Artin-Schreier-Witt extensions and ramification breaks
Abstract
Let K=k((t)) be a local field of characteristic p>0, with perfect residue field k. Let a=(a0,a1,…,an-1)∈ Wn(K) be a Witt vector of length n. Artin-Schreier-Witt theory associates to a a cyclic extension L/K of degree pi for some i n. Assume that the vector a is ``reduced'', and that vK(a0)<0; then L/K is a totally ramified extension of degree pn. In the case where k is finite, Kanesaka-Sekiguchi and Thomas used class field theory to explicitly compute the upper ramification breaks of L/K in terms of the valuations of the components of a. In this note we use a direct method to show that these formulas remain valid when k is an arbitrary perfect field.
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