Controllability of control systems simple Lie groups and the topology of flag manifolds

Abstract

Let S be subsemigroup with nonempty interior of a complex simple Lie group G. It is proved that S=G if S contains a subgroup G(α) ≈ Sl(2,C) generated by the g α, where g%α is the root space of the root α . The proof uses the fact, proved before, that the invariant control set of S is contractible in some flag manifold if S is proper, and exploits the fact that several orbits of G(α) are 2-spheres not null homotopic. The result is applied to revisit a controllability theorem and get some improvements.