Milne's correcting factor and derived de Rham cohomology II

Abstract

Milne's correcting factor, which appears in the Zeta-value at s=n of a smooth projective variety X over a finite field Fq, is the Euler characteristic of the derived de Rham cohomology of X/Z modulo the Hodge filtration Fn. In this note, we extend this result to arbitrary separated schemes of finite type over Fq of dimension at most d, provided resolution of singularities for schemes of dimension at most d holds. More precisely, we show that Geisser's generalization of Milne's factor, whenever it is well defined, is the Euler characteristic of the eh-cohomology with compact support of the derived de Rham complex relative to Z modulo Fn.