Global Units modulo Circular Units : descent without Iwasawa's Main Conjecture

Abstract

Iwasawa's classical asymptotical formula relates the orders of the p-parts Xn of the ideal class groups along a p-extension F∞/F of a number field F, to Iwasawa structural invariants and μ attached to the inverse limit X∞= Xn. It relies on "good" descent properties satisfied by Xn. If F is abelian and F∞ is cyclotomic it is known that the p-parts of the orders of the global units modulo circular units Un/Cn are asymptotically equivalent to the p-parts of the ideal class numbers. This suggests that these quotients Un/Cn, so to speak unit class groups, satisfy also good descent properties. We show this directly, i.e. without using Iwasawa's Main Conjecture.