On the Weil-\'etale cohomology of the ring of S-integers

Abstract

In this article, we first briefly introduce the history of the Weil-\'etale cohomology theory of arithmetic schemes and review some important results established by Lichtenbaum, Flach and Morin. Next we generalize the Weil-etale cohomology to S-integers and compute the cohomology for constant sheaves Z or R. We also define a Weil-\'etale cohomology with compact support Hc(YW, -) for Y=Spec OF,S where F is a number field, and computed them. We verify that these cohomology groups satisfy the axioms state by Lichtenbaum. As an application, we derive a canonical representation of Tate sequence from RGammac(YW,Z). Motivated by this result, in the final part, we define an \'etale complex RGm, such that the complexes Z-dual of the complex (Uet,R),\,Z)[2] is canonically quasi-isomorphic to τ≤ 3c(UW,Z) for arbitrary \'etale U over Spec OF. This quasi-isomorphism provides a possible approach to define the Weil-etale cohomology for higher dimensional arithmetic schemes, as the Weil groups are not involved in the definition of R.