K\"ahler-Einstein metrics and volume minimization

Abstract

We prove that if a Q-Fano variety V specially degenerates to a K\"ahler-Einstein Q-Fano variety V, then for any ample Cartier divisor H=-r-1 KV with r∈ Q>0, the normalized volume vol(v)=ACn(v)· vol(v) is globally minimized at the canonical valuation ordV among all real valuations which are centered at the vertex of the affine cone C:=C(V,H). This is also generalized to the logarithmic and the orbifold setting. As a consequence, we complete the confirmation of a conjecture in [arXiv:1511.08164] on an equivalent characterization of K-semistability for any smooth Fano manifold. We also prove that the valuation associated to the Reeb vector field of a smooth Sasaki-Einstein metric minimizes vol over the corresponding K\"ahler cone. These results strengthen the minimization result of Martelli-Sparks-Yau [Martelli et al 08].