-Class groups of fields in Kummer towers

Abstract

Let and p be prime numbers and Kn,m=Q(p1n,ζ2m). We study the -class group of Kn,m in this paper. When =2, we determine the structure of the 2-class group of Kn,m for all (n,m)∈ Z≥ 02 in the case p=2 or p 3, 58, and for (n,m)=(n,0), (n,1) or (1,m) in the case p 716, eneralizing the results of Parry about the 2-divisibility of the class number of K2,0. We also obtain results about the -class group of Kn,m when is odd and in particular =3. The main tools we use are class field theory, including Chevalley's ambiguous class number formula and its generalization by Gras, and a stationary result about the -class groups in the 2-dimensional Kummer tower \Kn,m\.