Classification of the maximal subalgebras of exceptional Lie algebras over fields of good characteristic

Abstract

Let G be an exceptional simple algebraic group over an algebraically closed field k and suppose that the characteristic p of k is a good prime for G. In this paper we classify the maximal Lie subalgebras m of the Lie algebra g= Lie(G). Specifically, we show that one of the following holds: m= Lie(M) for some maximal connected subgroup M of G, or m is a maximal Witt subalgebra of g, or m is a maximal exotic semidirect product. The conjugacy classes of maximal connected subgroups of G are known thanks to the work of Seitz, Testerman and Liebeck--Seitz. All maximal Witt subalgebras of g are G-conjugate and they occur when G is not of type E6 and p-1 coincides with the Coxeter number of G. We show that there are two conjugacy classes of maximal exotic semidirect products in g, one in characteristic 5 and one in characteristic 7, and both occur when G is a group of type E7.