Bases of associated Galois modules in general wildly ramified extensions and in elementary abelian extensions of degree p2

Abstract

For a wildly ramified extension K/k of complete discrete valuation fields we study collections of elements of k[G] (where G=Gal(K/k)) that fit well for constructing bases of various associated Galois modules and orders. In the case G=(Z/pZ)2 (where p is the characteristic of residue fields) we are able to compute the action of the elements (σ1-1)i(σ2-1)j,\ 0 i,j p-1, on the valuation filtration; here σ1,σ2 are generators of G. If the ramification jumps of K/k are distinct modulo p2 then these elements do yield "good enough" bases in question.

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