The Erdos-Hajnal conjecture for rainbow triangles

Fox, Jacob and Grinshpun, A. and Pach, János (2015) The Erdos-Hajnal conjecture for rainbow triangles. JOURNAL OF COMBINATORIAL THEORY SERIES B, 111. pp. 75-125. ISSN 0095-8956

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Abstract

We prove that every 3-coloring of the edges of the complete graph on n vertices without a rainbow triangle contains a set of order Ω(n1/3log2 n) which uses at most two colors, and this bound is tight up to a constant factor. This verifies a conjecture of Hajnal which is a case of the multicolor generalization of the well-known Erdos-Hajnal conjecture. We further establish a generalization of this result. For fixed positive integers s and r with s≤r, we determine a constant cr,s such that the following holds. Every r-coloring of the edges of the complete graph on n vertices without a rainbow triangle contains a set of order Ω(ns(s-1)/r(r-1)(log n)cr,s) which uses at most s colors, and this bound is tight apart from the implied constant factor. The proof of the lower bound utilizes Gallai's classification of rainbow-triangle free edge-colorings of the complete graph, a new weighted extension of Ramsey's theorem, and a discrepancy inequality in edge-weighted graphs. The proof of the upper bound uses Erdos' lower bound on Ramsey numbers by considering lexicographic products of 2-edge-colorings of complete graphs without large monochromatic cliques. © 2014 Elsevier Inc.

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