Q-factoriality and Hodge-Du Bois theory
Abstract
We prove Hodge-theoretic formulas for the Q-factoriality defect of a normal projective variety, and for the local analytic Q-factoriality defect of an analytic germ of a normal variety. These formulas lead to consequences ranging from a local analytic version of Samuel's conjecture to a characterization of projective rational homology threefolds with rational singularities, or the invariance of Hodge-Du Bois numbers under flops of projective threefolds.
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