Proper maps, bordism, and geometric quantization

Abstract

Let G be a compact connected Lie group acting on a stable complex manifold M with equivariant vector bundle E. Besides, suppose φ is an equivariant map from M to the Lie algebra g. We can define some equivalence relation on the triples (M, E, φ) such that the set of equivalence classes form an abelian group. In this paper, we will show that this group is isomorphic to a completion of character ring R(G). In this framework, we provide a geometric proof to the "Quantization Commutes with Reduction" conjecture in the non-compact setting.