Strong subgroup recurrence and the Nevo-Stuck-Zimmer theorem

Abstract

Let be a countable group and Sub() its Chabauty space, namely the compact -space consisting of all subgroups of . We call a subgroup ∈ Sub() a boomerang subgroup if for every γ ∈ , γni γ-ni → for some subsequence \ni \ ⊂ N. Poincar\'e recurrence implies that μ-almost every subgroup of is a boomerang, with respect to every invariant random subgroup μ of . We establish for boomerang subgroups many density related properties, most of which are known to hold almost surely for invariant random subgroups. Let K be a number field, O its ring of integers, S a finite set of valuations including all the Archimedean valuations, and G an absolutely almost simple group defined over K. Our main result is that if rkK G 2 then any which is commensurable to the S-arithmetic group G(OS) has very few boomerang subgroups. Namely, every boomerang in is either finite and central or of finite index. In particular we recover Margulis' normal subgroup theorem as well as the Nevo-Stuck-Zimmer theorem for such lattices. We include a short, accessible proof for the above theorem in the case that is commensurable to SLn(Z), \ n 3.