The Heisenberg group action on the Siegel domain and the structure of Bergman spaces (2309.02540v2)

Abstract: We study the biholomorphic action of the Heisenberg group $\mathbb{H}n$ on the Siegel domain $D{n+1}$ ($n \geq 1$). Such $\mathbb{H}n$-action allows us to obtain decompositions of both $D{n+1}$ and the weighted Bergman spaces $\mathcal{A}^2_\lambda(D_{n+1})$ ($\lambda > -1$). Through the use of symplectic geometry we construct a natural set of coordinates for $D_{n+1}$ adapted to $\mathbb{H}n$. This yields a useful decomposition of the domain $D{n+1}$. The latter is then used to compute a decomposition of the Bergman spaces $\mathcal{A}^2_\lambda(D_{n+1})$ ($\lambda > -1$) as direct integrals of Fock spaces. This effectively shows the existence of an interplay between Bergman spaces and Fock spaces through the Heisenberg group $\mathbb{H}n$. As an application, we consider $\mathcal{T}^{(\lambda)}(L^\infty(D{n+1})^{\mathbb{H}_n})$ the $C^*$-algebra acting on the weighted Bergman space $\mathcal{A}^2_\lambda(D_{n+1})$ ($\lambda > -1$) generated by Toeplitz operators whose symbols belong to $L^\infty(D_{n+1})^{\mathbb{H}_n}$ (essentially bounded and $\mathbb{H}n$-invariant). We prove that $\mathcal{T}^{(\lambda)}(L^\infty(D{n+1})^{\mathbb{H}_n})$ is commutative and isomorphic to $\mathrm{VSO}(\mathbb{R}+)$ (very slowly oscillating functions on $\mathbb{R}+$), for every $\lambda > -1$ and $n \geq 1$.