Classification of Aq(λ) modules by their Dirac cohomology for type D, G2 and sp(2n,R)

Abstract

Let G be a connected real reductive group with maximal compact subgroup K of the same rank as G. In the recent paper of Huang, Pandzi\'c and Vogan, it was shown that the admissible --stable parabolic subalgebras q of g are in one-to-one correspodence with the faces of W intersecting the k--dominant Weyl chamber and that Aq(0)--modules can be classified by their Dirac cohomology in geometric terms. They described in detail the cases when g0 is of type A, B, F and C except for g0 = sp(2n, R). We will describe faces corresponding to Aq(0)--modules for g0 = sp(2n, R) and for g0 of type D and G2.