Renorming AM-spaces

arXiv: Functional Analysis Pub Date : 2020-11-09 DOI:10.1090/proc/15714

T. Oikhberg, M. Tursi

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摘要

证明了任意可分am空间$X$都有一个等价格范数，该格范数不存在非平凡满射格等距。此外，如果$X$不超过一个原子，那么这个新规范可能是am规范。作为我们的主要工具，我们引入并研究了一类所谓的Benyamini空间，它“近似”一般的am空间。

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Renorming AM-spaces

We prove that any separable AM-space $X$ has an equivalent lattice norm for which no non-trivial surjective lattice isometries exist. Moreover, if $X$ has no more than one atom, then this new norm may be an AM-norm. As our main tool, we introduce and investigate the class of so called Benyamini spaces, which ``approximate'' general AM-spaces.

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arXiv: Functional Analysis

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