Property (T) in random quotients of hyperbolic groups at densities above 1/3

Abstract

We study random quotients of a fixed non-elementary hyperbolic group in the Gromov density model. Let G= S\;\; T be a finite presentation of a non-elementary hyperbolic group, and let Annl,ω (G) be the set of elements of norm between l-ω(l) and l in G. A random quotient at density d and length ω-near l is defined by killing a uniformly randomly chosen set of Sl(G) d words in Annl,ω (l)(G), where ω (l) =ol(l). We prove that for any d>1/3, such a quotient has Property (T) with probability tending to 1 as l tends to infinity. This result answers a question of Gromov--Ollivier and strengthens a theorem of \.Zuk (c.f Kotowski--Kotowski).