Boundary classification and 2-ended splittings of groups with isolated flats

Abstract

In this paper we provide a classification theorem for 1-dimensional boundaries of groups with isolated flats. Given a group acting geometrically on a CAT(0) space X with isolated flats and 1-dimensional boundary, we show that if does not split over a virtually cyclic subgroup, then ∂ X is homeomorphic to a circle, a Sierpinski carpet, or a Menger curve. This theorem generalizes a theorem of Kapovich-Kleiner, and resolves a question due to Kim Ruane. We also study the relationship between local cut points in ∂ X and splittings of over 2-ended subgroups. In particular, we generalize a theorem of Bowditch by showing that the existence of a local point in ∂ X implies that splits over a 2-ended subgroup.