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A NEW COMPLEXITY FUNCTION, REPETITIONS IN STURMIAN WORDS, AND IRRATIONALITY EXPONENTS OF STURMIAN NUMBERSopen access
- Authors
- Bugeaud, Yann; Kim, Dong Han
- Issue Date
- 1-Mar-2019
- Publisher
- AMER MATHEMATICAL SOC
- Keywords
- Combinatorics on words; Sturmian word; complexity; b-ary expansion
- Citation
- TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY, v.371, no.5, pp 3281 - 3308
- Pages
- 28
- Indexed
- SCI
SCIE
SCOPUS
- Journal Title
- TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY
- Volume
- 371
- Number
- 5
- Start Page
- 3281
- End Page
- 3308
- ISSN
- 0002-9947
1088-6850
- Abstract
- We introduce and study a new complexity function in combinatorics on words, which takes into account the smallest second occurrence time of a factor of an infinite word. We characterize the eventually periodic words and the Sturmian words by means of this function. Then, we establish a new result on repetitions in Sturmian words and show that it is best possible. Let b >= 2 be an integer. We deduce a lower bound for the irrationality exponent of real numbers whose sequence of b-ary digits is a Sturmian sequence over {0, 1,..., b - 1} and we prove that this lower bound is best possible. As an application, we derive some information on the b-ary expansion of log(1 + 1/a for any integer a >= 34.
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Related Researcher
- Kim, Dong Han
- College of Education (Department of Mathematics Education)