2020
DOI: 10.3934/dcds.2020186
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Entropy on regular trees

Abstract: We show that the limit in our definition of tree shift topological entropy is actually the infimum, as is the case for both the topological and measure-theoretic entropies in the classical situation when the time parameter is Z. As a consequence, tree shift entropy becomes somewhat easier to work with. For example, the statement that the topological entropy of a tree shift defined by a one-dimensional subshift dominates the topological entropy of the latter can now be extended from shifts of finite type to arb… Show more

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Cited by 15 publications
(4 citation statements)
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“…Note that the limit in (1.3) exists [24] and is actually the infimum of log |Bn(T A )| |∆n| [25]. For T being a golden-mean tree ( 2), the limit of (1.3) also exists, and more general results for the existence of the limit (1.3) can be found in [5].…”
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confidence: 92%
See 1 more Smart Citation
“…Note that the limit in (1.3) exists [24] and is actually the infimum of log |Bn(T A )| |∆n| [25]. For T being a golden-mean tree ( 2), the limit of (1.3) also exists, and more general results for the existence of the limit (1.3) can be found in [5].…”
mentioning
confidence: 92%
“…[20,7]). Its topological behavior and entropy have been extensively studied during the last decade: see [2,3] for the topological behavior, [1] for the classification theory and [4,24,25] for entropy. It is worth noting that since amenability is no longer true for T , that is, |∆ n \∆ n−1 |/|∆ n | does not tend to 0 as n → ∞ (see [7]), where ∆ n denotes the set of all vertices of T whose distance from 0 is at most n, T A has interesting properties which are different from those of shift spaces defined on N or on amenable groups.…”
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confidence: 99%
“…In other words, T X is the set consists of configurations whose projection on any infinite path is in X. Petersen and Salama [14,15] first proposed the class of treeshifts and demonstrated that the topological entropy of X is no larger than the topological entropy of T X . An immediate result is X being topologically mixing implies T X is of positive topological entropy.…”
Section: Introductionmentioning
confidence: 99%
“…Usually, entropy is given by the exponential growth rate of the number of configurations the system sees with respect to their length. For trees, it is naturally expected a super-exponential growth rate (see [16]). In [14], Sturmian trees are colored trees with an affine growth.…”
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confidence: 99%