On Skoda's theorem for Nadel-Lebesgue multiplier ideal sheaves on singular complex spaces and regularity of weak K\"ahler-Einstein metrics

Abstract

In this article, we will characterize regular points respectively by the local vanishing, positivity of the Ricci curvature and L2-solvability of the ∂-equation together with Skoda's theorem for Nadel-Lebesgue multiplier ideal sheaves associated to plurisubharmonic (psh) functions on any (reduced) complex space of pure dimension. As a by-product, we show that any weak K\"ahler-Einstein metric on singular Q-Fano/Calabi-Yau/general type varieties cannot be smooth, and that in general there exists no singular normal K\"ahler complex space such that the K\"ahler metric is K\"ahler-Einstein on the regular locus.

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