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Autori principali: Clouâtre, Raphaël, Thompson, Ian
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2406.16806
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author Clouâtre, Raphaël
Thompson, Ian
author_facet Clouâtre, Raphaël
Thompson, Ian
contents Let $A$ be a unital $C^*$-algebra generated by some separable operator system $S$. More than a decade ago, Arveson conjectured that $S$ is hyperrigid in $A$ if all irreducible representations of $A$ are boundary representations for $S$. Recently, a counterexample to the conjecture was found by Bilich and Dor-On. To circumvent the difficulties hidden in this counterexample, we exploit some of Pedersen's seminal ideas on noncommutative measurable structures and establish an amended version of Arveson's conjecture. More precisely, we show that all irreducible representations of $A$ are boundary representations for $S$ precisely when all representations of $A$ admit a unique "tight" completely positive extension from $S$. In addition, we prove an equivalence between uniqueness of such tight extensions and rigidity of completely positive approximations for representations of nuclear $C^*$-algebras, thereby extending the classical principle of Korovkin--Saskin for commutative algebras of continuous functions.
format Preprint
id arxiv_https___arxiv_org_abs_2406_16806
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Rigidity of operator systems: tight extensions and noncommutative measurable structures
Clouâtre, Raphaël
Thompson, Ian
Operator Algebras
Functional Analysis
Let $A$ be a unital $C^*$-algebra generated by some separable operator system $S$. More than a decade ago, Arveson conjectured that $S$ is hyperrigid in $A$ if all irreducible representations of $A$ are boundary representations for $S$. Recently, a counterexample to the conjecture was found by Bilich and Dor-On. To circumvent the difficulties hidden in this counterexample, we exploit some of Pedersen's seminal ideas on noncommutative measurable structures and establish an amended version of Arveson's conjecture. More precisely, we show that all irreducible representations of $A$ are boundary representations for $S$ precisely when all representations of $A$ admit a unique "tight" completely positive extension from $S$. In addition, we prove an equivalence between uniqueness of such tight extensions and rigidity of completely positive approximations for representations of nuclear $C^*$-algebras, thereby extending the classical principle of Korovkin--Saskin for commutative algebras of continuous functions.
title Rigidity of operator systems: tight extensions and noncommutative measurable structures
topic Operator Algebras
Functional Analysis
url https://arxiv.org/abs/2406.16806