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Fractional colorings of cubic graphs with large girth

We show that every (sub)cubic n-vertex graph with sufficiently large girth has fractional chromatic number at most 2.2978 which implies that it contains an independent set of size at least 0.4352n. Our bound on the independence number is valid to random cubic graphs as well as it improves existing lower bounds on the maximum cut in cubic graphs with large girth.

preprint2010arXivOpen access

Frantisek Kardos Daniel Kral Jan Volec

math.CO

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Frantisek Kardos Daniel Kral Jan Volec

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