LIPIcs.SoCG.2020.47.pdf
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Almost-Monochromatic Sets and the Chromatic Number of the Plane
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Dömötör Pálvölgyi 
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36th International Symposium on Computational Geometry (SoCG 2020)
Series: Leibniz International Proceedings in Informatics (LIPIcs)
Conference: Symposium on Computational Geometry (SoCG) - License:
Creative Commons Attribution 3.0 Unported license
- Publication Date: 2020-06-08
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Acknowledgements
We thank Konrad Swanepoel and the anonymous referees for helpful suggestions on improving the presentation of the paper. We also thank the participants of the Polymath16 project for discussions and consent to publish these related results that were obtained "offline" and separately from the main project.
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Nóra Frankl, Tamás Hubai, and Dömötör Pálvölgyi. Almost-Monochromatic Sets and the Chromatic Number of the Plane. In 36th International Symposium on Computational Geometry (SoCG 2020). Leibniz International Proceedings in Informatics (LIPIcs), Volume 164, pp. 47:1-47:15, Schloss Dagstuhl – Leibniz-Zentrum für Informatik (2020)
https://doi.org/10.4230/LIPIcs.SoCG.2020.47
Abstract
In a colouring of ℝ^d a pair (S,s₀) with S ⊆ ℝ^d and with s₀ ∈ S is almost-monochromatic if S⧵{s₀} is monochromatic but S is not. We consider questions about finding almost-monochromatic similar copies of pairs (S,s₀) in colourings of ℝ^d, ℤ^d, and of ℚ under some restrictions on the colouring.
Among other results, we characterise those (S,s₀) with S ⊆ ℤ for which every finite colouring of ℝ without an infinite monochromatic arithmetic progression contains an almost-monochromatic similar copy of (S,s₀). We also show that if S ⊆ ℤ^d and s₀ is outside of the convex hull of S⧵{s₀}, then every finite colouring of ℝ^d without a monochromatic similar copy of ℤ^d contains an almost-monochromatic similar copy of (S,s₀). Further, we propose an approach based on finding almost-monochromatic sets that might lead to a human-verifiable proof of χ(ℝ²) ≥ 5.
Subject Classification
ACM Subject Classification
- Mathematics of computing → Graph coloring
- Theory of computation → Computational geometry
Keywords
- discrete geometry
- Hadwiger-Nelson problem
- Euclidean Ramsey theory
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References
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