The Koszul complex of a moment map

Abstract

Let K U(V) be a unitary representation of the compact Lie group K. Then there is a canonical moment mapping V k*. We have the Koszul complex K(, C∞(V)) of the component functions 1,...,k of . Let G=K C, the complexification of K. We show that the Koszul complex is a resolution of the smooth functions on -1(0) if and only if G(V) is 1-large, a concept introduced in earlier work of the second author. Now let M be a symplectic manifold with a Hamiltonian action of K. Let be a moment mapping and consider the Koszul complex given by the component functions of . We show that the Koszul complex is a resolution of the smooth functions on Z=-1(0) if and only if the complexification of each symplectic slice representation at a point of Z is 1-large.