G-uniform stability and K\"ahler-Einstein metrics on Fano varieties
Abstract
Let X be any Q-Fano variety and Aut(X)0 be the identity component of the automorphism group of X. Let G be a connected reductive subgroup of Aut(X)0 that contains a maximal torus of Aut(X)0. We prove that X admits a K\"ahler-Einstein metric if and only if X is G-uniformly K-stable. This proves a version of Yau-Tian-Donaldson conjecture for arbitrary singular Fano varieties. A key new ingredient is a valuative criterion for G-uniform K-stability.
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