A general collapsing result for families of stratified Riemannian metrics on orbifolds

Abstract

This paper proves a general collapsing result for families of stratified Riemannian metrics gμ on a compact orbifold E, subject to suitable limiting conditions on the metrics gμ as μ ∞. The result is distinct from similar theorems in the literature since it does not require bounds on curvature or injectivity radius of (E,gμ) and thus allows for Gromov-Hausdorff limits of (E,gμ) which have strictly lower dimension than E. The paper also introduces and studies a new class of stratified fibrations between orbifolds, termed weak submersions, and new classes of geometric structures on orbifolds, termed stratified Riemannian metrics, stratified Riemannian semi-metrics and stratified quasi-Finslerian structures, all of which play a key role in the proof of the main theorem.