Cyclicity of the 2-class group of the first Hilbert 2-class field of some number fields

Abstract

Let k be a real quadratic number field. Denote by Cl2(k) its 2-class group and by k2(1) (resp. k2(2)) its first (resp. second) Hilbert 2-class field. The aim of this paper is to study, for a real quadratic number field whose discriminant is divisible by one prime number congruent to 3 modulo 4, the metacyclicity of G=Gal(k2(2)/k) and the cyclicity of Gal(k2(2)/k2(1)) whenever the rank of Cl2(k) is 2, and the 4-rank of Cl2(k) is 1.