The imaginary abelian number fields with class numbers equal to their genus class numbers (Q5939713)

In [Manuscr. Math. 91, 343-352 (1996; Zbl 0869.11089)], \textit{S. Louboutin} proved that there are only finitely many imaginary abelian number fields \(K\) whose class numbers \(h_K\) coincide with their genus class numbers \(g_K\), and determined all cyclic fields of degree \(\geq 4\) with this property (there are \(77\) of them). In this paper, the authors find all non-cyclic number fields with \(h_K = g_K\): there are \(347\) such fields, their degree is \(\leq 24\), the maximal conductor is \(13 \cdot 31 \cdot 163\), and the class numbers are \(1\), \(2\) or \(4\).