Isomorphisms of Symplectic Torus Quotients

Abstract

We call a reductive complex group G quasi-toral if G0 is a torus. Let G be quasi-toral and let V be a faithful 1-modular G-module. Let N (the shell) be the zero fiber of the canonical moment mapping μ V V*g*. Then N is a complete intersection variety with rational singularities. Let M denote the categorical quotient N/\!\!/ G. We show that M determines V V* and G, up to isomorphism, if codimN Nsing≥ 4. If codimNNsing=3, the lowest possible, then there is a process to produce an algebraic (hence quasi-toral) subgroup G'⊂ G and a faithful 1-modular G'-submodule V'⊂ V with shell N' such that codimN'(N')sing≥ 4. Moreover, there is a G'-equivariant morphism N' N inducing an isomorphism N'/\!\!/ G' N/\!\!/ G. Thus, up to isomorphism, M determines V' (V')* and G', hence also N'. We establish similar results for real shells and real symplectic quotients associated to unitary modules for compact Lie groups.