The index of subalgebras and strange coadjoint orbits

Abstract

For an algebraic group Q with Lie\, Q= q, we develop a method for estimating the index of a subalgebra h in q via the use of coadjoint Q-orbits in q*. Let qξ denote the stabiliser of ξ∈ q*. In the special case when qξ h= q, our estimate implies that ind\, h=0. Using our theory, we also answer a question of Duflo. An orbit Q·η⊂ q* is said to be strange, if qη h= q for some h. In the second part of the paper, we study strange orbits for a semisimple algebra g. It is shown that an orbit O⊂ g g* is strange whenever the complexity of O is at most 1. Furthermore, if S⊂ g is a sheet containing a strange nilpotent orbit, then all orbits in S are strange. We also show that strange orbits in sln are not as sparse, as one might expect, and discuss some conjectures on strange orbits.