Dunford-Pettis type properties in L1 of a vector measure
Abstract
Let be a countably additive vector measure defined on a σ-algebra and taking values in a Banach space. In this paper we deal with the following three properties for the Banach lattice L1() of all -integrable real-valued functions: the Dunford-Pettis property, the positive Schur property and being lattice-isomorphic to an AL-space. We give new results and we also provide alternative proofs of some already known ones.
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