The local structure theorem, the non-characteristic 2 case

Abstract

Let p be a prime, G a finite Kp-group, S a Sylow p-subgroup of G and Q be a large subgroup of G in S. The aim of the Local Structure Theorem is to provide structural information about subgroups L with S ≤ L, Op(L) = 1 and L ≤ NG(Q). There is, however, one configuration where no structural information about L can be given using the methods in the proof of the Local Structure Theorem. In this paper we show that for p=2 this hypothetical configuration cannot occur. We anticipate that our theorem will be used in the programme to revise the classification of the finite simple groups.