Reduction principles for proper actions
Abstract
Let be a Lie group acting properly on a smooth manifold . If is connected, then we exhibit some simple and basic constructions for proper actions. In particular, we prove that the reduction principle in compact transformation groups holds for proper actions. As an application, we prove that a reduction principle holds for polar actions and for the integral invariant for isometric actions of Lie groups, called copolarity, which measures how far from being polar the action is. We also investigate symplectic actions. Hence we assume that is a symplectic manifold and the action on preserves . %If is Abelian, we generalize results proved in \cite{Ben,DP1,DP2} The main result is the Equivalence Theorem for coisotropic actions, generalizing \cite[Theorem 3 p.267]{HW}. Finally, we completely characterize asystatic actions generalizing results proved in \cite{pg}.
Cite
@article{arxiv.2212.06715,
title = {Reduction principles for proper actions},
author = {Leonardo Biliotti},
journal= {arXiv preprint arXiv:2212.06715},
year = {2025}
}
Comments
After further review, I have identified several inaccuracies in the article. In particular, the proof of the main theorem requires substantial revisions due to certain flaws. I am currently working on this topic together with two of my PhD students, and the research has developed into a new project with novel results