Finite groups whose n-maximal subgroups are σ-subnormal

Abstract

Let σ =\σi | i∈ I\ be some partition of the set of all primes P. A set H of subgroups of G is said to be a complete Hall σ -set of G if every member 1 of H is a Hall σi-subgroup of G, for some i∈ I, and H contains exact one Hall σi-subgroup of G for every σi∈ σ (G). A subgroup H of G is said to be: σ-permutable or σ-quasinormal in G if G possesses a complete Hall σ-set set H such that HAx=AxH for all A∈ H and x∈ G: σ-subnormal in G if there is a subgroup chain A=A0 ≤ A1 ≤ ·s ≤ At=G such that either Ai-1 Ai or Ai/(Ai-1)Ai is a finite σi-group for some σi∈ σ for all i=1, … t. If each n-maximal subgroup of G is σ-subnormal (σ-quasinormal, respectively) in G but, in the case n > 1, some (n-1)-maximal subgroup is not σ-subnormal (not σ-quasinormal, respectively)) in G, we write mσ(G)=n (mσ q(G)=n, respectively). In this paper, we show that the parameters mσ(G) and mσ q(G) make possible to bound the σ-nilpotent length \ lσ(G) (see below the definitions of the terms employed), the rank r(G) and the number |π (G)| of all distinct primes dividing the order |G| of a finite soluble group G. We also give conditions under which a finite group is σ-soluble or σ-nilpotent, and describe the structure of a finite soluble group G in the case when mσ(G)=|π (G)|. Some known results are generalized.