Regular Functions on the K-Nilpotent Cone

Abstract

Let G be a complex reductive algebraic group with Lie algebra g and let GR be a real form of G with maximal compact subgroup KR. Associated to GR is a K × C×-invariant subvariety Nθ of the (usual) nilpotent cone N ⊂ g*. In this article, we will derive a formula for the ring of regular functions C[Nθ] as a representation of K × C×. Some motivation comes from Hodge theory. In arXiv:1206.5547, Schmid and Vilonen use ideas from Saito's theory of mixed Hodge modules to define canonical good filtrations on many Harish-Chandra modules (including all standard and irreducible Harish-Chandra modules). Using these filtrations, they formulate a conjectural description of the unitary dual. If GR is split, and X is the spherical principal series representation of infinitesimal character 0, then conjecturally gr(X) C[Nθ] as representations of K × C×. So a formula for C[Nθ] is an essential ingredient for computing Hodge filtrations.