The Erdos-Gy\'arf\'as function f(n, 4, 5) = 56 n + o(n) -- so Gy\'arf\'as was right

Abstract

A (4, 5)-coloring of Kn is an edge-coloring of Kn where every 4-clique spans at least five colors. We show that there exist (4, 5)-colorings of Kn using 56 n + o(n) colors. This settles a disagreement between Erdos and Gy\'arf\'as reported in their 1997 paper. Our construction uses a randomized process which we analyze using the so-called differential equation method to establish dynamic concentration. In particular, our coloring process uses random triangle removal, a process first introduced by Bollob\'as and Erdos, and analyzed by Bohman, Frieze and Lubetzky.

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