Croke-Kleiner admissible groups: Property (QT) and quasiconvexity

Abstract

Croke-Kleiner admissible groups firstly introduced by Croke-Kleiner belong to a particular class of graph of groups which generalize fundamental groups of 3--dimensional graph manifolds. In this paper, we show that if G is a Croke-Kleiner admissible group, acting geometrically on a CAT(0) space X, then a finitely generated subgroup of G has finite height if and only if it is strongly quasi-convex. We also show that if G X is a flip CKA action then G is quasi-isometric embedded into a finite product of quasi-trees. With further assumption on the vertex groups of the flip CKA action G X, we show that G satisfies property (QT) that is introduced by Bestvina-Bromberg-Fujiwara.