Degenerating conic K\"ahler-Einstein metrics to the normal cone

Abstract

Let X be a Fano manifold of dimension at least 2 and D be a smooth divisor in a multiple of the anticanonical class, 1α(-KX) with α>1. It is well-known that K\"ahler-Einstein metrics on X with conic singularities along D may exist only if the angle 2πβ is bigger than some positive limit value 2πβ*. Under the hypothesis that the automorphisms of D are induced by the automorphisms of the pair (X,D), we prove that for β>β* close enough to β*, such K\"ahler-Einstein metrics do exist. We identify the limits at various scales when β→β* and, in particular, we exhibit the appearance of the Tian-Yau metric of X D.

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