Uniform boundedness for algebraic groups and Lie groups

Abstract

Let G be a semisimple linear algebraic group over a field k and let G+(k) be the subgroup generated by the subgroups Ru(Q)(k), where Q ranges over all the minimal k-parabolic subgroups Q of G. We prove that if G+(k) is bounded then it is uniformly bounded. Under extra assumptions we get explicit bounds for (G+(k)): we prove that if k is algebraically closed then (G+(k))≤ 4\, rank\,G, and if G is split over k then (G+(k))≤ 28\, rank\,G. We deduce some analogous results for real and complex semisimple Lie groups.