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Equality in the Miyaoka-Yau inequality and uniformization of non-positively curved klt pairs

Published 6 May 2023 in math.AG, math.CV, and math.DG | (2305.04074v1)

Abstract: Let $(X, \Delta)$ be a compact K\"ahler klt pair, where $K_X + \Delta$ is ample or numerically trivial, and $\Delta$ has standard coefficients. We show that if equality holds in the orbifold Miyaoka-Yau inequality for $(X, \Delta)$, then its orbifold universal cover is either the unit ball (ample case) or the affine space (numerically trivial case).

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