An arithmetic zeta function respecting multiplicities

Abstract

In this paper, we study the arithmetic zeta function ZX(s) = Πp Πx ∈ Xp \\ closed ( 11-|(x)|-s )mp(x) associated to a scheme X of finite type over Z, where (x) denotes the residue field and mp(x) the multiplicity of x in Xp. If X is defined over a finite field, then ZX appears naturally in the context of point counting with multiplicities. We prove that ZX admits a meromorphic continuation to \s ∈ C Re(s) > dim(X)-1/2\ and determine the order of its pole at s = dim(X). Finally, we relate ZX to a zeta function ζf encoding the residual factorization patterns of a polynomial f.