Weil-\'etale cohomology and Zeta-values of proper regular arithmetic schemes

Abstract

We give a conjectural description of the vanishing order and leading Taylor coefficient of the Zeta function of a proper, regular arithmetic scheme X at any integer n in terms of Weil-\'etale cohomology complexes. This extends work of Lichtenbaum Lichtenbaum05 and Geisser Geisser04b for X of characteristic p, of Lichtenbaum li04 for X=Spec(OF) and n=0 where F is a number field, and of the second author for arbitrary X and n=0 Morin14. We show that our conjecture is compatible with the Tamagawa number conjecture of Bloch, Kato, Fontaine and Perrin-Riou fpr91 if X is smooth over Spec(OF), and hence that it holds in cases where the Tamagawa number conjecture is known.