The Heisenberg group action on the Siegel domain and the structure of Bergman spaces

Abstract

We study the biholomorphic action of the Heisenberg group Hn on the Siegel domain Dn+1 (n ≥ 1). Such Hn-action allows us to obtain decompositions of both Dn+1 and the weighted Bergman spaces A2λ(Dn+1) (λ > -1). Through the use of symplectic geometry we construct a natural set of coordinates for Dn+1 adapted to Hn. This yields a useful decomposition of the domain Dn+1. The latter is then used to compute a decomposition of the Bergman spaces A2λ(Dn+1) (λ > -1) as direct integrals of Fock spaces. This effectively shows the existence of an interplay between Bergman spaces and Fock spaces through the Heisenberg group Hn. As an application, we consider T(λ)(L∞(Dn+1)Hn) the C*-algebra acting on the weighted Bergman space A2λ(Dn+1) (λ > -1) generated by Toeplitz operators whose symbols belong to L∞(Dn+1)Hn (essentially bounded and Hn-invariant). We prove that T(λ)(L∞(Dn+1)Hn) is commutative and isomorphic to VSO(R+) (very slowly oscillating functions on R+), for every λ > -1 and n ≥ 1.