The Holomorphic Extension Property for Higher Du Bois Singularities
Abstract
Let X be a normal complex variety and π: X X a resolution of singularities. We show that the inclusion morphism π* Xp X[p] is an isomorphism for p < codimX(Xsing) when X has du Bois singularities, giving an improvement on Flenner's criterion for arbitrary singularities. We also study the k-du Bois definition from the perspective of holomorphic extension and compare how different restrictions on H0( Xp) affect the singularities of X, where Xp is the pth-graded piece of the du Bois complex.
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