The geometry of groups containing almost normal subgroups

Abstract

A subgroup H≤ G is said to be almost normal if every conjugate of H is commensurable to H. If H is almost normal, there is a well-defined quotient space G/H. We show that if a group G has type Fn+1 and contains an almost normal coarse PDn subgroup H with e(G/H)=∞, then whenever G' is quasi-isometric to G, it contains an almost normal subgroup H' that is quasi-isometric to H. Moreover, the quotient spaces G/H and G'/H' are quasi-isometric. This generalises a theorem of Mosher-Sageev-Whyte, who prove the case in which G/H is quasi-isometric to a finite valence bushy tree. Using work of Mosher, we generalise a result of Farb-Mosher to show that for many surface group extensions L, any group quasi-isometric to L is virtually isomorphic to L. We also prove quasi-isometric rigidity for the class of finitely presented Z-by-(∞ ended) groups.