On the volume of K-semistable Fano manifolds
Abstract
We prove that the anti-canonical volume of an n-dimensional K-semistable Fano manifold that is not Pn is at most 2nn. Moreover, the volume is equal to 2nn if and only if X P1× Pn-1 or X is a smooth quadric hypersurface Q⊂ Pn+1. Our proof is based on a new connection between K-semistability and minimal rational curves.
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