3-class field towers with 2 or 3 stages

Abstract

For quadratic fields \(k=Q(d)\) with discriminant \(d\), \(3\)-class group \(Cl3(k) (Z/3Z)2\), and four simple \(3\)-principalization types \((k)∈ (1122),(3122),(1231),(2231)\), we establish necessary and sufficient conditions for the Galois group \(S=Gal(F3∞(k)/k)\) of the unramified Hilbert \(3\)-class field tower of \(k\) to coincide with the Galois group \(M=Gal(F32(k)/k)\) of the maximal metabelian unramified \(3\)-extension of \(k\). In the case of non-coincidence, we study the path between \(M\) and \(S\) in the descendant tree of the elementary bicyclic \(3\)-group \((Z/3Z)2\). For two complex \(3\)-principalization types \((k)∈ (2122),(4231)\), we show that infinitely many non-metabelian possible Galois groups \(S=Gal(F3∞(k)/k)\) with presumably unbounded derived length \(dl(S)\) share a common metabelianization \(M=S/S\), whence only partial criteria can be stated. Minimal discriminants \(d>0\) with assigned simple \(3\)-principalization type \((k)\) and fixed length \(3(k)∈ 2,3\) of the \(3\)-class field tower are determined experimentally for nilpotency class \(cl(M)∈ 5,7,9,11\) under assumption of the generalized Riemann hypothesis.