Divided Differences & Restriction Operator on Paley-Wiener Spaces PWtaup for N-Carleson Sequences

Abstract

For a sequence of complex numbers we consider the restriction operator R defined on Paley-Wiener spaces PWτp (1<p<∞). Lyubarskii and Seip gave necessary and sufficient conditions on for R to be an isomorphism between PWτp and a certain weighted lp space. The Carleson condition appears to be necessary. We extend their result to N-Carleson sequences (finite unions of N disjoint Carleson sequences). More precisely, we give necessary and sufficient conditions for R to be an isomorphism between PWτp and an appropriate sequence space involving divided differences.