Poisson Centralisers and Polynomial Superintegrability for Magnetic Geodesic Flows on Reductive Homogeneous Spaces

Abstract

We provide a method for formulating superintegrable magnetic geodesic flows on reductive homogeneous spaces M=G/A, with G a compact semisimple Lie group and A a closed subgroup of G. In the twisted cotangent bundle (T*M,ω), with ω=ωcan+\,π*ωKKS being the canonical plus Kirillov-Kostant-Souriau (KKS) forms, we build two canonical and commuting families of polynomial first integrals: one pulled back from the Lie algebra g of G via the magnetic moment map P, and one pulled back from a Ad(A)-invariant affine slice of m TeAM, where eA is the identity of G/A. Their common image generates a reduced Poisson algebra obtained from a fiber tensor product, and the natural multiplication map into a Poisson subalgebra of polynomial functions O(T*M) ⊂ C∞(T*M) is Poisson and injective. The center of this fiber tensor product is contained in the Poisson center of the symmetric algebra of g. In a dense regular locus, the resulting projection chain realises a superintegrable system. As examples, two SU(3) cases are studied (regular torus and irregular S(U(2)× U(1)) quotients), which illustrate the construction and produce explicit action-angle coordinates.