Galois cohomologies of real reductive groups and real forms of simple Lie algebras

The theory of Vogan diagrams, which are Dynkin diagrams with an overlay of certain additional information, allows one to give a rapid classification of finitedimensional real semisimple Lie algebras and to make use of this classification in practice. This paper develops a corresponding theory of Vog

A Vogan diagram is actually a Dynkin diagram with some additional structure. This paper develops theory of Vogan diagrams for "almost compact" real forms of indecomposable nontwisted affine Kac-Moody Lie algebras. Here, the equivalence classes of Vogan diagrams are in one-one correspondence with the

We exhibit some classes of Lie groups, and a set of open assumptions on these groups, such that, under these assumptions, the 'controllability rank condition' becomes a necessary and sufficient condition for controllability of right invariant systems. condition when .L#(A, B), the Lie algebra gener