On Diffeology of Orbit Spaces

Abstract

We investigate the correspondence between the geometry of a smooth compact Lie group action on a manifold M and the intrinsic smooth structure of the orbit space M/G. While the action on M is classically organized by the orbit-type stratification, we show this structure fails to predict the intrinsic Klein\ stratif\!ication of the quotient, which partitions the space into the orbits of local diffeomorphisms, thereby classifying the space by its intrinsic singularity types. The correct correspondence, we prove, is governed by a finer partition on M: the isostabilizer\ decomposition. We establish a surjective map from the components of this partition to the Klein strata of M/G. As a corollary, we obtain by pullback a new canonical stratification on M, the Inverse\ Klein\ Stratif\!ication, and clarify its relationship with classical structures.