On the length of a finite group and of its 2-generator subgroups

Abstract

The nonsoluble length λ(G) of a finite group G is defined as the minimum number of nonsoluble factors in a normal series of G each of whose quotients either is soluble or is a direct product of nonabelian simple groups. The generalized Fitting height of a finite group G is the least number h=h*(G) such that F*h(G)=G, where F*1(G)=F*(G) is the generalized Fitting subgroup, and F*i+1(G) is the inverse image of F*(G/F*i(G)). In the present paper we prove that if λ (J)≤ k for every 2-generator subgroup J of G, then λ(G)≤ k. It is conjectured that if h*(J)≤ k for every 2-generator subgroup J, then h*(G)≤ k. We prove that if h*( x,xg)≤ k for all x,g∈ G such that x,xg is soluble, then h*(G) is k-bounded.