Recovering functions from the Paley-Wiener amalgam space

Abstract

In this paper we show that functions from the Paley-Wiener amalgam space (PW,l1)=\f∈ L2(R): Σ\|f(+2π m) \|L2([-π,π]) < ∞\ enjoy similar recovery properties as the classical Paley-Wiener space. Specifically, if \φα(x): α∈ A\ is a regular family of interpolators and \xn: n∈ Z\ is a complete interpolating sequence for L2([-π,π]), then the family \ e2π i m xφα(x-xn): m,n∈ Z, α∈ A \ may be used to recover f∈(PW,l1).