G-complete reducibility and the exceptional algebraic groups

Abstract

Let G=G(K) be a simple algebraic group defined over an algebraically closed field K of characteristic p>0. A subgroup X of G is said to be G-completely reducible if, whenever it is contained in a parabolic subgroup of G, it is contained in a Levi subgroup of that parabolic. A subgroup X of G is said to be G-irreducible if X is in no parabolic subgroup of G; and G-reducible if it is in some parabolic of G. In this thesis, we consider the case that G is of exceptional type. When G is of type G2 we find all conjugacy classes of closed, connected, reductive subgroups of G. When G is of type F4 we find all conjugacy classes of closed, connected, reductive G-reducible subgroups X of G. Thus we also find all non-G-completely reducible closed, connected, reductive subgroups of G. When X is closed, connected and simple of rank at least two, we find all conjugacy classes of G-irreducible subgroups X of G. Together with the work of Amende in [Ame05] classifying irreducible subgroups of type A1 this gives a complete classification of the simple subgroups of G. Amongst the classification of subgroups of G=F4(K) we find infinite collections of subgroups X of G which are maximal amongst all reductive subgroups of G but not maximal subgroups of G; thus they are not contained in any maximal reductive subgroup of G. The connected, semisimple subgroups contained in no maximal reductive subgroup of G are of type A1 when p=3 and of semisimple type A12 or A1 when p=2. Some of those which occur when p=2 act indecomposably on the 26-dimensional irreducible representation of G. We also use this classification to find all subgroups of G=F4 which are generated by short root elements of G, by utilising and extending the results of [LS94].