Uniform Diophantine Approximation on the Hecke Group H4

Ayreena Bakhtawar; Dong Han Kim; Seul Bee Lee

doi:10.1093/imrn/rnaf257

Uniform Diophantine Approximation on the Hecke Group H₄

Ayreena Bakhtawar
, Dong Han Kim
, Seul Bee Lee

Department of Mathematics Education

Research output: Contribution to journal › Article › peer-review

Abstract

Dirichlet's uniform approximation theorem is a fundamental result in Diophantine approximation that gives an optimal rate of approximation with a given bound. We study uniform Diophantine approximation properties on the Hecke group. For a given real number, we characterize the sequence of -best approximations of and show that they are convergents of the Rosen continued fraction and the dual Rosen continued fraction of. We give analogous theorems of Dirichlet uniform approximation and the Legendre theorem with optimal constants.

Original language	English
Article number	rnaf257
Journal	International Mathematics Research Notices
Volume	2025
Issue number	16
DOIs	https://doi.org/10.1093/imrn/rnaf257
State	Published - 1 Aug 2025

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abstract = "Dirichlet's uniform approximation theorem is a fundamental result in Diophantine approximation that gives an optimal rate of approximation with a given bound. We study uniform Diophantine approximation properties on the Hecke group. For a given real number, we characterize the sequence of -best approximations of and show that they are convergents of the Rosen continued fraction and the dual Rosen continued fraction of. We give analogous theorems of Dirichlet uniform approximation and the Legendre theorem with optimal constants.",

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Uniform Diophantine Approximation on the Hecke Group H₄

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