Finite groups with given normalizers of Sylow subgroups (Q1344599)

The paper deals with the investigation of finite groups with given properties of the Sylow subgroups. M. Bianchi, A. Gillio Berta Mauri and P. Hauck proved in 1986 that if the normalizer of any non-trivial Sylow subgroup of a finite group \(G\) is nilpotent, then \(G\) is nilpotent. V. Fedri and L. Serena noticed in 1988 that the formation \(\mathcal U\) of all supersoluble finite groups has no such property. The formation \(\mathcal N\) of all finite nilpotent groups is an \(S\)-closed local \(\check S\)- formation and \(\mathcal U\) is not an \(\check S\)-formation. Therefore, the question arises: what are the \(S\)-closed local \(\check S\)-formations with the property mentioned above? In this paper, this question is decided completely in the class of soluble groups.