A method to find generators of a semi-simple Lie group via the topology of its flag manifolds

Abstract

In this paper we continue to develop the topological method started in Santos-San Martin ariasm to get semigroup generators of semi-simple Lie groups. Consider a subset ⊂ G that contains a semi-simple subgroup G1 of G. Then generates G if Ad( ) generates a Zariski dense subgroup of the algebraic group Ad( G) . The proof is reduced to check that some specific closed orbits of G1 in the flag manifolds of G are not trivial in the sense of algebraic topology. Here, we consider three different cases of semi-simple Lie groups G and subgroups G1⊂ G.