Some results on the classes of almost (L) limited and weakly precompact operators

IF 0.5 Q3 MATHEMATICS ACTA SCIENTIARUM MATHEMATICARUM Pub Date : 2023-04-19 DOI:10.1007/s44146-023-00079-6

Farid Afkir, Aziz Elbour

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Abstract

In the first part of this paper, we present some investigations on the class of almost (L) limited operators. We show that an operator \(T:X \rightarrow E\), from a Banach space X to a Banach lattice E, is almost (L) limited iff its adjoint carries disjoint almost L-sequences to norm null ones. In addition, we improve several results obtained by Oughajji et al. In its second part, we study the relationship between the class of weakly precompact operators and that of order weakly compact (resp. b-weakly compact) operators. Among other things, we show that for a Banach lattice E and a Banach space X the following statements are equivalent:

(1)
Every order weakly compact (resp. b-weakly compact) operator \(T:E \rightarrow X\) is weakly precompact;
(2)
The norm of \(E'\) is order continuous or X does not contain any isomorphic copy of \(\ell ^ 1\).

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关于几乎（L）有限弱预压缩算子类的一些结果

在本文的第一部分中，我们对几乎（L）有限算子类进行了一些研究。我们证明了从Banach空间X到Banach格E的算子（T:X\rightarrowE\）几乎（L）是有限的，当它的伴随携带不相交的几乎L序列到范数零序列时。此外，我们还改进了Oughajji等人的一些结果。在第二部分中，我们研究了弱预压缩算子类与阶弱紧算子（分别为b-弱紧）之间的关系。我们证明了Banach格E和Banach空间X的下列陈述是等价的：（1）每一阶弱紧致（分别为b-弱紧致）算子\（T:E\rightarrowX\）都是弱预压缩的；（2） \（E'\）的范数是阶连续的，或者X不包含\（\ell^1\）的任何同构副本。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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