由Rauzy-Veech归纳法推导出三间隙定理

Q4 Mathematics Revista Colombiana de Matematicas Pub Date : 2018-07-30 DOI:10.15446/recolma.v54n1.89777

Christian Weiss

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引用次数: 5

摘要

三间隙定理指出，如果一个人在一个圆上放置n个点，距离起点的角度为z, 2z，…nz，则最多有三种不同长度的间隙。1958年，Sós首次证明了这个定理，此后又发现了许多证明。在这篇笔记中，我们展示了如何使用Rauzy-Veech归纳法轻松地推导出三间隙定理。

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Deducing Three Gap Theorem from Rauzy-Veech induction

The Three Gap Theorem states that there are at most three distinct lengths of gaps if one places n points on a circle, at angles of z, 2z, … nz from the starting point. The theorem was first proven in 1958 by Sós and many proofs have been found since then. In this note we show how the Three Gap Theorem can easily be deduced by using Rauzy-Veech induction.

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