Invariant spherical distributions of discrete series on real semisimple symmetric spaces \(G_ C/G_ R\) (Q752198)

Let \(G_ R\) be a real semisimple Lie group with a simply connected complexification \(G_ C\) and suppose that (\({\mathfrak g}_ C,{\mathfrak g}_ R)\) admits a compact Cartan subalgebra \({\mathfrak a}_ 1\). Let \(X=G_ C/G_ R\) and \(A_ 1'\) the set of regular elements in \(A_ 1=Z_ X({\mathfrak a}_ 1)\). The author states that a class of invariant spherical distributions on X supported on the closure \(G_ R[A_ 1']\) are tempered, and they correspond to the character of a discrete series of X and the one of a principal series of \(G_ C\). This is an announcement and has no proofs.