Weber's class number problem and p-rationality in the cyclotomic Z-extension of Q

Abstract

Let K be the Nth layer in the cyclotomic Z-extension Q. Many authors (Aoki, Fukuda, Horie, Ichimura, Inatomi, Komatsu, Miller, Morisawa, Nakajima, Okazaki, Washington,\,…) analyse the behavior of the p-class groups CK. We revisit this problem, in a more conceptual form, since computations show that the p-torsion group TK of the Galois groups of the maximal abelian p-ramified pro-p-extension of K (Tate--Shafarevich group of K) is often non-trivial; this raises questions since \# TK = \# CK\, \# RK where RK is the normalized p-adic regulator. We give a new method testing TK 1 (Theorem 4.6, Table 6.2) and characterize the p-extensions F of K in Q with CF 1 (Theorem 7.5 and Corollary 7.6). We publish easy to use programs, justifying again the eight known examples, and allowing further extensive computations.