A Note on Wu-Zheng's Splitting Conjecture

Abstract

Cao's splitting theorem says that for any complete K\"ahler-Ricci flow (M,g(t)) with t∈ [0,T), M simply connected and nonnegative bounded holomorphic bisectional curvature, (M,g(t)) is holomorphically isometric to k× (N,h(t)) where (N,h(t)) is a Kahler-Ricci flow with positive Ricci curvature for t>0. In this article, we show that k=n-r where r is the Ricci rank of the initial metric. As a corollary, we also confirm a splitting conjecture of Wu-Zheng when curvature is assumed to be bounded.