Kirillov theory for C*(G,)

Abstract

Let G be a simply connected nilpotent Lie group with Lie algebra g; let g* be the dual of g. Let be a locally compact second countable Hausdorff space with a continuous G action, and let C*(G,) be the corresponding transformation group C* algebra. We construct a continuous surjective map φ from a quotient space, g*×/, which is a homeomorphism from g*×/ to Prim(C*(G,)). We also describe a character theory for C*(G,) which generalizes Kirillov character theory for G.