Badly逼近数、Kronecker定理和Sturmian特征序列的多样性

IF 0.3 4区数学 Q4 MATHEMATICS Journal De Theorie Des Nombres De Bordeaux Pub Date : 2020-06-29 DOI:10.5802/jtnb.1236

Dmitry Badziahin, J. Shallit

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引用次数: 0

摘要

对于$n \ θ $的小数部分，我们给出了经典“三间隙定理”的最优版本，在这种情况下$\ θ $是一个非常近似的无理数。在此基础上，我们推导出了克罗内克一维非齐次逼近定理的一个版本。我们将这些结果应用于获得特征Sturmian序列的序列多样性的改进措施，其中斜率很难近似。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Badly approximable numbers, Kronecker’s theorem, and diversity of Sturmian characteristic sequences

We give an optimal version of the classical ``three-gap theorem'' on the fractional parts of $n \theta$, in the case where $\theta$ is an irrational number that is badly approximable. As a consequence, we deduce a version of Kronecker's inhomogeneous approximation theorem in one dimension for badly approximable numbers. We apply these results to obtain an improved measure of sequence diversity for characteristic Sturmian sequences, where the slope is badly approximable.

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