Recovering Kodaira types from -torsion on elliptic curves

Abstract

The classical Néron-Ogg-Shafarevich criterion characterises good reduction of an elliptic curve E over a p-adic field via the action of inertia on the -adic Tate module. However, the action of inertia on E[] is not sufficient to distinguish between potentially good and multiplicative reduction, and the action on T(E) is not sufficient to determine the Kodaira type. We remedy this situation by endowing E[] with a distance function that records the p-adic distances between the x-coordinates of the points. We show that, equipped with this additional structure, E[] determines the Kodaira type of the elliptic curve. In the case of residue characteristic 2, we assume that E does not have potentially good reduction of type In*.

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