Newton Polygons of Sums on Curves I: Local-to-Global Theorems

TL;DR

This paper investigates the relationship between Newton and Hodge polygons of abelian L-functions on curves, establishing local-to-global criteria for their coincidence and sharing vertices.

Contribution

It provides a new local-to-global theorem linking Newton and Hodge polygons of global L-functions to those of local L-functions at ramified points.

Findings

Newton polygon and Hodge polygon share a vertex iff local polygons do

Necessary and sufficient conditions for the coincidence of NP and HP

Establishment of a criterion for polygon touching in the global setting

Abstract

The purpose of this article is to study Newton polygons of certain abelian $L$-functions on curves. Let $X$ be a smooth affine curve over a finite field $\mathbb{F}_q$ and let $\rho:\pi_1(X) \to \mathbb{C}_p^\times$ be a finite character of order $p^n$. By previous work of the first author, the Newton polygon $\mathrm{NP}(\rho)$ lies above a `Hodge polygon' $\mathrm{HP}(\rho)$, which is defined using local ramification invariants of $\rho$. In this article we study the touching between these two polygons. We prove that $\mathrm{NP}(\rho)$ and $\mathrm{HP}(\rho)$ share a vertex if and only if a corresponding vertex is shared between the Newton and Hodge polygons of `local' $L$-functions associated to each ramified point of $\rho$. As a consequence, we determine a necessary and sufficient condition for the coincidence of $\mathrm{NP}(\rho)$ and $\mathrm{HP}(\rho)$.