Special values of L-functions on regular arithmetic schemes of dimension 1

Abstract

We construct a well-behaved Weil-\'etale complex for a large class of Z-constructible sheaves on a regular irreducible scheme U of finite type over Z and of dimension 1. We then give a formula for the special value at s=0 of the L-function associated to any Z-constructible sheaf on U in terms of Euler characteristics of Weil-\'etale cohomology; for smooth proper curves, we obtain the formula of arXiv:2009.14504. We deduce a special value formula for Artin L-functions twisted by a singular irreducible scheme X of finite type over Z and of dimension 1. This generalizes and improves all results in arXiv:1611.01720; as a special case, we obtain a special value formula for the arithmetic zeta function of X.