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NUMBER THEORETICAL PROPERTIES OF ROMIK'S DYNAMICAL SYSTEM
- Authors
- Cha, Byungchul; Kim, Dong Han
- Issue Date
- Jan-2020
- Publisher
- KOREAN MATHEMATICAL SOC
- Keywords
- Pythagorean triple; continued fraction; Berggren theorem; Romik system
- Citation
- BULLETIN OF THE KOREAN MATHEMATICAL SOCIETY, v.57, no.1, pp 251 - 274
- Pages
- 24
- Indexed
- SCIE
SCOPUS
KCI
- Journal Title
- BULLETIN OF THE KOREAN MATHEMATICAL SOCIETY
- Volume
- 57
- Number
- 1
- Start Page
- 251
- End Page
- 274
- ISSN
- 1015-8634
2234-3016
- Abstract
- We study a dynamical system that was originally defined by Romik in 2008 using an old theorem of Berggren concerning Pythagorean triples. Romik's system is closely related to the Farey map on the unit interval which generates an additive continued fraction algorithm. We explore some number theoretical properties of the Romik system. In particular, we prove an analogue of Lagrange's theorem in the case of the Romik system on the unit quarter circle, which states that a point possesses an eventually periodic digit expansion if and only if the point is defined over a real quadratic extension field of rationals.
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Related Researcher
- Kim, Dong Han
- College of Education (Department of Mathematics Education)