Paley--Wiener Theorems for the U(n)--spherical transform on the Heisenberg group

Abstract

We prove several Paley--Wiener-type theorems related to the spherical transform on the Gelfand pair (Hn U(n),U(n)), where Hn is the 2n+1-dimensional Heisenberg group. Adopting the standard realization of the Gelfand spectrum as the Heisenberg fan in R2, we prove that spherical transforms of U(n)--invariant functions and distributions with compact support in Hn admit unique entire extensions to C2, and we find real-variable characterizations of such transforms. Next, we characterize the inverse spherical transforms of compactly supported functions and distributions on the fan, giving analogous characterizations.