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Hypergraph Colouring and Degeneracy

Published 2013-10-10, updated 2014-08-15Version 3

A hypergraph is "$d$-degenerate" if every subhypergraph has a vertex of degree at most $d$. A greedy algorithm colours every such hypergraph with at most $d+1$ colours. We show that this bound is tight, by constructing an $r$-uniform $d$-degenerate hypergraph with chromatic number $d+1$ for all $r\geq2$ and $d\geq1$. Moreover, the hypergraph is triangle-free, where a "triangle" in an $r$-uniform hypergraph consists of three edges whose union is a set of $r+1$ vertices.

Categories: math.CO

Keywords: hypergraph colouring, degeneracy, greedy algorithm colours, uniform hypergraph consists, degenerate hypergraph

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