The dualizing complex of F-injective and Du Bois singularities

Abstract

Let (R,m,k) be an excellent local ring of equal characteristic. Let j be a positive integer such that Hmi(R) has finite length for every 0≤ i <j. We prove that if R is F-injective in characteristic p>0 or Du Bois in characteristic 0, then the truncated dualizing complex τ>-jωR is quasi-isomorphic to a complex of k-vector spaces. As a consequence, F-injective or Du Bois singularities with isolated non-Cohen-Macaulay locus are Buchsbaum. Moreover, when R has F-rational or rational singularities on the punctured spectrum, we obtain stronger results.