Counting tamely ramified extensions of local fields up to isomorphism (Q2830408)

Let \(K\) be a local field with residue characteristic \(p\), and let \(n\) be a positive integer such that \(p\not\equiv1\pmod{n}\) and \(p^2\equiv1\pmod{n}\). This paper computes the number of \(K\)-isomorphism classes of field extensions \(L/K\) of degree \(n\). A formula was given in [\textit{M. Monge}, J. Number Theory 131, No. 8, 1429--1434 (2011; Zbl 1233.11124)] for the number of \(K\)-isomorphism classes of field extensions of degree \(n\) which is valid for all \(n\geq1\). The methods used in the present paper are quite different from those used in [loc. cit.], and hence the formula obtained here looks quite different from the formula in [loc. cit.].