The smoothness of convolutions of orbital measures on complex Grassmannian symmetric spaces

Abstract

It is well known that if G/K is any irreducible symmetric space and μ a is a continuous orbital measure supported on the double coset KaK, then the convolution product, μ ak, is absolutely continuous for some suitably large k≤ G/K. The minimal value of k is known in some symmetric spaces and in the special case of groups or rank one symmetric spaces it has even been shown that μ ak belongs to the smaller space L2 for some k. Here we prove that this L2 property holds for all the compact, complex Grassmanian symmetric spaces, % SU(p+q)/S(U(p)× U(q)). Moreover, for the orbital measures at a dense set of points a, we prove that μ a2∈ L2 (or μ a3∈ L2 if p=q).