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Journal article

The χ-Ramsey problem for triangle-free graphs

Abstract:: In 1967, Erdős asked for the greatest chromatic number, $f(n)$, amongst all $n$-vertex, triangle-free graphs. An observation of Erd\H{o}s and Hajnal together with Shearer's classical upper bound for the off-diagonal Ramsey number $R(3, t)$ shows that $f(n)$ is at most $(2 \sqrt{2} + o(1)) \sqrt{n/\log n}$. We improve this bound by a factor $\sqrt{2}$, as well as obtaining an analogous bound on the list chromatic number which is tight up to a constant factor. A bound in terms of the numbe...
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Publication status:: Not published

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APA Style

Davies, E., & Illingworth, F. (2021). The χ-Ramsey problem for triangle-free graphs.

MLA Style

Davies, E., and F. Illingworth. The χ-Ramsey Problem for Triangle-Free Graphs. 2021.

Chicago Style

Davies, E, and F Illingworth. 2021. “The χ-Ramsey Problem for Triangle-Free Graphs.”
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Authors

+ Davies, E More by this author

Role:

Author

+ Illingworth, F More by this author

Institution:

University of Oxford

Division:

MPLS

Department:

Mathematical Institute

Role:

Author

ORCID:

0000-0001-5350-2379

Item Description

Language:: English
Keywords:: FFR
Pubs id:: 1198574
Local pid:: pubs:1198574
Deposit date:: 2021-11-05

Terms of use

Copyright holder:: Davies and Illingworth
Rights statement:: Copyright © 2021 The Author(s).

Licence:: Terms and Conditions of Use for Oxford University Research Archive

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