Distribution of colors in Gallai colorings

Abstract

A Gallai coloring is an edge coloring that avoids triangles colored with three different colors. Given integers e1 e2 … ek with Σi=1kei=n 2 for some n, does there exist a Gallai k-coloring of Kn with ei edges in color i? In this paper, we give several sufficient conditions and one necessary condition to guarantee a positive answer to the above question. In particular, we prove the existence of a Gallai-coloring if e1-ek 1 and k n/2. We prove that for any integer k 3 there is a (unique) integer g(k) with the following property: there exists a Gallai k-coloring of Kn with ei edges in color i for every e1… ek satisfying Σi=1kei=n 2, if and only if n g(k). We show that g(3)=5, g(4)=8, and 2k-2 g(k) 8k2+1 for every k 3.