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Generalized Continued Fraction Algorithm for the Index 3 Sublattice
- Authors
- 김동한
- Issue Date
- Nov-2024
- Publisher
- 한국수학교육학회
- Keywords
- continued fraction; even continued fraction; Romik’s dynamical system; Diophantine approximation on the circle; index-3 sublattice
- Citation
- 순수 및 응용수학, v.31, no.4, pp 439 - 451
- Pages
- 13
- Indexed
- ESCI
KCI
- Journal Title
- 순수 및 응용수학
- Volume
- 31
- Number
- 4
- Start Page
- 439
- End Page
- 451
- ISSN
- 1226-0657
2287-6081
- Abstract
- Motivated by an algorithm to generate all Pythagorean triples, Romik introduced a dynamical system on the unit circle, which corresponds the continued fraction algorithm on the index-2 sublattice. Cha et al. extended Romik’s work to other ellipses and spheres and developed a dynamical system generating all Eisenstein triples. In this article, we review the dynamical systems by Romik and by Cha et al. and find connections to the continued fraction algorithms.
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Related Researcher
- Kim, Dong Han
- College of Education (Department of Mathematics Education)