A Class of Unbounded Fourier Integral Operators

In this paper we develop elements of the global calculus of Fourier integral operators in R n under minimal decay assumptions on phases and amplitudes. We also establish global weighted Sobolev L 2 estimates for a class of Fourier integral operators that appears in the analysis of global smoothing p

## Abstract Let __H__(U) be the space of all analytic functions in the unit disk U, and let co__E__ denote the convex hull of the set __E__ ⊂ ℂ. If __K__ ⊂ __H__(U) then the operator I : __K__ → __H__(U) is said to be an __averaging operator__ if For a function __h__ ∈ __A__ ⊂ __H__(U) we will det

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

j makes sense. If ⍀ is bounded then, with the understanding that Z 0 [ л, Ž . Ž . A3 is trivially satisfied with s ⍀, s л, and m s 0, and iii then imposes no restriction on the kernel k.