Phase transitions of the Erdos-Gy\'arf\'as function
Abstract
Given positive integers p,q. For any integer k2, an edge coloring of the complete k-graph Kn(k) is said to be a (p,q)-coloring if every copy of Kp(k) receives at least q colors. The Erdos-Gy\'arf\'as function fk(n,p,q) is the minimum number of colors that are needed for Kn(k) to have a (p,q)-coloring. Conlon, Fox, Lee and Sudakov (IMRN, 2015) conjectured that for any positive integers p, k and i with k3 and 1 i<k, fk(n,p,p-ik-i)=((i-1)n)o(1), where (i)n is an iterated i-fold logarithm in n. It has been verified to be true for k=3, p=4, i=1 by Conlon et. al (IMRN, 2015), for k=3, p=5, i=2 by Mubayi (JGT, 2016), and for all k 4, p=k+1,i=1 by B. Janzer and O. Janzer (JCTB, 2024). In this paper, we give new constructions and show that this conjecture holds for infinitely many new cases, i.e., it holds for all k4, p=k+2 and i=k-1.
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