The geometry of subgroup embeddings and asymptotic cones

Abstract

Given a finitely generated subgroup H of a finitely generated group G and a non-principal ultrafilter ω, we consider a natural subspace, ConeωG(H), of the asymptotic cone of G corresponding to H. Informally, this subspace consists of the points of the asymptotic cone of G represented by elements of the ultrapower Hω. We show that the connectedness and convexity of ConeωG(H) detect natural properties of the embedding of H in G. We begin by defining a generalization of the distortion function and show that this function determines whether ConeωG(H) is connected. We then show that whether H is strongly quasi-convex in G is detected by a natural convexity property of ConeωG(H) in the asymptotic cone of G.