Bounded VC-dimension implies the Schur-Erdős conjecture
Fox J, Pach J, Suk A. 2021. Bounded VC-dimension implies the Schur-Erdős conjecture. Combinatorica. 41(6), 803–813.
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https://doi.org/10.48550/arXiv.1912.02342
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Journal Article
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Author
Fox, Jacob;
Pach, JánosISTA;
Suk, Andrew
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Abstract
In 1916, Schur introduced the Ramsey number r(3; m), which is the minimum integer n > 1 such that for any m-coloring of the edges of the complete graph Kn, there is a monochromatic copy of K3. He showed that r(3; m) ≤ O(m!), and a simple construction demonstrates that r(3; m) ≥ 2Ω(m). An old conjecture of Erdős states that r(3; m) = 2Θ(m). In this note, we prove the conjecture for m-colorings with bounded VC-dimension, that is, for m-colorings with the property that the set system induced by the neighborhoods of the vertices with respect to each color class has bounded VC-dimension.
Publishing Year
Date Published
2021-11-20
Journal Title
Combinatorica
Publisher
Springer Nature
Volume
41
Issue
6
Page
803-813
ISSN
eISSN
IST-REx-ID
Cite this
Fox J, Pach J, Suk A. Bounded VC-dimension implies the Schur-Erdős conjecture. Combinatorica. 2021;41(6):803-813. doi:10.1007/s00493-021-4530-9
Fox, J., Pach, J., & Suk, A. (2021). Bounded VC-dimension implies the Schur-Erdős conjecture. Combinatorica. Springer Nature. https://doi.org/10.1007/s00493-021-4530-9
Fox, Jacob, János Pach, and Andrew Suk. “Bounded VC-Dimension Implies the Schur-Erdős Conjecture.” Combinatorica. Springer Nature, 2021. https://doi.org/10.1007/s00493-021-4530-9.
J. Fox, J. Pach, and A. Suk, “Bounded VC-dimension implies the Schur-Erdős conjecture,” Combinatorica, vol. 41, no. 6. Springer Nature, pp. 803–813, 2021.
Fox J, Pach J, Suk A. 2021. Bounded VC-dimension implies the Schur-Erdős conjecture. Combinatorica. 41(6), 803–813.
Fox, Jacob, et al. “Bounded VC-Dimension Implies the Schur-Erdős Conjecture.” Combinatorica, vol. 41, no. 6, Springer Nature, 2021, pp. 803–13, doi:10.1007/s00493-021-4530-9.
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arXiv 1912.02342