Reduced Control Systems on Symmetric Lie Algebras

Abstract

For a symmetric Lie algebra g= k p we consider a class of bilinear or more general control-affine systems on p defined by a drift vector field X and control vector fields adki for ki∈ k such that one has fast and full control on the corresponding compact group K. We show that under quite general assumptions on X such a control system is essentially equivalent to a natural reduced system on a maximal Abelian subspace a⊂eq p, and likewise to related differential inclusions defined on a. We derive a number of general results for such systems and as an application we prove a simulation result with respect to the preorder induced by the Weyl group action.