Superelliptic degree sets over Henselian fields
Abstract
Let K be a discretely valued Henselian field. Creutz and Viray show that the degree set of a curve C over a p-adic field can miss infinitely many multiples of the index of C, a phenomenon that cannot occur over finitely generated fields. For curves C/K with a cyclic cover of P1 of prime degree, under mild assumptions, we completely characterize how and when this behavior can occur, and give a method for computing degree sets of curves of this type.
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