Pyjama problem

In mathematics, the pyjama problem asks whether the plane can be covered by a finite number of rotated copies of a repeating pattern of stripes (''pyjama stripes''), no matter how thin the stripes are. The problem was posed in 2006 by Alex Iosevich, Mihail Kolountzakis, and Máté Matolcsi.^[2] It was answered in the affirmative by Freddie Manners in 2015, using an analogy with Furstenberg’s ×2, ×3 Theorem.^[3]

Let ${\displaystyle E(\epsilon ):=\{z\in \mathbb{ℂ}:\mathrm{R}\mathrm{e}(z)\in (-\epsilon ,\epsilon )(\mathrm{mod}1)\}}$ be the pyjama stripe of width ${\displaystyle 2\epsilon }$. Noah Kravitz and James Leng proved that ${\displaystyle \exp \exp \exp ({\epsilon }^{-O(1)})}$ rotations of ${\displaystyle E_1(\epsilon )}$ about the origin are sufficient to cover ${\displaystyle \mathbb{ℂ}}$, hence obtaining an explicit upper bound for the pyjama problem.^[4] It remains an open problem to obtain lower bounds for the pyjama problem beyond the trivial volume preserving bound of ${\displaystyle {\epsilon }^{-1}/2}$.^[4][5]

• Tarski's plank problem, on covering bounded sets by stripes

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