Length parameters of finite groups and their Hall subgroups

Abstract

Let π be a set of primes containing 2 and an odd prime p. It is proved that if a finite group G has a Hall π-subgroup H, then the non-p-soluble length of G is bounded above by the generalized Fitting height of H. The proof uses the fact, obtained in [4] using the classification of finite simple groups, that a finite simple group of order divisible by p cannot have a nilpotent Hall \2,p\-subgroup. As a corollary, it is proved that if in addition H is soluble, then the non-p-soluble length of G is bounded above by 2l2(H)+1, where l2(H) is the 2-length of H.