Research Article

Weak limited sets and operators on Banach lattices

Published in: Quaestiones Mathematicae
Volume 46 , issue 1 , 2023 , pages: 49–55

DOI: 10.2989/16073606.2021.1990156

Author(s): Farid Afkir Moulay Ismaïl University, Morocco , Aziz Elbour Moulay Ismaïl University, Morocco

Keywords: Primary: 47B60 , Secondary: 47B65 , 46B42 , Weak limited set , weakly precompact set , weak limited operator , Dunford-Pettis operator , Banach lattice , order continuous norm

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Abstract

In this paper, we prove that an operator T : E → F , between two Banach lattices, maps order intervals onto weak limited sets if and only if the modulus |ST| exists and is Dunford-Pettis for every Dunford-Pettis operator S : F → c0. Next, we establish that a Banach lattice E does not contain any isomorphic copy of ℓ ¹ if and only if the order intervals of E are weak limited and the norm of E′ is order continuous. We also investigate the domination problem of the class of weak limited operators.

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