Asymptotic growth of Iwasawa invariants in Noncommutative towers of number fields

Abstract

Let p be an odd prime, F be a number field and consider a uniform infinite pro-p extension F∞ of F with Galois group G=Gal(F∞/F). Let \[G=G0⊃ G1⊃… ⊃ Gn⊃ Gn+1⊃ …\] be the descending p central series of G and set Fn:=F∞Gn. Assume that G is uniform and that F∞ contains the cyclotomic Zp-extension of F. Denote by An the p-primary part of the class group of the cyclotomic Zp-extension of Fn. The λ-invariant of Fn coincides with the corank of An as a Zp-module. Assume that the Iwasawa μ-invariant of the cyclotomic Zp-extension of F equal to 0. Then, the μ-invariant of the cyclotomic Zp-extension of Fn is 0 as well and An is isomorphic to (Qp/Zp)λn. We study the asymptotic growth of λn as n goes to ∞.