Du Bois complex and extension of forms beyond rational singularities
Abstract
We establish a characterization of the Du Bois complex of a reduced pair (X,Z) when X Z has rational singularities. As an application, when X has normal Du Bois singularities and Z is the locus of non-rational singularities of X, holomorphic p-forms on the smooth locus of X extend regularly to forms on a resolution of singularities for pX Z-1, and to forms with log poles over Z for pX Z. If X is not necessarily Du Bois, then p-forms extend regularly for pX Z-2. This is a generalization of the theorems of Flenner, Greb-Kebekus-Kov\'acs-Peternell, and Kebekus-Schnell on extending holomorphic (log) forms. A by-product of our methods is a new proof of the theorem of Koll\'ar-Kov\'acs that log canonical singularities are Du Bois. We also show that the Proj of the log canonical ring of a log canonical pair is Du Bois if this ring is finitely generated. The proofs are based on Saito's theory of mixed Hodge modules.
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