Some results on ℚ-groups

A finite group G whose irreducible characters are rational valued is called a ℚ-group. In this paper we will be concerned with the structure of a finite ℚ-group that contains a strongly embedded subgroup and the structure of a finite ℚ-group satisfying the property that none of its sections is isomorphic to $$\mathbb{S}_4 $$ .

The structure of an infinite Sylow subgroup in some periodic Shunkov groups

We study periodic groups such that the normaliser of any finite non-trivial subgroup of such a group is almost layer-finite. The class of groups satisfying this condition is rather wide and includes the free Burnside groups of odd period which is greater than 665 and the groups constructed by A. Yu. Olshanskii.We consider the classical question: how the properties of the system of subgroups of a group influence on the properties of the group? We show that almost layer-finiteness is transferred on the group G from the normalisers of non-trivial finite subgroups of the group G if G is periodic conjugately biprimitively finite group with a strongly embedded subgroup.We study the structure of an infinite Sylow 2-subgroup in a periodic conjugately biprimitively finite group in the case that the normaliser of any finite non-trivial subgroup is almost layer-finite.The results of the paper can be useful in the study of the class of periodic conjugately biprimitively finite groups (periodic Shunkov groups).