On the classification of normal Stein spaces and finite ball quotients with Bergman-Einstein metrics

Abstract

In this paper, we study the Bergman metric of a finite ball quotient Bn/, where ⊂eq Aut(Bn) is a finite, fixed point free, abelian group. We prove that this metric is K\"ahler--Einstein if and only if is trivial, i.e., when the ball quotient Bn/ is the unit ball Bn itself. As a consequence, we establish a characterization of the unit ball among normal Stein spaces with isolated singularities and abelian fundamental groups in terms of the existence of a Bergman-Einstein metric.