Fiberwise K\"ahler-Ricci flows on families of bounded strongly pseudoconvex domains

Abstract

Let π:Cn×C→C be the projection map onto the second factor and let D be a domain in Cn+1 such that for y∈π(D), every fiber Dy:=Dπ-1(y) is a smoothly bounded strongly pseudoconvex domain in Cn and is diffeomorphic to each other. By Chau's theorem, the K\"ahler-Ricci flow has a long time solution ωy(t) on each fiber Dy. This family of flows induces a smooth real (1,1)-form ω(t) on the total space D whose restriction to the fiber Dy satisfies ω(t)Dy=ωy(t). In this paper, we prove that ω(t) is positive for all t>0 in D if ω(0) is positive. As a corollary, we also prove that the fiberwise K\"ahler-Einstein metric is positive semi-definite on D if D is pseudoconvex in Cn+1.