Index-\(p\) abelianization data of \(p\)-class tower groups

Abstract

Given a fixed prime number \(p\), the multiplet of abelian type invariants of the \(p\)-class groups of all unramified cyclic degree \(p\) extensions of a number field \(K\) is called its IPAD (index-\(p\) abelianization data). These invariants have proved to be a valuable information for determining the Galois group \(Gp2\) of the second Hilbert \(p\)-class field and the \(p\)-capitulation type \(\) of \(K\). For \(p=3\) and a number field \(K\) with elementary \(p\)-class group of rank two, all possible IPADs are given in the complete form of several infinite sequences. Iterated IPADs of second order are used to identify the group \(Gp∞\) of the maximal unramified pro-\(p\) extension of \(K\).