Coadjoint orbits of low dimension for nilradicals of Borel subalgebras in classical types

Abstract

Let g be a classical simple Lie algebra over an algebraically closed field F of characteristic zero or large enough, and let n be a maximal nilpotent subalgebra of g. The main tool in representation theory of n is the orbit method, which classifies primitive ideals in the universal enveloping algebra U( n) and unitary representations of the unipotent group N=( n) in terms of coadjoint orbits on the dual space n*. In the paper, we describe explicitly coadjoint orbits of low dimension for n as above. The answer is given in terms of subsets of positive roots. As a corollary, we provide a way to calculate the number of irreducible complex representations of dimensions q, q2 and q3 for a maximal unipotent subgroup N(q) in a classical Chevalley group G(q) over a finite field Fq with q elements. It turned out that this number is a polynomial in q-1 with nonnegative integer coefficients, which agrees with Isaac's conjecture.