On homogeneous spaces of rank one

If f # L 1 (d+) is harmonic in the space GÂK, where + is a radial measure with +(GÂK)=1, we have, by the mean value property f = f V +. Conversely, does this mean value property imply that f is harmonic ? In this paper we give a new and natural proof of a result obtained by P. Ahern, A. Flores, W. R

In this paper we investigate L 2 boundedness properties of the Poisson transform associated to a symmetric space of real rank one and prove a related Planchereltype theorem.

Let X=GÂK be a noncompact symmetric space of real rank one. The purpose of this paper is to investigate L p boundedness properties of a certain class of radial Fourier integral operators on the space X. We will prove that if u { is the solution at some fixed time { of the natural wave equation on X

Now 6 and rjt are open, hence r] is open. Then ' p is open because i, and i, are topological. c]

We study properties of C\*-algebraic deformations of homogeneous spaces G/C which are equivariant in the sense that they preserve the natural action of G by left translation. The center is shown to be isomorphic to C(G/G 0 r ) for a certain subgroup G 0 r of G, and there is a 1-1 correspondence betw