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A remark on Hamilton cycles with few colors
classification
🧮 math.CO
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colourshamiltoncycleakbarialwaysboundcolorscolouring
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Akbari, Etesami, Mahini, and Mahmoody conjectured that every proper edge colouring of $K_n$ with $n$ colours contains a Hamilton cycle with $\leq O(\log n)$ colours. They proved that there is always a Hamilton cycle with $\leq 8\sqrt n$ colours. In this note we improve this bound to $O(\log^3 n)$.
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