A vanishing theorem for sheaves of small differential operators in positive characteristic

Abstract

Let X be a smooth variety over an algebraically closed field k of positive characteristic, DX the sheaf of PD-differential operators, and DX its central reduction, the sheaf of small differential operators. In this paper we show that if X is a line-hyperplane incidence variety (a partial flag variety of type (1,n,n+1)) or a quadric of arbitrary dimension (in this case the characteristic is supposed to be odd) then Hi(X, DX)=0 for i>0. Using this vanishing result and the derived localization theorem for crystalline differential operators (BMR) we show that the Frobenius pushforward of the structure sheaf is a tilting bundle on these varieties, provided that p>h, the Coxeter number of the corresponding group.