On σ-quasinormal subgroups of finite groups

Abstract

Let G be a finite group and σ =\σi | i∈ I\ some partition of the set of all primes P, that is, σ =\σi | i∈ I \, where P=i∈ I σi and σi σj= for all i j. We say that G is σ-primary if G is a σ i-group for some i. A subgroup A of G is said to be: σ-subnormal in G if there is a subgroup chain A=A0 ≤ A1 ≤ ·s ≤ An=G such that either Ai-1 Ai or Ai/(Ai-1)Ai is σ-primary for all i=1, …, n, modular in G if the following conditions hold: (i) X, A Z = X, A Z for all X ≤ G, Z ≤ G such that X ≤ Z, and (ii) A, Y Z = A, Y Z for all Y ≤ G, Z ≤ G such that A ≤ Z. In this paper, a subgroup A of G is called σ-quasinormal in G if L is modular and σ-subnormal in G. We study σ-quasinormal subgroups of G. In particular, we prove that if a subgroup H of G is σ-quasinormal in G, then for every chief factor H/K of G between HG and HG the semidirect product (H/K) (G/CG(H/K)) is σ-primary.