K\"ahler-Einstein metrics with prescribed singularities on Fano manifolds

Abstract

Given a Fano manifold (X,ω) we develop a variational approach to characterize analytically the existence of K\"ahler-Einstein metrics with prescribed singularities, assuming that these singularities can be approximated algebraically. Moreover, we define a function αω on the set of prescribed singularities which generalizes Tian's α-invariant, showing that its upper level set \αω(·)>nn+1\ produces a subset of the K\"ahler-Einstein locus, i.e. of the locus given by all prescribed singularities that admit K\"ahler-Einstein metrics. In particular, we prove that many K-stable manifolds admit all possible K\"ahler-Einstein metrics with prescribed singularities. Conversely, we show that enough positivity of the α-invariant function at non-trivial prescribed singularities (or other conditions) implies the existence of genuine K\"ahler-Einstein metrics. Finally, through a continuity method, we also prove the strong continuity of K\"ahler-Einstein metrics on curves of totally ordered prescribed singularities when the relative automorphism groups are discrete.