Conductors of wild extensions of local fields, especially in mixed characteristic (0,2)

Abstract

If K0 is the fraction field of the Witt vectors over an algebraically closed field k of characteristic p, we calculate upper bounds on the conductor of higher ramification for (the Galois closure of) extensions K0(zetapr, sqrt[pr]a)/K0, where a is in K0(zetapr). Here zetapr is a primitive pr-th root of unity. In certain cases, including when a is in K0 and p=2, we calculate the conductor exactly. These calculations can be used to determine the discriminants of various extensions of Q obtained by adjoining roots of unity and radicals.