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The Miyaoka-Yau inequality for singular varieties with big canonical or anticanonical divisors

Published 11 Jul 2025 in math.AG, math.CV, and math.DG | (2507.08522v1)

Abstract: We establish the Miyaoka-Yau inequality for $n$-dimensional projective klt varieties with big canonical divisor $K_X$: [ (2(n+1)\widehat{c}_2(X) - n \widehat{c}_1(X)2) \cdot \langle c_1(K_X){n-2} \rangle \ge 0. ] We also prove the Miyaoka-Yau inequality for K-semistable projective klt varieties with big anticanonical divisor $-K_X$. As part of our approach, we define the non-pluripolar product $\langle \alpha_1 \cdots \alpha_p \rangle$ on singular varieties, and establish the Bogomolov-Gieseker type inequality for $\langle \alpha{n-1} \rangle$-semistable Higgs sheaves with respect to a big class $\alpha$. In addition, we investigate second Chern class inequalities in the cases where $K_X$ or $-K_X$ is nef.

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