Groups which are almost groups of Lie type in characteristic p

Abstract

For a prime p, a p-subgroup of a finite group G is said to be large if and only if Q= F*(NG(Q)) and, for all 1 ≠ U Z(Q), NG(U) NG(Q). In this article we determine those groups G which have a large subgroup and which in addition have a proper subgroup H containing a Sylow p-subgroup of G with F*(H) a group of Lie type in characteristic p and rank at least 2 (excluding 3(pa)) and CH(z) soluble for some z ∈ Z(S). This work is part of a project to determine the groups G which contain a large p-subgroup.