Local cohomology of Du Bois singularities and applications to families

Abstract

In this paper we study the local cohomology modules of Du Bois singularities. Let (R,m) be a local ring, we prove that if Rred is Du Bois, then Hmi(R) Hmi(Rred) is surjective for every i. We find many applications of this result. For example we answer a question of Kov\'acs and the second author on the Cohen-Macaulay property of Du Bois singularities. We obtain results on the injectivity of Ext that provide substantial partial answers of questions of Eisenbud-Mustata-Stillman in characteristic 0, and these results can be viewed as generalizations of the Kodaira vanishing theorem for Cohen-Macaulay Du Bois varieties. We prove results on the set-theoretic Cohen-Macaulayness of the defining ideal of Du Bois singularities, which are characteristic 0 analog of results of Singh-Walther and answer some of their questions. We extend results of Hochster-Roberts on the relation between Koszul cohomology and local cohomology for F-injective and Du Bois singularities, see Hochster-Roberts. We also prove that singularities of dense F-injective type deform.