Computing discrete invariants of varieties in positive characteristic. I. Ekedahl-Oort types of curves

TL;DR

This paper introduces a new method to compute the Ekedahl-Oort type of algebraic curves in positive characteristic, using Hasse-Witt triples, with an implementation in Magma for complete intersection curves.

Contribution

It presents a novel approach using Hasse-Witt triples to compute Ekedahl-Oort types, simplifying calculations for certain curves.

Findings

Hasse-Witt triples effectively encode Dieudonne modules.

The method simplifies computation for complete intersection curves.

Implementation available in Magma facilitates practical use.

Abstract

We develop a method to compute the Ekedahl-Oort type of a curve C over a field k of characteristic p (which is the isomorphism type of the p-kernel group scheme J[p], where J is the Jacobian of C). Part of our method is general, in that we introduce the new notion of a Hasse-Witt triple, which re-encodes in a useful way the information contained in the Dieudonne module of J[p]. For complete intersection curves we then give a simple method to compute this Hasse-Witt triple. An implementation of this method is available in Magma.