On Hσ-permutably embedded and Hσ-subnormaly embedded subgroups of finite groups

Abstract

Let G be a finite group. Let σ =\σi | i∈ I\ be a partition of the set of all primes P and n an integer. We write σ (n) =\σi |σi π (n) \, σ (G) =σ (|G|). A set H of subgroups of G is said to be a complete Hall σ -set of G if every member of H \1\ is a Hall σi-subgroup of G for some σi and H contains exact one Hall σi-subgroup of G for every σi∈ σ (G). A subgroup A of G is called: (i) a σ-Hall subgroup of G if σ (|A|) σ (|G:A|)=; (ii) σ-permutable in G if G possesses a complete Hall σ-set H such that AHx=HxA for all H∈ H and all x∈ G. We say that a subgroup A of G is Hσ-permutably embedded in G if A is a σ-Hall subgroup of some σ-permutable subgroup of G. We study finite groups G having an Hσ-permutably embedded subgroup of order |A| for each subgroup A of G. Some known results are generalized.