Weil-\'etale cohomology and duality for arithmetic schemes in negative weights

Abstract

Flach and Morin constructed in (Doc. Math. 23 (2018), 1425--1560) Weil-\'etale cohomology HiW,c (X, Z (n)) for a proper, regular arithmetic scheme X (i.e. separated and of finite type over Spec Z) and n ∈ Z. In the case when n < 0, we generalize their construction to an arbitrary arithmetic scheme X, thus removing the proper and regular assumption. The construction uses \'etale motivic cohomology groups Hi(X\'et, Zc(n)), as studied by Geisser (Ann. of Math. (2) 172 (2010), 1095--1126), and assumes their finite generation for n < 0. We give a class of X for which finite generation is known, and hence HiW,c (X, Z (n)) is defined unconditionally.