On the p-ranks of class groups of certain Galois extensions

Abstract

Let p be an odd prime, let N be a prime with N 1 p, and let ζp be a primitive p-th root of unity. We study the p-rank of the class group of Q(ζp, N1/p) using Galois cohomological methods and obtain an exact formula for the p-rank in terms of the dimensions of certain Selmer groups. Using our formula, we provide a numerical criterion to establish upper and lower bounds for the p-rank, analogous to the numerical criteria provided by F.~Calegari--M.~Emerton and K.~Schaefer--E.~Stubley for the p-ranks of the class group of Q(N1/p). In the case p=3, we use Redei matrices to provide a numerical criterion to exactly calculate the 3-rank, and also study the distribution of the 3-ranks as N varies through primes which are 4,7 9.