Graphs with large minimum degree and no small odd cycles are $3$-colourable

Published 3 Feb 2023 in math.CO | (2302.01875v2)

Abstract: Answering a question by Letzter and Snyder, we prove that for large enough $k$ any $n$-vertex graph $G$ with minimum degree at least $\frac{1}{2k-1}n$ and without odd cycles of length less than $2k+1$ is $3$-colourable. In fact, we prove a stronger result that works with a slightly smaller minimum degree.

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Graphs with large minimum degree and no small odd cycles are $3$-colourable

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Graphs with large minimum degree and no small odd cycles are $3$-colourable

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