Admissible HYM metrics on klt KE varieties and the MY equality for big anticanonical K-stable varieties

Abstract

This short note includes three results: (1) If a reflexive sheaf E on a log terminal K\"ahler-Einstein variety (X,ω) is slope stable with respect to a singular K\"ahler-Einstein metric ω, then E admits an ω-admissible Hermitian-Yang-Mills metric. (2) If a K-stable log terminal projective variety with big anti-canonical divisor satisfies the equality of the Miyaoka-Yau inequality in the sense of IJZ25, then its anti-canonical model admits a quasi-\'etale cover from CPn. (3) There exists a holomorphic rank 3 vector bundle on a compact complex surface which is semistable for some nef and big line bundle, but it is not semistable for any ample line bundles.

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