厄米巴拿赫代数的算子不等式

Pub Date : 2020-03-12 DOI:10.7146/math.scand.a-115624

H. Najafi

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引用次数: 1

摘要

本文将C * -代数上的算子均值的Kubo-Ando理论推广到具有连续对合的hermite Banach * -代数a上。为此，我们证明了如果a和b是a中的自伴随元素，且谱在区间J中使得a≤b，则对于J上的每一个算子单调函数f, f(a)≤f(b)，其中f(a)和f(b)由Riesz-Dunford积分定义。此外，我们证明了通常算子凸函数的一些凸性性质在厄密巴拿赫*代数的集合中是保持的。特别地，在这些情况下给出了Jensen算子不等式。

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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Some operator inequalities for Hermitian Banach $*$-algebras

In this paper, we extend the Kubo-Ando theory from operator means on C∗-algebras to a Hermitian Banach ∗-algebra A with a continuous involution. For this purpose, we show that if a and b are self-adjoint elements in A with spectra in an interval J such that a≤b, then f(a)≤f(b) for every operator monotone function f on J, where f(a) and f(b) are defined by the Riesz-Dunford integral. Moreover, we show that some convexity properties of the usual operator convex functions are preserved in the setting of Hermitian Banach ∗-algebras. In particular, Jensen's operator inequality is presented in these cases.

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