On the Completely Positive Approximation Property for Non-Unital Operator Systems and the Boundary Condition for the Zero Map

Se-Jin Kim
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Abstract

The purpose of this paper is two-fold: firstly, we give a characterization on the level of non-unital operator systems for when the zero map is a boundary representation. As a consequence, we show that a non-unital operator system arising from the direct limit of C*-algebras under positive maps is a C*-algebra if and only if its unitization is a C*-algebra. Secondly, we show that the completely positive approximation property and the completely contractive approximation property of a non-unital operator system is equivalent to its bidual being an injective von Neumann algebra. This implies in particular that all non-unital operator systems with the completely contractive approximation property must necessarily admit an abundance of positive elements.
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论非无算子系统的完全正逼近性质和零图的边界条件
本文的目的有两个方面:首先,我们给出了当零映射是边界表示时,非整数算子系统的特征。因此,我们证明了当且仅当其单位化是一个 C* 代数时,从正映射下的 C* 代数的直接极限中产生的非整数算子系统是一个 C* 代数。其次,我们证明了非单元算子系统的完全正逼近性质和完全收缩逼近性质等价于它的双元是一个注入式冯-诺依曼代数。这尤其意味着,所有具有完全收缩逼近性质的非整数算子系统必然包含大量的正元素。
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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