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Three-chromatic geometric hypergraphs

12/03/2021

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by Gábor Damásdi, et al.

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We prove that for any planar convex body C there is a positive integer m with the property that any finite point set P in the plane can be three-colored such that there is no translate of C containing at least m points of P, all of the same color. As a part of the proof, we show a strengthening of the Erdős-Sands-Sauer-Woodrow conjecture. Surprisingly, the proof also relies on the two dimensional case of the Illumination conjecture.

Gábor Damásdi
5 publications
Dömötör Pálvölgyi
16 publications

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