Some remarks on Bergman metrics (Q2777993)

Let \(M\) be a compact complex manifold and \(\varphi :M\to {\mathbb C}^{N_{k}}\) an embedding of \(M\) into the complex projective space \({\mathbb C}^{N_{k}}\). Let \(g_{FS}^{N_{k}}\) be the Fubini-Study metric on \({\mathbb C}^{N_{k}}\) and the induced Kähler metric \(g_{k}=\varphi ^{*}g_{FS}^{N_{k}}\) on \(M\). A polarized metric \(g\) on \(M\) is called by the authors self-Bergman metric of degree \(k\) if \(g_{k}=kg\) for some natural number \(k\). One of the main results of this paper is: if the Kähler manifold \(( M,g) \) is homogeneous and simply connected then the metric \(g\) is self-Bergman of degree \(k\) for all sufficiently large \(k\). A sort of converse of above theorem in the case of self-Bergman metrics of degree 2 on \({\mathbb C}P^{1}\) induced by the Veronese map and in the case of self-Bergman metrics of degree 1 on \({\mathbb C}P^{1}\times {\mathbb C}P^{1}\) induced by the Segre map is also included. (Throughout the text, Bergman is mispelled).