On some products of finite groups
Abstract
A classical result of Baer states that a finite group G which is the product of two normal supersoluble subgroups is supersoluble if and only if G' is nilpotent. In this article we show that if G=AB is the product of supersoluble (respectively, w -supersoluble) subgroups A and B , A is normal in G , B permutes with every maximal subgroup of each Sylow subgroup of A , then G is supersoluble (respectively, w -supersoluble) provided that G' is nilpotent. We also investigate products of subgroups defined above when A B=1 and obtain more general results.
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