Bergman kernels, TYZ expansions and Hankel operators on the Kepler manifold (Q285811)

For \(n\geq 2\) consider the Kepler manifold in \(\mathbb C^{n+1}\) defined by NEWLINE\[NEWLINE\mathbb H:=\big\{z\in\mathbb C^{n+1}\setminus\{0\}:z_1^2+\dots+z_{n+1}^2=0\big\}.NEWLINE\]NEWLINE In the paper under review the authors do the following: {\parindent=0.7cm\begin{itemize}\item[(1)]They give a description of the reproducing kernels of the associated Bergman spaces (for a class of \(O(n+1,\mathbb R)\) invariant measures on \(\mathbb H\) possessing finite moments of all orders); \item[(2)]They establish asymptotics of these reproducing kernels (the so-called Tian-Yau-Zelditch expansion), which is a generalization of the result of \textit{T. Gramchev} and \textit{A. Loi} from [Commun. Math. Phys. 289, No. 3, 825--840 (2009; Zbl 1175.32013)], obtained with a simpler method and also extendible to other situations; \item[(3)]They study the relevant Hankel operators with conjugate holomorphic symbols; \item[(4)]They prove that \(\mathbb H\) either does not admit so-called balanced metrics (in the sense of Donaldson), or such metrics are not unique.NEWLINENEWLINE\end{itemize}}