Tracial approximate divisibility and stable rank one

Fu, Xuanlong; Li, Kang; Lin, Huaxin

doi:10.48550/arxiv.2108.08970

Cited by 6 publications

(19 citation statements)

References 30 publications

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“…The following is known. The proof of this is exactly the same as that of the case T (A) = QT (A) (see 5.1, 5.2, 5.3 and 5.4 of [13] for details, and also see the remark after Definition 6.3 of [17]).…”

Section: )mentioning

confidence: 74%

“…Therefore, for any hereditary C * -subalgebra A 1 ⊂ A, any a ∈ A 1 , any ε > 0, there are nilpotents x, y ∈ A 1 such that a − xy < ε. Together with the facts that A is projectionless and has continuous scale, we can apply [17,Theorem 6.4] and conclude that A has stable rank one. We learned that the following is also obtained by Winter and Geffen.…”

Section: The Proof Ofmentioning

confidence: 78%

“…Denote by N cu (A) (or just N cu ) the set of all Cuntz-null sequences in l ∞ (A). It follows from Proposition 3.5 of [17] that…”

Section: 11mentioning

confidence: 99%

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Tracial oscillation zero and stable rank one

Fu¹,

Lin²

2021

Preprint

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Let A be a separable (not necessarily unital) simple C * -algebra with strict comparison. We show that if A has tracial approximate oscillation zero then A has stable rank one and the canonical map Γ from the Cuntz semigroup of A to the corresponding affine function space is surjective. The converse also holds. As a by-product, we find that a separable simple C * -algebra which has almost stable rank one must have stable rank one, provided it has strict comparison and the canonical map Γ is surjective.

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Section: )mentioning

confidence: 74%

Section: The Proof Ofmentioning

confidence: 78%

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Tracial oscillation zero and stable rank one

Fu¹,

Lin²

2021

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“…Denote by N cu := N cu (A) the subset of l ∞ (A) consisting of Cuntz-null sequences. It is proved in [23] that, if A is a nonelementary simple C * -algebra, N cu (A) is a (closed two-sided) ideal of l ∞ (A) containing c 0 (A) (see Proposition 3.5 of [23]). Let e ∈ A 1 + be a strictly positive element and e n = f 1/2n (e), n ∈ N. Recall that (see Definition 2.5 of [35]) A is said to have continuous scale if and only if for any m(n) > n, a n = (e m(n) − e n ) c.…”

Section: Introductionmentioning

confidence: 99%

“…It is shown (Proposition 3.8 of [23]) that, with additional assumption that A has strict comparison, N cu (A) = I T (A) w ,N . Definition 2.12.…”

Section: Introductionmentioning

confidence: 99%

Tracial oscillation zero and Z-stability

Lin¹

2021

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Let A be a (not necessarily unital) separable simple amenable C * -algebra whose traces have countable extremal boundary. We show that A is Z-stable if and only if A has strict comparison for positive elements. In the case that A is a unital separable simple amenable C * -algebra whose tracial state space has countable-dimensional extremal boundary. We show that A is Z-stable if and only if A has strict comparison for positive elements and stable rank one. PreliminaryDefinition 2.1. Let A be a C * -algebra and S ⊂ A a subset of A.

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