Symplectic aspects of polar actions

Abstract

An isometric compact group action G × (M,g) → (M,g) is called polar if there exists a closed embedded submanifold ⊂eq M which meets all orbits orthogonally. Let be the associated generalized Weyl group. We study the properties of the lifting action G on the cotangent bundle T*M. In particular, we show that the restriction map (C∞(T*M))G → (C∞(T* )) is a surjective homomorphism of Poisson algebras. As a corollary, the singular symplectic reductions T*M // G and T* // are isomorphic as stratified symplectic spaces, which gives a partial answer to a conjecture of Lerman, Montgomery and Sjamaar.