Further evaluation of Wahl vanishing theorems for surface singularities in characteristic p

Abstract

Let (Spec R, m) be a rational double point defined over an algebraically closed field k of characteristic p≥ 0. We evaluate further the dimensions of the local cohomology groups which were treated by Wahl in 1975 as vanishing theorem C (resp. D) under the assumption that p is a very good prime (resp. good prime) with respect to (Spec R, m). We use Artin's classification of rational double points and completely determine the dimensions k HE1(SX), k HE1(SX OX(E)), supplementing Wahl's theorems. In the proof we construct derivations concretely which do not lift to the minimal resolution X Spec R, as well as non-trivial equisingular families which inject into a versal deformation of the rational double point (Spec R, m).