2. Algebraization of Hamiltonian systems on orbits of Lie groups

S&mitted hy Gorg IIeinig ABSTHACT We prove that the Lie algebra L' : [K,, K\_] = SK,,, [K,,, K,] = \*K,, where s is a real number, K,, is a Hermitian diagonal operator, and K+= K? has nontrivial matrix representations if and only if s > 0.

Random walk on the chambers of hyperplane arrangements is used to define a family of card shuffling measures H W x for a finite Coxeter group W and real x = 0. By algebraic group theory, there is a map from the semisimple orbits of the adjoint action of a finite group of Lie type on its Lie algebra