On the length of finite groups and of fixed points

Abstract

The generalized Fitting height of a finite group G is the least number h=h*(G) such that F*h(G)=G, where the F*i(G) is the generalized Fitting series: F*1(G)=F*(G) and F*i+1(G) is the inverse image of F*(G/F*i(G)). It is proved that if G admits a soluble group of automorphisms A of coprime order, then h*(G) is bounded in terms of h* (CG(A)), where CG(A) is the fixed-point subgroup, and the number of prime factors of |A| counting multiplicities. The result follows from the special case when A= is of prime order, where it is proved that F*(CG( ))≤slant F*9(G). The nonsoluble length λ (G) of a finite group G is defined as the minimum number of nonsoluble factors in a normal series each of whose factors either is soluble or is a direct product of nonabelian simple groups. It is proved that if A is a group of automorphisms of G of coprime order, then λ (G) is bounded in terms of λ (CG(A)) and the number of prime factors of |A| counting multiplicities.