Subspaces generated by translations in rearrangement invariant spaces (Q1963855)

This is a really very interesting paper. The authors investigated the complementability of subspaces \(Q_{a}\) generated by sequences of translations of functions \(a\in E[0,1)\) where \(E\) is a rearrangement invariant Banach function space on \([0,\infty).\) An r.i. function space is said to be nice (in short, \(E\in {\mathcal N}\)) if every subspace of type \(Q_{a}\) is complemented. Necessary and sufficient conditions for an r.i. function space to be nice are given. Also the Orlicz, Lorentz and Marcinkiewicz spaces belonging to the class \({\mathcal N}\) are determined.