充分族生成Banach空间中的Delta点

IF 0.6 Q3 MATHEMATICS

Illinois Journal of Mathematics Pub Date : 2020-12-01 DOI:10.1215/00192082-10123638

T. Abrahamsen, Vegard Lima, Andr'e Martiny

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引用次数: 4

摘要

我们研究了Banach空间$h｛\mathcal｛A｝，p｝$中由适足族$\mathcal A$生成的delta点，其中$1\le p1$我们证明了$h｝\mathical｛A}，p｝$及其对偶都不包含delta点。在$\mathcal A$是正则的额外假设下，我们证明了当$p=1时也是如此。特别是Schreier空间及其对偶不具有delta点。如果$\mathcal A$仅由有限集组成，则我们能够排除$h｛\mathcal｛A｝，1｝$中的delta点及其对偶中的Daugavet点的存在。我们还证明了如果$h｛\mathcal｛A｝，1｝$是多面体，那么它要么是（I）-多面体，要么是（V）-多面体（在Foff和Vesel\'y的意义上）。

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Delta-points in Banach spaces generated by adequate families

We study delta-points in Banach spaces $h_{\mathcal{A},p}$ generated by adequate families $\mathcal A$ where $1 \le p 1$ we prove that neither $h_{\mathcal{A},p}$ nor its dual contain delta-points. Under the extra assumption that $\mathcal A$ is regular, we prove that the same is true when $p=1.$ In particular the Schreier spaces and their duals fail to have delta-points. If $\mathcal A$ consists of finite sets only we are able to rule out the existence of delta-points in $h_{\mathcal{A},1}$ and Daugavet-points in its dual. We also show that if $h_{\mathcal{A},1}$ is polyhedral, then it is either (I)-polyhedral or (V)-polyhedral (in the sense of Fonf and Vesel\'y).

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来源期刊

Illinois Journal of Mathematics 数学-数学

CiteScore

0.90

自引率

0.00%

发文量

期刊介绍： IJM strives to publish high quality research papers in all areas of mainstream mathematics that are of interest to a substantial number of its readers. IJM is published by Duke University Press on behalf of the Department of Mathematics at the University of Illinois at Urbana-Champaign.