On the Galois groups of the 2-class towers of some imaginary quadratic fields (Q884534)

Let \(k= \mathbb Q(\sqrt{-2379})\) and \(k^{nr,2}\) be the maximal unramified 2-extension of \(k\). In [\textit{M. R. Bush}, J. Number Theory 100, No. 2, 313--325 (2003; Zbl 1039.11091)] to show that \(k^{nr, 2}/k\) is finite, it is given eight possible presentations for the group \(G= \text{Gal}(k^{nr,2}/k)\) of order \(2^{11}\). In the present paper, four of these possibilities are eliminated.