Alex Cameron
Published 2017-04-04Version 1
For fixed integers p and q, let f(n,p,q) denote the minimum number of colors needed to color all of the edges of the complete graph K_n such that no clique of p vertices spans fewer than q distinct colors. A construction is given which shows that f(n,5,6) < n^(1/2+o(1)). This improves upon the best known probabilistic upper bound of O(n^(3/5)) given by Erd\H{o}s and Gy\'arf\'as. It is also shown that f(n,5,6) = {\Omega}(n^(1/2)).
Comments: 13 pages, 5 figures. arXiv admin note: text overlap with arXiv:1702.06227
A $(5,5)$-coloring of $K_n$ with few colors
The Erdős-Gyárfás function with respect to Gallai-colorings
On the monochromatic Schur Triples type problem
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