Unitarization of the Horocyclic Radon Transform on Symmetric Spaces

Abstract

We consider the Radon transform for a dual pair (X,), where X=G/K is a noncompact symmetric space and is the space of horocycles of X. We address the unitarization problem that was considered (and solved in some cases) by Helgason, namely the determination of a pseudo-differential operator such that the pre-composition with the Radon transform extends to a unitary operator Q L2(X) L2(), where L2() is a closed subspace of L2() which accounts for the Weyl symmetries. Furthermore, we show that the unitary extension intertwines the quasi-regular representations of G on L2(X) and L2().