On the Image of the p-adic Logarithm on Annuli of Principal Units

Abstract

Let K be a finite extension of Qp, and let mK be its maximal ideal. The image of the group of principal units 1+mK under p-adic logarithm plays important role in several areas of number theory. In general, when the ramification index of K/Qp is greater or equal to p-1, the precise description of this image is not known. For the cyclotomic extension K=Qp(ζp) of degree p-1, it was previously proved in MAS that the image of the annulus region (1+mK) (1+mK2) by p-adic logarithm is exactly mK2. In this paper, we give a self-contained analytic proof of this result based on explicit p-adic logarithmic expansions.