The geometry of purely loxodromic subgroups of right-angled Artin groups

Abstract

We prove that finitely generated purely loxodromic subgroups of a right-angled Artin group A() fulfill equivalent conditions that parallel characterizations of convex cocompactness in mapping class groups Mod(S). In particular, such subgroups are quasiconvex in A(). In addition, we identify a milder condition for a finitely generated subgroup of A() that guarantees it is free, undistorted, and retains finite generation when intersected with A() for subgraphs of . These results have applications to both the study of convex cocompactness in Mod(S) and the way in which certain groups can embed in right-angled Artin groups.