On involutions in the Weyl group and B-orbit closures in the orthogonal case

Abstract

We study coadjoint B-orbits on n*, where B is a Borel subgroup of a complex orthogonal group G, and n is the Lie algebra of the unipotent radical of B. To each basis involution w in the Weyl group W of G one can assign the associated B-orbit w. We prove that, given basis involutions σ, τ in W, if the orbit σ is contained in the closure of the orbit τ then σ is less than or equal to τ with respect to the Bruhat order on W. For a basis involution w, we also compute the dimension of w and present a conjectural description of the closure of w.