Rook placements in G2 and F4 and associated coadjoint orbits

Abstract

Let n be a maximal nilpotent subalgebra of a simple complex Lie algebra with root system . A subset D of the set + of positive roots is called a rook placement if it consists of roots with pairwise non-positive scalar products. To each rook placement D and each map from D to the set C× of nonzero complex numbers one can naturally assign the coadjoint orbit D, in the dual space n*. By definition, D, is the orbit of fD,, where fD, is the sum of root covectors eα* multiplied by (α), α∈ D. (In fact, almost all coadjoint orbits studied at the moment have such a form for certain D and .) It follows from the results of Andr\`e that if 1 and 2 are distinct maps from D to C× then D,1 and D,2 do not coincide for classical root systems . We prove that this is true if is of type G2, or if is of type F4 and D is orthogonal.