On the Weil-\'etale topos of regular arithmetic schemes

Abstract

We define and study a Weil-\'etale topos for any regular, proper scheme X over (Z) which has some of the properties suggested by Lichtenbaum for such a topos. In particular, the cohomology with R-coefficients has the expected relation to ζ(X,s) at s=0 if the Hasse-Weil L-functions L(hi(XQ),s) have the expected meromorphic continuation and functional equation. If has characteristic p the cohomology with Z-coefficients also has the expected relation to ζ(X,s) and our cohomology groups recover those previously studied by Lichtenbaum and Geisser.