Analytic continuation of resolvent kernels on noncompact symmetric spaces

We give two equivalent analytic continuations of the Minakshisundaram᎐Pleijel Ž . zeta function z for a Riemannian symmetric space of the compact type of U r K rank one UrK. First we prove that can be written as Ž . function for GrK the noncompact symmetric space dual to UrK , and F z is an Ž Ž . .

Let G be a connected noncompact semisimple Lie group with finite center and real rank one. Fix a maximal subgroup K. We consider K bi-invariant functions f on G and their spherical transform where . \* denote the elementary spherical functions on GÂK and \* 0. We consider the maximal operators and

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