The stable algebra of a Wieler solenoid: inductive limits and -theory

Deeley, Robin J.; Yashinski, Allan

doi:10.1017/etds.2019.17

Cited by 11 publications

(18 citation statements)

References 29 publications

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“…If (X, ϕ) is mixing, then S(Q), U(P ) are also simple. Also, they are C * -stable (see [23,Theorem A.2] and [41, Corollary 4.5]) and hence, for any periodic orbit…”

Section: The Homeomorphism ϕ Induces the Automorphismmentioning

confidence: 99%

On finitely summable Fredholm modules from Smale spaces

Gerontogiannis¹

2021

Preprint

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We prove that all K-homology classes of the stable (and unstable) Ruelle algebra of a Smale space have explicit Fredholm module representatives that are finitely summable on the same smooth subalgebra and with the same degree of summability. The smooth subalgebra is induced by a metric on the underlying Smale space groupoid and fine transversality relations between stable and unstable sets. The degree of summability is related to the fractal dimension of the Smale space. Further, the Fredholm modules are obtained by taking Kasparov products with a fundamental class of the Spanier-Whitehead K-duality between the Ruelle algebras. Finally, we obtain general results on stability under holomorphic functional calculus and construct Lipschitz algebras on étale groupoids.

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“…If (X, ϕ) is mixing, then S(Q), U(P ) are also simple. Also, they are C * -stable (see [23,Theorem A.2] and [41, Corollary 4.5]) and hence, for any periodic orbit…”

Section: The Homeomorphism ϕ Induces the Automorphismmentioning

confidence: 99%

On finitely summable Fredholm modules from Smale spaces

Gerontogiannis¹

2021

Preprint

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“…The stable algebras and the stable Ruelle algebras of irreducible Wieler solenoids are studied in [2][3][4].…”

Section: Remarkmentioning

confidence: 99%

“…The purpose of this work is to study groupoids of germs and tight groupoids on a certain class of Smale spaces. Wieler [1] showed that irreducible Smale spaces with totally disconnected local stable sets can be realized as stationary inverse limit systems satisfying certain conditions, now called Wieler solenoids [1][2][3][4].…”

Section: Introductionmentioning

confidence: 99%

Self-Similar Inverse Semigroups from Wieler Solenoids

2020

Mathematics

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Wieler showed that every irreducible Smale space with totally disconnected local stable sets is an inverse limit system, called a Wieler solenoid. We study self-similar inverse semigroups defined by s-resolving factor maps of Wieler solenoids. We show that the groupoids of germs and the tight groupoids of these inverse semigroups are equivalent to the unstable groupoids of Wieler solenoids. We also show that the C * -algebras of the groupoids of germs have a unique tracial state.We review the definition and some well-known properties about Smale spaces and their associated C * -algebras. We refer to [9-12] for more details.Definition 1 ([10]). Let (X, d) be a compact metric space and f : X → X a homeomorphism. Assume that we have constants 0 < λ < 1, 0 > 0 and a continuous map, called the bracket map,

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“…From these results in [8], Theorem 4.4 and Lemma 2.1 we deduce the next corollary. We are additionally using the fact that the C * -algebras associated with a mixing Smale space are simple (see [25,Theorem 1.3]) and stable (see [9]). Corollary 4.5.…”

Section: Projections In the Totally Disconnected Stable Sets Casementioning

confidence: 99%

“…A priori these C * -algebras depend on the choice of P , but different choices lead to Morita equivalent C * -algebras [25]. Moreover, for any choice of P , these algebras are stable in the C * -algebraic sense [9] so different choices of P lead to isomorphic algebras. As mentioned above, associated to a (mixing) Smale space there is also the homoclinic C * -algebra, which is unital and has unique trace.…”

Section: Introductionmentioning

confidence: 99%

Smale space $C^*$-algebras have nonzero projections

Deeley¹,

Goffeng²,

Yashinski³

2019

Proc. Amer. Math. Soc.

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The main result of the present paper is that the stable and unstable C * -algebras associated to a mixing Smale space always contain nonzero projections. This gives a positive answer to a question of the first listed author and Karen Strung and has implications for the structure of these algebras in light of the Elliott program for simple C * -algebras. Using our main result, we also show that the homoclinic, stable, and unstable algebras each have real rank zero.

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The stable algebra of a Wieler solenoid: inductive limits and -theory

Cited by 11 publications

References 29 publications

On finitely summable Fredholm modules from Smale spaces

On finitely summable Fredholm modules from Smale spaces

Self-Similar Inverse Semigroups from Wieler Solenoids

Smale space $C^*$-algebras have nonzero projections

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