On factorized groups with permutable subgroups of factors

Abstract

The subgroups A and B of a group~G are called msp-permutable, if the following statements hold: AB~is a subgroup of~G; the subgroups P and Q are mutually permutable, where P~is an arbitrary Sylow p-subgroup of~A and Q~is an arbitrary Sylow q-subgroup of~B, p≠ q. In the present paper, we investigate groups that factorized by two msp-permutable subgroups. In particular, the supersolubility of the product of two supersoluble msp-permutable subgroups is proved.