The first two coefficients of the Bergman function expansions for Cartan-Hartogs domains

Abstract

Let φ be a globally defined real K\"ahler potential on a domain ⊂ Cd, and gF be a K\"ahler metric on the Hartogs domain M=\(z,w)∈ ×Cd0: \|w\|2<e-φ(z)\ associated with the K\"ahler potential F(z,w)=φ(z)+F(φ(z)+\|w\|2). Firstly, we obtain explicit formulas of the coefficients aj\;(j=1,2) of the Bergman function expansion for the Hartogs domain ( M,gF) in a momentum profile . Secondly, using explicit expressions of aj\;(j=1,2), we obtain necessary and sufficient conditions for the coefficients aj\;(j=1,2) to be constants. Finally, we obtain all the invariant complete K\"ahler metrics on Cartan-Hartogs domains such that their the coefficients aj\; (j=1,2) of the Bergman function expansions are constants.