English

An arithmetic zeta function respecting multiplicities

Number Theory 2023-03-16 v5 Algebraic Geometry

Abstract

In this paper, we study the arithmetic zeta function ZX(s)=pxXpclosed(11κ(x)s)mp(x)\mathscr{Z}_{\mathcal{X}}(s) = \prod_p \prod_{\substack{x \in \mathcal{X}_p \\ \text{closed}}} \Big( \frac{1}{1-|\kappa(x)|^{-s}} \Big)^{\mathfrak{m}_{p}(x)} associated to a scheme X\mathcal{X} of finite type over Z\mathbb{Z}, where κ(x)\kappa(x) denotes the residue field and mp(x)\mathfrak{m}_{p}(x) the multiplicity of xx in Xp\mathcal{X}_p. If X\mathcal{X} is defined over a finite field, then ZX\mathscr{Z}_{\mathcal{X}} appears naturally in the context of point counting with multiplicities. We prove that ZX\mathscr{Z}_{\mathcal{X}} admits a meromorphic continuation to {sC ⁣:Re(s)>dim(X)1/2}\{s \in \mathbb{C} \colon \mathrm{Re}(s) > \mathrm{dim}(\mathcal{X})-1/2\} and determine the order of its pole at s=dim(X)s = \mathrm{dim}(\mathcal{X}). Finally, we relate ZX\mathscr{Z}_{\mathcal{X}} to a zeta function ζf\zeta_f encoding the residual factorization patterns of a polynomial ff.

Keywords

Cite

@article{arxiv.2003.06057,
  title  = {An arithmetic zeta function respecting multiplicities},
  author = {Lukas Prader},
  journal= {arXiv preprint arXiv:2003.06057},
  year   = {2023}
}

Comments

26 pages; version of Jan. 16th, 2022

R2 v1 2026-06-23T14:13:26.966Z