Schur--Weyl Theory for C*-algebras

Abstract

To each irreducible infinite dimensional representation (π,) of a C*-algebra , we associate a collection of irreducible norm-continuous unitary representations πλ of its unitary group (), whose equivalence classes are parameterized by highest weights in the same way as the irreducible bounded unitary representations of the group ∞() = () (\1 + K()) are. These are precisely the representations arising in the decomposition of the tensor products n (*) m under (). We show that these representations can be realized by sections of holomorphic line bundles over homogeneous K\"ahler manifolds on which () acts transitively and that the corresponding norm-closed momentum sets Iπλ^ n ()' distinguish inequivalent representations of this type.