On the minimal monochromatic K4-density
Abstract
We use Razborov's flag algebra method to show a new asymptotic lower bound for the minimal density m4 of monochromatic K4's in any 2-coloring of the edges of the complete graph Kn on n vertices. The hitherto best known lower bound was obtained by Giraud, who proved that m4>1/46, whereas the best known upper bound by Thomason states that m4<1/33. We can show that m4>1/35.
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