Inseparable maps on Wn-valued local cohomology groups of non-taut rational double point singularities and the height of K3 surfaces

Abstract

We consider rational double point singularities (RDPs) that are non-taut, which means that the isomorphism class is not uniquely determined from the dual graph of the minimal resolution. Such RDPs exist in characteristic 2,3,5. We compute the actions of Frobenius, and other inseparable morphisms, on Wn-valued local cohomology groups of RDPs. Then we consider RDP K3 surfaces admitting non-taut RDPs. We show that the height of the K3 surface, which is also defined in terms of the Frobenius action on Wn-valued cohomology groups, is related to the isomorphism class of the RDP.