![]() ![]() Vershik, A theorem on periodical Markov approximation in ergodic theory, Ergodic Theory and Related Topics (Vitte, 1981), Akademie-Verlag, Berlin, 1982, pp. Queffélec, SubstitutionDynamical Systems-Spectral Analysis, Lecture Notes in Mathematics, vol. Siegel) Lecture Notes in Mathematics, vol. Pytheas-Fogg, Substitutions in Dynamics, Arithmetics and Combinatorics, (ed. Pansiot, Complexité des facteurs des mots infinis engenderé par morphismes ité rés, in Automata, Languages and Programming (Antwerp, 1984), Lecture Notes in Comput. Marcus, An Introduction to Symbolic Dynamics and Coding, Cambridge University Press, Cambridge, 1999. Skau, Ordered Bratteli diagrams, dimension groups and topological dynamics, Internat. Weextendourresulttoagenerald-dimensionalcase. We prove that any 2-dimensional multidimensional subshift of nite type can be characterized by a square matrix of innite di-mension. Roychowdhury, Finitary orbit equivalence and measured Bratteli diagrams, Colloq. Let X AZd be a 2-dimensional subshift of nite type. entropy of the associated subshift) and extensions and variations. Halmos, Measure Theory, Springer-Verlag, New York, 1974. A topological dynamical system (X, T) is minimal if one of the following equivalent. ![]() thesis, Norwegian University of Science and Technology, 1998. Gjerde, Bratteli Diagrams and Dimension Groups: Applications to the Theory of Symbolic Dynamical Systems, Ph.D. Skau, Topological orbit equivalence and C*-crossed products, J. ![]() Full Text (HTML) Figure (33) / Table (2) Related Papers. Forrest, K-groups associated with substitution minimal systems, Israel J. Faculty of Applied Mathematics, AGH University of Science and Technology, Poland, Krakow, Mickiewicza, A-3/A-4,305. Ferenczi, Substitution dynamical systems on infinite alphabets, Ann. Rozenberg, Subword complexities of various classes of deterministic developmental languages without interactions, Theoret. Skau, Substitutional dynamical systems, Bratteli diagrams and dimension groups, Ergodic Theory Dynam. Danilenko, Strong orbit equivalence of locally compact Cantor minimal systems, Internat. ![]()
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