p-torsion for unramified Artin--Schreier covers of curves
Abstract
Let Y X be an unramified Galois cover of curves over a perfect field k of characteristic p>0 with Gal(Y/X)/pZ, and let JX and JY be the Jacobians of X and Y respectively. We consider the p-torsion subgroup schemes JX[p] and JY[p], analyze the Galois-module structure of JY[p], and find restrictions this structure imposes on JY[p] (for example, as manifested in its Ekedahl--Oort type) taking JX[p] as given.
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