Higher Direct Images of the Structure Sheaf Over a Dedekind Domain

Abstract

We prove that for Noetherian, smooth, separated, integral, finite type schemes X and Y over an excellent Dedekind domain R, that are properly birational over R, we have Rif*OX Rig* OY and Ri f*X/Sd Rig* Y/Sd, where d is the relative dimension of X and Y over S= Spec(R), and f and g are the structure maps of X and Y, respectively, as S-schemes. As a corollary we obtain the vanishing of higher direct images of the structure sheaf for proper birational morphisms beteween such schemes. These results extend those obtained by Chatzistamatiou--R\"ulling over perfect fields of positive characteristic and we obtain them by extending their method of algebraic correspondences. We furthermore obtain as a corollary that if K is a number field and OK its ring of integers and if X is a smooth and proper K-scheme with X and Y two smooth proper models of X over some dense open subscheme U ⊂eq S = Spec(OK), that if Hj(X,OX) is OS(U)-torsion-free we have Hj(Xt,OXt) = Hj(Yt,OYt), for all closed points t ∈ U.