F-finite schemes have a dualizing complex

Abstract

In this paper we show that any Noetherian F-finite scheme has a dualizing complex ωX with the property that for all finite type maps f X Y between F-finite Noetherian schemes there is a canonical isomorphism ωX f!ωY in Dbcoh(X). This, in particular, applies to the Frobenius morphism F X X so that we obtain a canonical isomorphism ωX F!ωX. To prove this, we rely on a result of Gabber that every Noetherian F-finite ring is a quotient of a regular ring, from which it follows that every F-finite Noetherian scheme has a (potentially non-canonical) dualizing complex. To make this canonical, we identify the dualizing complex of any F-finite Noetherian scheme as a unit of an alternate symmetric monoidal structure on Dbcoh(X) we call the !-tensor product. We also sketch an alternate approach to finding this canonical dualizing complex following the more classical approach to Grothendieck duality.