Counting monochromatic copies of K4: a new lower bound for the Ramsey multiplicity problem
Abstract
Denote by k4(n) the minimal number of monochromatic copies of a K4 in a 2-colouring of the edges of Kn and let c4 := lim k4(n)/n4. The best known bounds so far were given by Thomason, who proved that c4 < 1/33 ≈ 0.0303, and Giraud, who showed that c4 > 1/46 ≈ 0.0217. In this paper we prove the new lower bound c4 > 204603019 / 7112448000 > 0.0287.
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