Symplectic reduction at zero angular momentum

Abstract

We study the symplectic reduction of the phase space describing k particles in Rn with total angular momentum zero. This corresponds to the singular symplectic quotient associated to the diagonal action of On on k copies of Cn at the zero value of the homogeneous quadratic moment map. We give a description of the ideal of relations of the ring of regular functions of the symplectic quotient. Using this description, we demonstrate Z+-graded regular symplectomorphisms among the On- and SOn-symplectic quotients and determine which of these quotients are graded regularly symplectomorphic to linear symplectic orbifolds. We demonstrate that when n ≤ k, the zero fibre of the moment map has rational singularities and hence is normal and Cohen-Macaulay. We also demonstrate that for small values of k, the ring of regular functions on the symplectic quotient is graded Gorenstein.