2018
DOI: 10.4064/fm258-12-2016
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Geometric representation of the infimax S-adic family

Abstract: Abstract. We construct geometric realizations for the infimax family of substitutions by generalizing the Rauzy-Canterini-Siegel method for a single substitution to the S-adic case. The composition of each countably infinite subcollection of substitutions from the family has an asymptotic fixed sequence whose shift orbit closure is an infimax minimal set ∆ + . The subcollection of substitutions also generates an infinite Bratteli-Vershik diagram with prefix-suffix labeled edges. Paths in the diagram give the D… Show more

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Cited by 2 publications
(1 citation statement)
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“…Example 6.8. The infimax S-adic family F = {θ k : k ≥ 1}, with θ k : {1, 2, 3} → {1, 2, 3} + , θ k (1) = 2, θ k (2) = 31 k+1 , θ k (3) = 31 k , is considered in [BS17], where Boyland and Severa consider S-adic shifts (X σ , T ) defined by σ = (σ n ) n≥1 with each σ n ∈ F . The authors show that there exist geometric realizations, via homeomorphisms, of such S-adic shifts as interval translation maps.…”
Section: Bratteli-vershik Representationsmentioning
confidence: 99%
“…Example 6.8. The infimax S-adic family F = {θ k : k ≥ 1}, with θ k : {1, 2, 3} → {1, 2, 3} + , θ k (1) = 2, θ k (2) = 31 k+1 , θ k (3) = 31 k , is considered in [BS17], where Boyland and Severa consider S-adic shifts (X σ , T ) defined by σ = (σ n ) n≥1 with each σ n ∈ F . The authors show that there exist geometric realizations, via homeomorphisms, of such S-adic shifts as interval translation maps.…”
Section: Bratteli-vershik Representationsmentioning
confidence: 99%