Vanishing and Injectivity for Hodge Modules and R-Divisors

Lei Wu

doi:10.1307/mmj/20195812

Abstract

We prove an injectivity and vanishing theorem for Hodge modules and $\mathbb{R}$ -divisors over projective varieties, extending the results for rational Hodge modules and integral divisors in [Wu17]. In particular, the injectivity generalizes the fundamental injectivity of Esnault–Viehweg for normal crossing $\mathbb{Q}$ -divisors, whereas the vanishing generalizes Kawamata–Viehweg vanishing for $\mathbb{Q}$ -divisors. As a main application, we also deduce a Fujita-type freeness result for Hodge modules in the normal crossing case.

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Lei Wu. "Vanishing and Injectivity for Hodge Modules and $\mathbb{R}$ -Divisors." Michigan Math. J. 71 (2) 373 - 399, May 2022. https://doi.org/10.1307/mmj/20195812

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Received: 8 October 2019; Revised: 14 January 2020; Published: May 2022

First available in Project Euclid: 25 March 2021

MathSciNet: MR4484243

zbMATH: 1496.14012

Digital Object Identifier: 10.1307/mmj/20195812

Subjects:

Primary: 14D07 , 14F10 , 14F17

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