Zeta-values of one-dimensional arithmetic schemes at strictly negative integers

Abstract

Let X be an arithmetic scheme (i.e., separated, of finite type over Spec Z) of Krull dimension 1. For the associated zeta function ζ (X,s), we write down a formula for the special value at s = n < 0 in terms of the \'etale motivic cohomology of X and a regulator. We prove it in the case when for each generic point η ∈ X with char (η) = 0, the extension (η)/Q is abelian. We conjecture that the formula holds for any one-dimensional arithmetic scheme. This is a consequence of the Weil-\'etale formalism developed by the author in [arXiv:2012.11034] and [arXiv:2102.12114], following the work of Flach and Morin (Doc. Math. 23 (2018), 1425--1560). We also calculate the Weil-\'etale cohomology of one-dimensional arithmetic schemes and show that our special value formula is a particular case of the main conjecture from [arXiv:2102.12114].