A classification of Q-valued linear functionals on Q× modulo units

Abstract

Let Q be an algebraic closure of Q and let A denote the ring of algebraic integers in Q. If S = Q×/A× then S is a vector space over Q. We provide a complete classification all elements in the algebraic dual S* of S in terms of another Q-vector space called the space of consistent maps. With an appropriate norm on S, we further classify the continuous elements of S*. As applications of our results, we classify extensions of the prime Omega function to S and discuss a natural action of the absolute Galois group Gal( Q/ Q) on S.