Multipass greedy coloring of simple uniform hypergraphs
Abstract
Let m*(n) be the minimum number of edges in an n-uniform simple hypergraph that is not two colorable. We prove that m*(n)=(4n/2(n)). Our result generalizes to r-coloring of b-simple uniform hypergraphs. For fixed r and b we prove that a maximum vertex degree in b-simple n-uniform hypergraph that is not r-colorable must be (rn /(n)). By trimming arguments it implies that every such graph has ((rn /(n))b+1/b) edges. For any fixed r ≥ 2 our techniques yield also a lower bound (rn/(n)) for van der Waerden numbers W(n,r).
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