Hasse-Arf property and abelian extensions for local fields with imperfect residue fields
Abstract
For a finite totally ramified extension L of a complete discrete valuation field K with the perfect residue field of characteristic p>0, it is known that L/K is an abelian extension if the upper ramification breaks are integers and if the wild inertia group is abelian. We prove a similar result without the assumption that the residue field is perfect. As an application, we prove a converse to the Hasse-Arf theorem for a complete discrete valuation field with the imperfect residue field. More precisely, for a complete discrete valuation field K with the residue field K of residue characteristic p>2 and a finite non-abelian Galois extension L/K such that the Galois group of L/K is equal to the inertia group I of L/K, we construct a complete discrete valuation field K' with the residue field K and a finite Galois extension L'/K' which has at least one non-integral upper ramification break and whose Galois group and inertia group are isomorphic to I.
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