EVERY SYMMETRIC KUBO-ANDO CONNECTION HAS THE ORDER-DETERMINING PROPERTY

Pub Date : 2023-09-11 DOI:10.4153/s0008439523000668

EMMANUEL CHETCUTI, CURT HEALEY

引用次数: 0

Abstract

Abstract In this article, the question of whether the Löwner partial order on the positive cone of an operator algebra is determined by the norm of any arbitrary Kubo–Ando mean is studied. The question was affirmatively answered for certain classes of Kubo–Ando means, yet the general case was left as an open problem. We here give a complete answer to this question, by showing that the norm of every symmetric Kubo–Ando mean is order-determining, i.e., if $A,B\in \mathcal B(H)^{++}$ satisfy $\Vert A\sigma X\Vert \le \Vert B\sigma X\Vert $ for every $X\in \mathcal {A}^{{++}}$ , where $\mathcal A$ is the C*-subalgebra generated by $B-A$ and I , then $A\le B$ .

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每一个对称久保-安藤连接都具有定序性质

摘要本文研究了算子代数正锥上的Löwner偏阶是否由任意Kubo-Ando均值的范数决定的问题。对于某些类别的久保安藤手段，这个问题得到了肯定的回答，但对于一般情况，这个问题仍然是一个悬而未决的问题。我们在这里给出了这个问题的完整答案，通过证明每一个对称Kubo-Ando均值的范数是序决定的，即，如果$A,B\in \mathcal B(H)^{++}$满足$\Vert A\sigma X\Vert \le \Vert B\sigma X\Vert $对于每一个$X\in \mathcal {A}^{{++}}$，其中$\mathcal A$是由$B-A$和I生成的C*-子代数，则$A\le B$。

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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