Aneesh Dasgupta, Roland Roeder
Published 2022-08-02Version 1
The Three Gap Theorem states that for any $\alpha \in \mathbb{R}$ and $N \in \mathbb{N}$, the fractional parts of $\{ 0\alpha, 1\alpha, \dots, (N - 1)\alpha \}$ partition the unit circle into gaps of at most three distinct lengths. We prove a result about symmetries in the order with which the sizes of gaps appear on the circle.
Comments: To appear in The American Math Monthly. This is the author's original manuscript (AOM), and this version does not include several improvements that took place due to the refereeing process. Comments welcome!
On the existence of zero-sum subsequences of distinct lengths
Rational Points in Geometric Progression on the Unit Circle
The Convergence Behavior of $q$-Continued Fractions on the Unit Circle
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