Construction of elliptic p-units

Abstract

Let L/k be a finite abelian extension of an imaginary quadratic number field k. Let p denote a prime ideal of Ok lying over the rational prime p. We assume that p splits completely in L/k and that p does not divide the class number of k. If p is split in k/Q the first named author has adapted a construction of Solomon to obtain elliptic p-units in L. In this paper we generalize this construction to the non-split case and obtain in this way a pair of elliptic p-units depending on a choice of generators of a certain Iwasawa algebra (which here is of rank 2). In our main result we express the p-adic valuations of these p-units in terms of the p-adic logarithm of an explicit elliptic unit. The crucial input for the proof of our main result is the computation of the constant term of a suitable Coleman power series, where we rely on recent work of T. Seiriki.