Structure of an exotic 2-local subgroup in E7(q)

Abstract

Let G be the finite simple group of Lie type G = E7(q), where q is an odd prime power. Then G is an index 2 subgroup of the adjoint group Gad, which is also denoted by Gad = Inndiag(G) and known as the group of inner-diagonal automorphisms. It was proven by Cohen--Liebeck--Saxl--Seitz (1992) that there is an elementary abelian 2-subgroup E of order 4 in Gad, such that NGad(E)/CGad(E) Sym3, and CGad(E) = E × Inndiag(D4(q)). Furthermore, such an E is unique up to conjugacy in Gad. It is known that NG(E) is always a maximal subgroup of G, and NGad(E) is a maximal subgroup of Gad unless NGad(E) ≤ G. In this note, we describe the structure of NG(E). It turns out that NG(E) = NGad(E) if and only if q 1 8.