On the orbits of a Borel subgroup in abelian ideals

Abstract

Let B be a Borel subgroup of a semisimple algebraic group G, and let a be an abelian ideal of b=Lie(B). The ideal a is determined by certain subset a of positive roots, and using a we give an explicit classification of the B-orbits in a and a*. Our description visibly demonstrates that there are finitely many B-orbits in both cases. We also describe the Pyasetskii correspondence between the B-orbits in a and a* and the invariant algebras [ a]U and [ a*]U, where U=(B,B). As an application, the number of B-orbits in the abelian nilradicals is computed. We also discuss related results of A.Melnikov and others for classical groups and state a general conjecture on the closure and dimension of the B-orbits in the abelian nilradicals, which exploits a relationship between between B-orbits and involutions in the Weyl group.