Amenability, bilipschitz equivalence, and the von Neumann conjecture

Whyte, Kevin

doi:10.1215/s0012-7094-99-09904-0

Cited by 78 publications

(114 citation statements)

References 12 publications

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“…Proof

(1) \Rightarrow (2)

: This follows immediately from [, Theorem 6.2].

(2) \Rightarrow (3)

: Every bi‐Lipschitz embedding is an injective coarse embedding.…”

Section: Properly Infinite Projections In Uniform Roe Algebrasmentioning

confidence: 82%

Low‐dimensional properties of uniform Roe algebras

Willett

2018

J. London Math. Soc.

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Abstract. The goal of this paper is to study when uniform Roe algebras have certain C * -algebraic properties in terms of the underlying space: in particular, we study properties like having stable rank one or real rank zero that are thought of as low dimensional, and connect these to low dimensionality of the underlying space in the sense of the asymptotic dimension of Gromov. Some of these results (for example, on stable rank one, cancellation, strong quasidiagonality, and finite decomposition rank) give definitive characterizations, while others (on real rank zero) are only partial and leave a lot open.We also establish results about K-theory, showing that all K0-classes come from the inclusion of the canonical Cartan in low dimensional cases, but not in general; in particular, our K-theoretic results answer a question of Elliott and Sierakowski about vanishing of K0 groups for uniform Roe algebras of non-amenable groups. Along the way, we extend some results about paradoxicality, proper infiniteness of projections in uniform Roe algebras, and supramenability from groups to general metric spaces. These are ingredients needed for our K-theoretic computations, but we also use them to give new characterizations of supramenability for metric spaces. Mathematics Subject Classification (2010): 20F69, 46L05, 46L80, 55M10

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“…Proof

(1) \Rightarrow (2)

: This follows immediately from [, Theorem 6.2].

(2) \Rightarrow (3)

: Every bi‐Lipschitz embedding is an injective coarse embedding.…”

Section: Properly Infinite Projections In Uniform Roe Algebrasmentioning

confidence: 82%

Low‐dimensional properties of uniform Roe algebras

Willett

2018

J. London Math. Soc.

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“…Positive answers were also obtained by Bogopolskii (see [3]) for the hyperbolic spaces H d and by Whyte (see [4]) for nonamenable spaces. In addition, notice the result of Papasoglu (see [5]), who proved the bi-Lipschitz equivalence (as discrete metric spaces) of any two homogeneous trees with finite valency n 1 , n 2 ≥ 3.…”

Section: Given a Metric Space M Find Out Whether Any Two Delone Setsmentioning

confidence: 85%

The family of bi-Lipschitz classes of delone sets in euclidean space has the cardinality of the continuum

Magazinov

2011

Proc. Steklov Inst. Math.

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“…Recall from [, Definition 1.11] that a bounded geometry metric space

X

is bijectively rigid if whenever there is a coarse equivalence

f : X \to Y

to another bounded geometry metric space

Y

, then there is a bijective coarse equivalence

f^{'} : X \to Y

. It can be deduced from the proof of [, Theorem 1.1] that every uniformly discrete, non‐amenable bounded geometry metric space is bijectively rigid. It is elementary to see that

double-struckZ

is also bijectively rigid.…”

Section: Isometrically Isomorphic ℓP Uniform Roe Algebrasmentioning

confidence: 99%

Rigidity of ℓp Roe-type algebras

Chung

2018

Bull. London Math. Soc.

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We investigate the rigidity of the ℓp analog of Roe‐type algebras. In particular, we show that if p∈[1,∞)∖{2}, then an isometric isomorphism between the ℓp uniform Roe algebras of two metric spaces with bounded geometry yields a bijective coarse equivalence between the underlying metric spaces, while a stable isometric isomorphism yields a coarse equivalence. We also obtain similar results for other ℓp Roe‐type algebras. In this paper, we do not assume that the metric spaces have Yu's property A or finite decomposition complexity.

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Amenability, bilipschitz equivalence, and the von Neumann conjecture

Cited by 78 publications

References 12 publications

Low‐dimensional properties of uniform Roe algebras

Low‐dimensional properties of uniform Roe algebras

The family of bi-Lipschitz classes of delone sets in euclidean space has the cardinality of the continuum

Rigidity of ℓp Roe-type algebras

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