Isomorphic structure of Ces\`aro and Tandori spaces

Abstract

We investigate the isomorphic structure of the Ces\`aro spaces and their duals, the Tandori spaces. The main result states that the Ces\`aro function space Ces∞ and its sequence counterpart ces∞ are isomorphic, which answers to the question posted in AM09. This is rather surprising since Ces∞ has no natural lattice predual similarly as the known Talagrand's example Ta81. We prove that neither ces∞ is isomorphic to l∞ nor Ces∞ is isomorphic to the Tandori space L1 with the norm \|f\|L1= \|f\|L1, where f(t):= s ≥ t |f(s)|. Our investigation involves also an examination of the Schur and Dunford-Pettis properties of Ces\`aro and Tandori spaces. In particular, using Bourgain's results we show that a wide class of Ces\`aro-Marcinkiewicz and Ces\`aro-Lorentz spaces have the latter property.