A classification of Q-linear maps from Q×/ Q×tors to R
Abstract
A 2009 article of Allcock and Vaaler explored the Q-vector space G := Q×/ Q×tors, showing how to represent it as part of a function space on the places of Q. We establish a representation theorem for the R-vector space of Q-linear maps from G to R, enabling us to classify extensions to G of completely additive arithmetic functions. We further outline a strategy to construct Q-linear maps from G to Q, i.e., elements of the algebraic dual of G. Our results make heavy use of Dirichlet's S-unit Theorem as well as a measure-like object called a consistent map, first introduced by the author in previous work.
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