Global Ricci Curvature Behaviour for the Kähler-Ricci Flow with Finite Time Singularities

Alexander Bednarek
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Abstract

We consider the K\"ahler-Ricci flow $(X, \omega(t))_{t \in [0,T)}$ on a compact manifold where the time of singularity, $T$, is finite. We assume the existence of a holomorphic map from the K\"ahler manifold $X$ to some analytic variety $Y$ which admits a K\"ahler metric on a neighbourhood of the image of $X$ and that the pullback of this metric yields the limiting cohomology class along the flow. This is satisfied, for instance, by the assumption that the initial cohomology class is rational, i.e., $[\omega_0] \in H^{1,1}(X,\mathbb{Q})$. Under these assumptions we prove an $L^4$-like estimate on the behaviour of the Ricci curvature and that the Riemannian curvature is Type $I$ in the $L^2$-sense.
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具有有限时间奇点的凯勒-里奇流的全局里奇曲率行为
我们考虑在奇点时间 $T$ 有限的紧凑流形上的 K\"ahler-Ricci 流 $(X, \omega(t))_{t \in [0,T)}$ 。我们假定存在一个从 K\"ahler 流形 $X$ 到某个解析变量 $Y$ 的全态映射,它在 $X$ 的像的邻域上允许一个 K\"ahler 度量,并且这个度量的回拉产生了沿流的极限同调类。例如,假设初始同调类是有理的,即$[\omega_0] \inH^{1,1}(X,\mathbb{Q})$ ,就可以满足这一点。在这些假设下,我们证明了关于黎氏曲率行为的类似于 $L^4$ 的估计,以及黎曼曲率在 $L^2$ 意义上是类型 $I$ 的。
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