Xiuxiong Chen, Bing Wang
Published 2008-09-23, updated 2009-01-12Version 2
We study some estimates along the Kahler Ricci flow on Fano manifolds. Using these estimates, we show the convergence of Kahler Ricci flow directly if the $\alpha$-invariant of the canonical class is greater than $\frac{n}{n+1}$. Applying these convergence theorems, we can give a flow proof of Calabi conjecture on such Fano manifolds. In particular, the existence of Kahler Einstein metrics on a lot of Fano surfaces can be proved by flow method. Note that this geometric conclusion (based on the same assumption) was established earlier via elliptic method by G. Tian. However, a new proof based on Kahler Ricci flow should be still interesting in its own right.
Comments: We note an overlap with the paper of Rubinstein [Ru1]. We add more reference
Hodge Laplacian and geometry of Kuranishi family of Fano manifolds
Kahler-Einstein metrics on Fano manifolds, I: approximation of metrics with cone singularities
On Feldman-Ilmanen-Knopf conjecture for the blow-up behavior of the Kahler Ricci flow
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