Recovering functions from the Paley-Wiener amalgam space
arXiv:1311.5169
Abstract
In this paper we show that functions from the Paley-Wiener amalgam space $(PW,l^1)=\{f\in L^2(\mathbb{R}): \sum\|\hat{f}(ξ+2Ïm) \|_{L^2([-Ï,Ï])} < \infty\}$ enjoy similar recovery properties as the classical Paley-Wiener space. Specifically, if $\{Ï_α(x): α\in A\}$ is a regular family of interpolators and $\{x_n: n\in \mathbb{Z}\}$ is a complete interpolating sequence for $L^2([-Ï,Ï])$, then the family $\{ e^{2Ïi m x}Ï_α(x-x_n): m,n\in \mathbb{Z}, α\in A \} $ may be used to recover $f\in(PW,l^1)$.
5 pages