which are not P-stable. This class includes the product group ×, whenever admits a non-abelian free quotient and admits an infinite cyclic quotient. In particular, we obtain that the groups Fm× Zd and Fm× Fn are not P-stable, for any integers m,n≥ 2 and d≥ 1. This implies that P-stability is not closed under the direct product construction, which answers a question of Becker, Lubotzky and Thom. The proof of our main result relies on a construction of asymptotic homomorphisms from × to finite symmetric groups starting from sequences of finite index subgroups in and with and without property (τ). Our method is sufficiently robust to show that the groups covered are not even flexibly P-stable, thus giving the first such non-amenable residually finite examples.