Rigidity of proper holomorphic mappings between certain unbounded non-hyperbolic domains

Abstract

The Fock-Bargmann-Hartogs domain Dn,m(μ) (μ>0) in Cn+m is defined by the inequality \|w\|2<e-μ\|z\|2, where (z,w)∈ Cn× Cm, which is an unbounded non-hyperbolic domain in Cn+m. Recently, Yamamori gave an explicit formula for the Bergman kernel of the Fock-Bargmann-Hartogs domains in terms of the polylogarithm functions and Kim-Ninh-Yamamori determined the automorphism group of the domain Dn,m(μ). In this article, we obtain rigidity results on proper holomorphic mappings between two equidimensional Fock-Bargmann-Hartogs domains. Our rigidity result implies that any proper holomorphic self-mapping on the Fock-Bargmann-Hartogs domain Dn,m(μ) with m≥ 2 must be an automorphism.