Finite groups with systems of K-F-subnormal subgroups

Abstract

Let F be a class of group. A subgroup A of a finite group G is said to be K-F-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 ∈ F for all i=1, … , n. A formation F is said to be K-lattice provided in every finite group G the set of all its K-F-subnormal subgroups forms a sublattice of the lattice of all subgroups of G. In this paper we consider some new applications of the theory of K-lattice formations. In particular, we prove the following Theorem A. Let F be a hereditary K-lattice saturated formation containing all nilpotent groups. (i) If every F-critical subgroup H of G is K-F-subnormal in G with H/F(H)∈ F, then G/F(G)∈ F. (ii) If every Schmidt subgroup of G is K-F-subnormal in G, then G/GF is abelian.