The Dieudonn\'e modules and Ekedahl-Oort types of Jacobians of hyperelliptic curves in odd characteristic

Abstract

Given a principally polarized abelian variety A of dimension g over an algebraically closed field k of characteristic p, the p torsion A[p] is a finite flat p-torsion group scheme of rank p2g. There are exactly 2g possible group schemes that can occur as some such A[p]. In this paper, we study which group schemes can occur as J[p], where J is the Jacobian of a hyperelliptic curve defined over Fp. We do this by computing explicit formulae for the action of Frobenius and its dual on the de Rham cohomology of a hyperelliptic curve with respect to a given basis. A theorem of Oda's in [Oda69] allows us to relate these actions to the p-torsion structure of the Jacobian. Using these formulae and the computer algebra system Magma, we affirmatively resolve questions of Glass and Pries in [Cor05] on whether certain group schemes of rank p8 and p10 can occur as J[p] of a hyperelliptic curve of genus 4 and 5 respectively.