Wonderful Compactification of a Cartan Subalgebra of a Semisimple Lie Algebra

Abstract

Let h be a Cartan subalgebra of a complex semisimple Lie algebra g. We define a compactification h of h, which is analogous to the closure H of the corresponding maximal torus H in the adjoint group of g in its wonderful compactification, which was introduced and studied by De Concini and Procesi DCP. We observe that h is a matroid Schubert variety and prove that the irreducible components of the boundary h - h of h are divisors indexed by root system data. We prove that h is a normal variety and find an affine paving of h, where the strata are given by the orbits of h. We show that the strata of h correspond bijectively to subspaces of the corresponding Coxeter hyperplane arrangement studied by Orlik and Solomon, and prove that the associated posets are isomorphic. As a consequence, we express the Betti numbers of h in terms of well-known combinatorial invariants in the classical cases. We show that the Weyl group W acts on h, and describe H( h, C) as a representation of W, and compute the cup product for H( h, Z).