Abelian instances of nonabelian symplectic reduction

Abstract

Let G be a Lie group with a normal abelian subgroup A, and let (M,ω) be a symplectic manifold endowed with a Hamiltonian G-action. We investigate conditions under which symplectic reduction by G coincides with the symplectic reduction by the abelian subgroup A. Using the reduction-by-stages framework (Marsden et al Springer Notes in Math., 1913, (2007)), we prove that, under a mild assumption, the corresponding reduced spaces are symplectomorphic if and only if they have the same dimension. Both this assumption and the dimension condition depend only on the groups G and A, and on the momentum value μ∈ g* at which the symplectic reduction by G is performed; in particular, they are independent of the symplectic manifold (M,ω). We then provide a broad class of examples by identifying a large family of nilpotent Lie groups, including classical Carnot groups such as the Heisenberg group and jet-space Jk(Rn,Rm), for which the two reduced spaces are symplectomorphic for generic momentum values.