Local cut points and splittings of relatively hyperbolic groups

Abstract

In this paper we show that the existence of a non-parabolic local cut point in the Bowditch boundary ∂(G,P) of a relatively hyperbolic group (G,P) implies that G splits over a 2-ended subgroup. This theorem generalizes a theorem of Bowditch from the setting of hyperbolic groups to relatively hyperbolic groups. As a consequence we are able to generalize a theorem of Kapovich and Kleiner by classifying the homeomorphism type of 1-dimensional Bowditch boundaries of relatively hyperbolic groups which satisfy certain properties, such as no splittings over 2-ended subgroups and no peripheral splittings. In order to prove the boundary classification result we require a notion of ends of a group which is more general than the standard notion. We show that if a finitely generated discrete group acts properly and cocompactly on two generalized Peano continua X and Y, then Ends(X) is homeomorphic to Ends(Y). Thus we propose an alternate definition of Ends(G) which increases the class of spaces on which G can act.