Degenerating K\"ahler-Einstein cones, locally symmetric cusps, and the Tian-Yau metric

Abstract

Let X be a complex projective manifold and let D⊂ X be a smooth divisor. In this article, we are interested in studying limits when β 0 of K\"ahler-Einstein metrics ωβ with a cone singularity of angle 2π β along D. In our first result, we assume that X D is a locally symmetric space and we show that ωβ converges to the locally symmetric metric and further give asymptotics of ωβ when X D is a ball quotient. Our second result deals with the case when X is Fano and D is anticanonical. We prove a folklore conjecture asserting that a rescaled limit of ωβ is the complete, Ricci flat Tian-Yau metric on X D. Furthermore, we prove that (X,ωβ) converges to an interval in the Gromov-Hausdorff sense.