Circular annihilators of logarithmic classes

Abstract

Given a real abelian field F with group G and an odd prime number , we define the circular subgroup of the pro--group of logarithmic units and we show that for any Galois morphism from the pro--group of logarithmic units to Z [G ], the image of the circular subgroup annihilates the -group of logarithmic classes. We deduce from this a proof of a logarithmic version of Solomon conjecture.