Remarks on the canonical metrics on the Cartan-Hartogs domains

Abstract

The Cartan-Hartogs domains are defined as a class of Hartogs type domains over irreducible bounded symmetric domains. For a Cartan-Hartogs domain B(μ) endowed with the natural K\"ahler metric g(μ), Zedda conjectured that the coefficient a2 of the Rawnsley's -function expansion for the Cartan-Hartogs domain (B(μ), g(μ)) is constant on B(μ) if and only if (B(μ), g(μ)) is biholomorphically isometric to the complex hyperbolic space. In this paper, following Zedda's argument, we give a geometric proof of the Zedda's conjecture by computing the curvature tensors of the Cartan-Hartogs domain (B(μ), g(μ)).