Functional calculus of quantum channels for the holomorphic discrete series of SU(1,1)

Abstract

The tensor product of two holomorphic discrete series representations of SU(1,1) can be decomposed as a direct sum of infinitely many discrete series. I shall introduce equivariant quantum channels for each component of the direct sum, mapping bounded operators on one factor of the tensor product to operators on the component. Next I prove a limit formula for the trace of the functional calculus and I prove that the limit can be expressed using generalized Husimi functions or using Berezin transforms.