Honda formal group as Galois module in unramified extensions of local fields

Abstract

For given rational prime number p consider the tower of finite extensions of fields K0/Qp, K/K0, L/K, M/L, where K/K0 is unramified and M/L is a Galois extension with Galois group G. Suppose one dimensional Honda formal group over the ring OK, relative to the extension K/K0 and uniformizer π∈ K0 is given. The operation xF+y=F(x,y) sets a new structure of abelian group on the maximal ideal pM of the ring OM which we will denote by F(pM). In this paper the structure of F(pM) as OK0[G]-module is studied for specific unramified p-extensions M/L.