Almost Everywhere Convergence of Prolate Spheroidal Series

Abstract

In this paper, we show that the expansions of functions from Lp-Paley-Wiener type spaces in terms of the prolate spheroidal wave functions converge almost everywhere for 1<p<∞, even in the cases when they might not converge in Lp-norm. We thereby consider the classical Paley-Wiener spaces PWcp⊂ Lp(R) of functions whose Fourier transform is supported in [-c,c] and Paley-Wiener like spaces Bα,cp⊂ Lp(0,∞) of functions whose Hankel transform Hα is supported in [0,c].As a side product, we show the continuity of the projection operator Pcα f:=Hα([0,c]· Hα f) from Lp(0,∞) to Lq(0,∞), 1<p≤ q<∞.