Jeff Cooper, Dhruv Mubayi
Published 2014-04-10Version 1
Fix $k \geq 3$, and let $G$ be a $k$-uniform hypergraph with maximum degree $\Delta$. Suppose that for each $l = 2, ..., k-1$, every set of l vertices of G is in at most $\Delta^{(k-l)/(k-1)}/f$ edges. Then the chromatic number of $G$ is $O( (\Delta/\log f)^{1/(k-1)})$. This extends results of Frieze and the second author and Bennett and Bohman. A similar result is proved for 3-uniform hypergraphs where every vertex lies in few triangles. This generalizes a result of Alon, Krivelevich, and Sudakov, who proved the result for graphs. Our main new technical contribution is a deviation inequality for positive random variables with expectation less than 1. This may be of independent interest and have further applications.
About dependence of the number of edges and vertices in hypergraph clique with chromatic number 3
The Sum and Product of Chromatic Numbers of Graphs and their Line Graphs
The chromatic number of a signed graph
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