On the Erd os--Hajnal problem in the case of 3-graphs
Abstract
Let m(n,r) denote the minimal number of edges in an n-uniform hypergraph which is not r-colorable. For the broad history of the problem see [RaiSh]. It is known that for a fixed n the sequence \[ m(n,r)rn \] has a limit. The only trivial case is n=2 in which m(2,r) = r+12. In this note we focus on the case n=3. First, we compare the existing methods in this case and then improve the lower bound.
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