On the Iwasawa asymptotic class number formula for Zprp-extensions

Abstract

Let p be an odd prime and F∞,∞ a p-adic Lie extension of a number field F with Galois group isomorphic to Zprp, r≥ 1. Under certain assumptions, we prove an asymptotic formula for the growth of p-exponents of the class groups in the said p-adic Lie extension. This generalizes a previous result of Lei, where he establishes such a formula in the case r=1. An important and new ingredient towards extending Lei's result rests on an asymptotic formula for a finitely generated (not necessarily torsion) Zp[[Zpr]]-module which we will also establish in this paper. We then continue studying the growth of p-exponents of the class groups under more restrictive assumptions and show that there is an asymptotic formula in our noncommutative p-adic Lie extension analogous to a refined formula of Monsky (which is for the commutative extension) in a special case.