A unitary "quantization commutes with reduction" map for the adjoint action of a compact Lie group

Abstract

Let K be a simply connected compact Lie group and T(K) its cotangent bundle. We consider the problem of "quantization commutes with reduction" for the adjoint action of K on T(K). We quantize both T(K) and the reduced phase space using geometric quantization with half-forms. We then construct a geometrically natural map from the space of invariant elements in the quantization of T(K) to the quantization of the reduced phase space. We show that this map is a constant multiple of a unitary map.