Decompositions of three-dimensional Alexandrov spaces

Abstract

We extend basic results in 3-manifold topology to general three-dimensional Alexandrov spaces (or Alexandrov 3-spaces for short), providing a unified framework for manifold and non-manifold spaces. We generalize the connected sum to non-manifold 3-spaces and prove a prime decomposition theorem, exhibit an infinite family of closed, prime non-manifold 3-spaces which are not irreducible, and establish a conjecture of Mitsuishi and Yamaguchi on the structure of closed, simply-connected Alexandrov 3-spaces with non-negative curvature. Additionally, we define a notion of generalized Dehn surgery for Alexandrov 3-spaces and show that any closed Alexandrov 3-space may be obtained by performing generalized Dehn surgery on a link in S3 or the non-trivial S2-bundle over S1. As an application of this result, we show that every closed Alexandrov 3-space is homeomorphic to the boundary of a 4-dimensional Alexandrov space.