A generalisation of Schenkman's theorem

Abstract

Let G be a finite group and let F be a hereditary saturated formation. We denote by ZF(G) the product of all normal subgroups N of G such that every chief factor H/K of G below N is F-central in G, that is, \[ (H/K) (G/CG(H/K)) ∈ F. \]A subgroup A ≤ G is said to be F-subnormal in the sense of Kegel, or K-F-subnormal in G, if there is a subgroup chain \[ A = A0 ≤ A1 ≤ … ≤ An = G \] such that either Ai-1 Ai or Ai / (Ai-1)Ai ∈ F for all i = 1, … , n. In this paper, we prove the following generalisation of Schenkman's Theorem on the centraliser of the nilpotent residual of a subnormal subgroup: Let F be a hereditary saturated formation and let S be a K-F-subnormal subgroup of G. If ZF(E) = 1 for every subgroup E of G such that S ≤ E then CG(D) ≤ D, where D = SF is the F-residual of S.