Bourgain-Morrey sequence spaces: structural properties, relations to classical p spaces and duality

Abstract

We study the discrete Bourgain-Morrey sequence spaces pq,r(Z), recently introduced as discrete counterparts of Morrey-type spaces. We show that c00 is dense in pq,r, hence the spaces are separable. We establish embeddings 1 pq,r r for r>1, while for r=1 one has pq,1=1. For each p, the identity pq,p=p yields uncountably many equivalent norms on p. We also introduce a block space as a natural predual of pq,r and prove the duality (pq,r)*=hp'q',r', from which reflexivity follows for 1<p<q<∞ and 1<r<∞. This work completes the foundational stage of the discrete Bourgain-Morrey theory by fully characterizing its structure and duality.