On the dimension group of unimodular S-adic subshifts

被引：0

作者：

Berthe, V ^{[1
]}

Bernales, P. Cecchi ^{[2
]}

Durand, F. ^{[3
]}

Leroy, J. ^{[4
]}

Perrin, D. ^{[5
]}

Petite, S. ^{[3
]}

机构：

[1] Univ Paris, CNRS, IRIF, F-75013 Paris, France

[2] Univ Chile, Ctr Modelamiento Matemat, Santiago, Chile

[3] Univ Picardie Jules Verne, LAMFA, CNRS, UMR 7352, 33 Rue St Leu, F-80039 Amiens, France

[4] Univ Liege, Dept Math, 12,Allee Decouverte B37, B-4000 Liege, Belgium

[5] Univ Paris Est, Lab Informat Gaspard Monge, Champs Sur Marne, France

来源：

MONATSHEFTE FUR MATHEMATIK | 2021年 / 194卷 / 04期

关键词：

Dimension group; S-adic subshift; Orbit equivalence; Dendric subshift; Balance property;

D O I：

10.1007/s00605-020-01488-3

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

Dimension groups are complete invariants of strong orbit equivalence for minimal Cantor systems. This paper studies a natural family of minimal Cantor systems having a finitely generated dimension group, namely the primitive unimodular proper S-adic subshifts. They are generated by iterating sequences of substitutions. Proper substitutions are such that the images of letters start with a same letter, and similarly end with a same letter. This family includes various classes of subshifts such as Brun subshifts or dendric subshifts, that in turn include Arnoux-Rauzy subshifts and natural coding of interval exchange transformations. We compute their dimension group and investigate the relation between the triviality of the infinitesimal subgroup and rational independence of letter measures. We also introduce the notion of balanced functions and provide a topological characterization of balancedness for primitive unimodular proper S-adic subshifts.

引用

页码：687 / 717

页数：31

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