Minimal supplements in normalizers of maximal tori of F4(q)

Abstract

Let G be a finite group of Lie type F4 with the Weyl group W. For every maximal torus T of G, we find the minimal order of a supplement to T in its algebraic normalizer N(G,T). In particular, we obtain all maximal tori having complements in N(G,T). Assume that T corresponds to an element w of W. We find the minimal order of lifts of w to N(G,T).