Suppose $M$ is a smooth manifold and a compact Lie group $G$ acts freely on $M$, then it is well known that $M/G$ has a manifold structure.
Are there any results for the general case? (a) If the action is not free, what can we say about the local structure of the quotient? Can we define a stratification on the space? How regular are the strata? (b) Moreover, what can we say if $M$ and $G$ are Hilbert manifolds?
Thanks a lot!
Suppose one relaxes the condition that the action is free, replacing it with the condition that every point in $M$ has a finite $G$-stabilizer. In this case, the topological quotient $M/G$ carries a natural orbifold structure. The local model is therefore the quotient of $\mathbb{R}^n$ by a finite group acting linearly.
In general, $M/G$ is a stratified space, and the stratification is indexed by conjugacy classes of $G$-stabilizers.
If you know German, then I strongly recommend you the Habilitation thesis of Markus Pflaum: "Ein Beitrag zur Geometrie und Analysis auf stratifizierten Räumen" for the stratification of the orbit space. If I remember correctly, then Ortega & Ratiu "Momentum Maps and Hamiltonian Reduction" also contains some general results about the orbit space although the main focus of this book lies on symplectic reduction.
