Holomorphic family of strongly pseudoconvex domains in a K\"ahler manifold

Abstract

Let p:X→ Y be a surjective holomorphic mapping between K\"ahler manifolds. Let D be a bounded smooth domain in X such that every generic fiber Dy:=D p-1(y) for y∈ Y is a strongly pseudoconvex domain in Xy:=p-1(y), which admits the complete K\"ahler-Einstein metric. This family of K\"ahler-Einstein metrics induces a smooth (1,1)-form on D. In this paper, we prove that is positive-definite on D if D is strongly pseudoconvex. We also discuss the extensioin of as a positive current across singular fibers.