Effective equidistribution of norm one elements in CM-fields

Abstract

For a number field K let SK be the maximal subgroup of the multiplicative group K× that embeds into the unit circle under each embedding of K into the complex numbers. The group SK can be seen as an archimedean counterpart to the group of units OK× of the ring of integers OK. If K=Q(SK) is a CM-field then SK/ Tor(K×) is a free abelian group of infinite rank. If K=Q(SK) is not a CM-field then SK=\ 1\. In the former case SK is the kernel of the relative norm map from K× to the multiplicative subgroup k× of the maximal totally real subfield k of K.