Aperiodic substitution systems and their Bratteli diagrams

Infinite measures on Cantor spaces, Infinite type flat surface models of ergodic systems, Harmonic analysis on graphs via Bratteli diagrams and path-space measures, Flat surfaces, Bratteli diagrams and unique ergodicity à la Masur, Dynamical systems arising from random substitutions, Orbit equivalent substitution dynamical systems and complexity, Decidability and universality of quasiminimal subshifts, Second-order ergodic theorem for self-similar tiling systems, Dimension groups for polynomial odometers, Bratteli-Vershik models and graph covering models, Uniform sets for infinite measure-preserving systems, Recognizability of morphisms, Finite-rank Bratteli–Vershik homeomorphisms are expansive, Monic representations of finite higher-rank graphs, Decidable problems in substitution shifts, Bratteli diagrams for bounded topological speedups, Dynamical properties of some adic systems with arbitrary orderings, Substitution-dynamics and invariant measures for infinite alphabet-path space, Homeomorphic measures on stationary Bratteli diagrams, Introduction to Hierarchical Tiling Dynamical Systems, Invariant measures for Cantor dynamical systems, On a substitution subshift related to the Grigorchuk group, Periodic codings of Bratteli-Vershik systems, The Category of Ordered Bratteli Diagrams, C*-algebras of a Cantor system with finitely many minimal subsets: structures, K-theories, and the index map, Graph towers, laminations and their invariant measures, TOPOLOGICAL RANK DOES NOT INCREASE BY NATURAL EXTENSION OF CANTOR MINIMALS, Beyond primitivity for one-dimensional substitution subshifts and tiling spaces, Purely atomic representations of higher-rank graph \(C^*\)-algebras, Representations of higher-rank graph \(C^\ast\)-algebras associated to {\(\Lambda\)}-semibranching function systems, Substitutive systems and a finitary version of Cobham's theorem, Recognizability for sequences of morphisms, Finite rank Bratteli diagrams: Structure of invariant measures, Exact number of ergodic invariant measures for Bratteli diagrams, Interplay between finite topological rank minimal Cantor systems, 𝒮-adic subshifts and their complexity, Invariant measures for non-primitive tiling substitutions

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• Substitutions in dynamics, arithmetics and combinatorics
• Power of words and recognizability of fixpoints of a substitution
• \(K\)-groups associated with substitution minimal systems
• A characterization of substitutive sequences using return words
• Full groups of Cantor minimal systems
• Substitution dynamical systems on infinite alphabets
• Invariant measures for the subshifts arising from non-primitive substitutions
• Ordered \(K\)-groups associated to substitutional dynamics
• Cantor aperiodic systems and Bratteli diagrams
• Valeurs propres des systèmes dynamiques définis par des substitutions de longueur variable
• Augmenting dimension group invariants for substitution dynamics
• Orbit equivalence for Cantor minimal ℤ²-systems
• Substitutional dynamical systems, Bratteli diagrams and dimension groups
• A theorem of Cobham for non-primitive substitutions
• Affable equivalence relations and orbit structure of Cantor dynamical systems
• ORDERED BRATTELI DIAGRAMS, DIMENSION GROUPS AND TOPOLOGICAL DYNAMICS
• Bratteli–Vershik models for Cantor minimal systems: applications to Toeplitz flows
• WEAK ORBIT EQUIVALENCE OF CANTOR MINIMAL SYSTEMS
• The Rokhlin lemma for homeomorphisms of a Cantor set