On a conjecture of Conlon, Fox and Wigderson

Abstract

For graphs G and H, the Ramsey number r(G,H) is the smallest positive integer N such that any red/blue edge coloring of the complete graph KN contains either a red G or a blue H. A book Bn is a graph consisting of n triangles all sharing a common edge. Recently, Conlon, Fox and Wigderson conjectured that for any 0<α<1, the random lower bound r(Bα n,Bn) (α+1)2n+o(n) is not tight. In other words, there exists some constant β>(α+1)2 such that r(Bα n,Bn) β n for all sufficiently large n. This conjecture holds for every α< 1/6 by a result of Nikiforov and Rousseau from 2005, which says that in this range r(Bα n,Bn)=2n+3 for all sufficiently large n. We disprove the conjecture of Conlon, Fox and Wigderson. Indeed, we show that the random lower bound is asymptotically tight for every 1/4≤ α≤ 1. Moreover, we show that for any 1/6≤ α 1/4 and large n, r(Bα n, Bn)( 32+3α) n+o(n), where the inequality is asymptotically tight when α=1/6 or 1/4. We also give a lower bound of r(Bα n, Bn) for 1/6α< 52-163121≈0.2007, showing that the random lower bound is not tight, i.e., the conjecture of Conlon, Fox and Wigderson holds in this interval.