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A note on circular chromatic number of graphs with large girth and similar problems

In this short note, we extend the result of Galluccio, Goddyn, and Hell, which states that graphs of large girth excluding a minor are nearly bipartite. We also prove a similar result for the oriented chromatic number, from which follows in particular that graphs of large girth excluding a minor have oriented chromatic number at most $5$, and for the $p$th chromatic number $χ_p$, from which follows in particular that graphs $G$ of large girth excluding a minor have $χ_p(G)\leq p+2$.

preprint2014arXivOpen access
Jaroslav NesetrilPatrice Ossona de Mendez
math.CO
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Jaroslav NesetrilPatrice Ossona de Mendez

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