Conductors and minimal discriminants of hyperelliptic curves: A comparison in the tame case

Abstract

Let C be a hyperelliptic curve of genus g over the fraction field K of a discrete valuation ring R. Assume that the residue field k of R is perfect and that char\ k > 2g+1. Let S = Spec\ R. Let X be the minimal proper regular model of C over S. Let Art\ (C/K) denote the Artin conductor of the S-scheme X and let (C) denote the minimal discriminant of C. We prove that -Art\ (C/K) ≤ (C). The key ingredients are a combinatorial refinement of the discriminant introduced in this paper (called the metric tree) and a recent refinement of Abhyankar's inversion formula for studying plane curve singularities. We also prove combinatorial restrictions for -Art\ (C/K) = (C).