Generalized golden ratios of ternary alphabets | Zendy

Vilmos Komornik | Zendy; Anna Chiara Lai | Zendy; Marco Pedicini | Zendy

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Generalized golden ratios of ternary alphabets

Author(s) -

Vilmos Komornik,

Anna Chiara Lai,

Marco Pedicini

Publication year - 2011

Publication title -

journal of the european mathematical society

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 3.549

H-Index - 64

eISSN - 1435-9863

pISSN - 1435-9855

DOI - 10.4171/jems/277

Subject(s) - mathematics , ergodic theory , measure (data warehouse) , fractal , ternary operation , function (biology) , pure mathematics , discrete mathematics , combinatorics , mathematical analysis , computer science , database , evolutionary biology , biology , programming language

Expansions in noninteger bases often appear in number theory and probability theory, and they are closely connected to ergodic theory, measure theory and topology. For two-letter alphabets the golden ratio plays a special role: in smaller bases only trivial expansions are unique, whereas in greater bases there exist nontrivial unique expansions. In this paper we determine the corresponding critical bases for all three-letter alphabets and we establish the fractal nature of these bases in function of the alphabets.

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