Bergman--Einstein Rigidity for Hartogs Domains over Bounded Homogeneous Domains

Abstract

We prove a rigidity theorem for the Bergman metric on Hartogs domains over bounded homogeneous domains. Let ⊂ Cn be a bounded homogeneous domain, let K denote its Bergman kernel, and consider m,s:=\(z,ζ)∈ × Cm:\ \|ζ\|2<K(z, z)-s\, m 1, s>-C. For s≠ 0, we prove that the following conditions are equivalent: the Bergman metric of m,s is K\"ahler--Einstein; m,s is homogeneous; m,s is biholomorphic to Bn+m; and Bn with s=1n+1. This gives a positive answer to Yau's question within this class and may be viewed as a Cheng-type rigidity phenomenon beyond the smoothly bounded strictly pseudoconvex setting. The proof combines the explicit formula for the Bergman kernel of m,s with the structural invariants of the bounded homogeneous base.