The paper addresses the duality problem for almost Dunford-Pettis operators, which has been investigated before. The main focus is to establish conditions on a linear operator T between Banach lattices E and F, and/or on E and/or F, so that the adjoint T* and/or the second adjoint T** are almost Dunford-Pettis.
The key highlights and insights are:
The authors characterize Banach lattices E whose biduals E** have the positive Schur property by means of T** being almost Dunford-Pettis for every operator T: E → ℓ∞.
They extend known results on conditions for the adjoint T* of a positive almost Dunford-Pettis operator T: E → F to be almost Dunford-Pettis. The results show when T* enjoys a property stronger than being almost Dunford-Pettis, and when T** is almost Dunford-Pettis.
The authors investigate when T* or T** is almost Dunford-Pettis even if T is not. They provide conditions for T* to be almost Dunford-Pettis when T is order bounded or regular, and for T** to be almost Dunford-Pettis when T is bounded order weakly compact or weakly compact.
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by Geraldo Bote... klokken arxiv.org 10-02-2024
https://arxiv.org/pdf/2207.11105.pdfDypere Spørsmål