Action of w0 on VL for orthogonal and exceptional groups

Abstract

In this note, we present some results that partially answer the following question. Let G be a simple real Lie group; what is the set of representations V of G in which the longest element w0 of the restricted Weyl group W acts nontrivially on the subspace VL of V formed by vectors that are invariant by L, the centralizer of a maximal split torus of G? We give a conjectural answer to that question, as well as the experimental results that back this conjecture, when G is either an orthogonal group (real form of SOn(C) for some n) or an exceptional group.