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引用次数: 0
摘要
在他最近的一篇论文Molnár中,证明了如果$\mathcal{A}$是一个没有$I_1, I_2$型直接和的von Neumann代数,那么从$\mathcal{A}$的正定锥到保Kubo-Ando幂均值的正实数的任何函数,对于$0 \neq p \ In(-1,1),$必然是常数。证明了$I_1$型代数承认有非平凡的$p$幂均值保持泛函,并推测$I_2$型代数只承认有常数的$p$幂均值保持泛函。我们确认后者。在最近的另一篇关于沃瑟斯坦平均值的论文Molnár中也出现了类似的结果。我们还证明了$I_2$型代数关于Wasserstein均值的猜想。我们还给出了C^*$-代数中心性的两个条件。
Preservers of the p-power and the Wasserstein means on 2x2 matrices
In one of his recent papers, Molnár showed that if $\mathcal{A}$ is a von Neumann algebra without $I_1, I_2$-type direct summands, then any function from the positive definite cone of $\mathcal{A}$ to the positive real numbers preserving the Kubo-Ando power mean, for some $0 \neq p \in (-1,1),$ is necessarily constant. It was shown in that paper that $I_1$-type algebras admit nontrivial $p$-power mean preserving functionals, and it was conjectured that $I_2$-type algebras admit only constant $p$-power mean preserving functionals. We confirm the latter. A similar result occurred in another recent paper of Molnár concerning the Wasserstein mean. We prove the conjecture for $I_2$-type algebras in regard of the Wasserstein mean, too. We also give two conditions that characterise centrality in $C^*$-algebras.
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