Equivariant blowups of bounded parabolic points

Abstract

Let G be a group acting by homeomorphisms on a Hausdorff compact space Z. We constructed a new space X that blows up equivariantly the bounded parabolic points of Z. This means, roughly speaking, that G acts by homeomorphisms on X and there exists a continuous equivariant map π: X → Z such that for every non bounded parabolic point z ∈ Z, \#π-1(z) = 1. We use such construction to characterize topologically some spaces that G acts with the convergence property and to construct new convergence actions of G from old ones. As one of the applications, if G is a group and p is a bounded parabolic point of the space of ends of G, then the stabilizer of p is one-ended.