Canonical symbolic dynamics for one-dimensional generalized solenoids

Yi, Inhyeop

doi:10.1090/s0002-9947-01-02710-6

Cited by 18 publications

(13 citation statements)

References 17 publications

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“…The main goal of this paper is to compute the homology of onedimensional generalized solenoids, defined by K. Thomsen, based on an earlier work of Yi [11,17]. The solenoids were defined first by Williams on manifolds, and then generalized by Yi on topological spaces [14,15,17], but also see [16]. We first quickly review the Thomsen's definition [11].…”

Section: One-dimensional Generalized Solenoidsmentioning

confidence: 99%

“…Following Williams and Yi [15,17], Thomsen called (X, f ) a generalized one-dimensional solenoid or just a one-solenoid [11]. Definition 2.2.…”

Section: One-dimensional Generalized Solenoidsmentioning

confidence: 99%

“…The main goal of this paper is to compute the homology of onedimensional generalized solenoids defined by Williams [14,15], generalized by Inhyeop Yi [17] and later by Klaus Thomsen [11]. In fact these spaces are inverse limits of finite graphs with one expanding map f .…”

Section: Introductionmentioning

confidence: 99%

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Homology for one-dimensional solenoids

Amini¹,

Putnam²,

Gholikandi³

2017

Math. Scand.

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Section: One-dimensional Generalized Solenoidsmentioning

confidence: 99%

“…Following Williams and Yi [15,17], Thomsen called (X, f ) a generalized one-dimensional solenoid or just a one-solenoid [11]. Definition 2.2.…”

Section: One-dimensional Generalized Solenoidsmentioning

confidence: 99%

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Homology for one-dimensional solenoids

Amini¹,

Putnam²,

Gholikandi³

2017

Math. Scand.

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“…We also mention that this homology has been computed on rather different solenoids of a more topological nature first constructed by Williams [13] and later studied by Yi [15] and Thomsen [10] as inverse limits of branched 1-manifolds by the second author with Amini and Gholikandi [1].…”

Section: Introductionmentioning

confidence: 95%

Markov partitions and homology for -solenoids

Burke

Putnam

2015

Ergod. Th. Dynam. Sys.

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Given a relatively prime pair of integers, $n\geq m>1$, there is associated a topological dynamical system which we refer to as an $n/m$-solenoid. It is also a Smale space, as defined by David Ruelle, meaning that it has local coordinates of contracting and expanding directions. In this case, these are locally products of the real and various $p$-adic numbers. In the special case, $m=2,n=3$ and for $n>3m$, we construct Markov partitions for such systems. The second author has developed a homology theory for Smale spaces and we compute this in these examples, using the given Markov partitions, for all values of $n\geq m>1$ and relatively prime.

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“…замечание 3.10), множество M ∞ по сути совпа-дает с пространством обратного предела соответствующей последовательности отображений. Описанию пространств подобного типа посвящены многочислен-ные исследования; большое количество результатов на эту тему можно найти, например, в [9]- [18], помимо этого на базе развитой в настоящей работе техники в [19] получено описание обратимых расширений унимодальных отображений отрезка.…”

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