Notes on finite totally 2-closed permutation groups

Abstract

Let N be a normal subgroup of a finite group G. For a faithful N-set , applying the university embedding theorem one can construct a faithful G-set . In this short note, it is proved that if the 2-closure of N in is equal to N, then the 2-closure of N in is also equal to N; in addition, it is proved that any abelian normal subgroup of a finite totally 2-closed group is cyclic; finally, it is proved that if a finite nilpotent group is a direct of two nilpotent subgroups where the two factors have coprime orders and both of them are totally 2-closed then G is totally 2-closed. As corollaries, several well-known results on finite totally 2-closed groups are reproved in more simple ways.