Paley-Wiener Theorem for Line Bundles over Compact Symmetric Spaces and New Estimates for the Heckman-Opdam Hypergeometric Functions

TL;DR

This paper establishes a Paley-Wiener theorem for line bundles over compact symmetric spaces and extends estimates for Heckman-Opdam hypergeometric functions, broadening the understanding of Fourier transforms in this context.

Contribution

It proves a new Paley-Wiener theorem for homogeneous line bundles over compact symmetric spaces and generalizes hypergeometric function estimates for broader multiplicity parameters.

Findings

Characterization of functions with small support via Fourier transform properties

Generalized Opdam's estimate for hypergeometric functions with non-positive multiplicities

Expanded domain of validity for hypergeometric function estimates

Abstract

Paley-Wiener type theorems describe the image of a given space of functions, often compactly supported functions, under an integral transform, usually a Fourier transform on a group or homogeneous space. Several authors have studied Paley-Wiener type theorems for Euclidean spaces, Riemannian symmetric spaces of compact or non-compact type as well as affine Riemannian symmetric spaces. In this article we prove a Paley-Wiener theorem for homogeneous line bundles over a compact symmetric space $U/K$. The Paley-Wiener theorem characterizes f with sufficiently small support in terms of holomorphic extendability and exponential growth of their Fourier transforms. An important tool is a generalization of Opdam's estimate for the hypergeometric functions for multiplicity functions that are not necessarily positive. The domain where this estimate is valid is also bigger. This is done in an appendix.