Three-orbifolds with positive scalar curvature

Abstract

We prove the following result: Let (O,g0) be a complete, connected 3-orbifold with uniformly positive scalar curvature, with bounded geometry, and containing no bad 2-suborbifolds. Then there is a finite collection F of spherical 3-orbifolds, such that O is diffeomorphic to a (possibly infinite) orbifold connected sum of copies of members in F. This extends work of Perelman and Bessieres-Besson-Maillot. The proof uses Ricci flow with surgery on complete 3-orbifolds, and are along the lines of the author's previous work on 4-orbifolds with positive isotropic curvature.