Convergence of Kaehler-Ricci flow with integral curvature bound

Abstract

Let g(t), t∈ [0, +∞), be a solution of the normalized K\"ahler-Ricci flow on a compact K\"ahler n-manifold M with c1(M)>0 and initial metric g (0)∈ 2π c1(M). If there is a constant C independent of t such that ∫M|Rm(g(t))|ndvt≤ C, then, for any tk ∞, a subsequence of (M, g(tk)) converges to a compact orbifold (X, h) with only finite many singular points \qj\ in the Gromov-Hausdorff sense, where h is a K\"ahler metric on X \qj\ satisfying the K\"ahler-Ricci soliton equation, i.e. there is a smooth function f such that Ric(h)-h=∇∇f, and ∇ ∇ f=∇ ∇ f=0.