Iterated extensions and relative Lubin-Tate groups

Abstract

Let K be a finite extension of Qp with residue field Fq and let P(T) = Td + ad-1Td-1 + ... +a1 T, where d is a power of q and ai is in the maximal ideal of K for all i. Let u0 be a uniformizer of OK and let unn ≥ 0 be a sequence of elements of Qpalg such that P(un+1) = un for all n ≥ 0. Let Kinfty be the field generated over K by all the un. If Kinfty / K is a Galois extension, then it is abelian, and our main result is that it is generated by the torsion points of a relative Lubin-Tate group (a generalization of the usual Lubin-Tate groups). The proof of this involves generalizing the construction of Coleman power series, constructing some p-adic periods in Fontaine's rings, and using local class field theory.