Complex Weyl correspondence for a generalized diamond group

Abstract

The generalized diamond group is the semi-direct product G of the abelian group Rm by the (2n+1)-dimensional Heisenberg group Hn. We construct the generic representations of G on the Fock space by extending those of Hn. Then we study the Berezin correspondence and the complex Weyl correspondence in connection with a generic representation π of G, proving in particular that these correspondences are covariant with respect to π. We give also some explicit formulas for the Berezin symbols and the complex Weyl symbols of the representation operators π(g) for g∈ G. These results are applied to recover various formulas involving the Moyal product. Moreover, we relate π to a coadjoint orbit of G in the spirit of the Kirillov-Kostant method of orbits. This allows us to establish that the complex Weyl correspondence is a Stratonovich-Weyl correspondence for π.