Almost-rainbow edge-colorings of some small subgraphs

Abstract

Let f(n,p,q) be the minimum number of colors necessary to color the edges of Kn so that every Kp is at least q-colored. We improve current bounds on the 7/4n-3, slightly improving the bound of Axenovich. We make small improvements on bounds of Erd os and Gy\'arf\'as by showing 5/6n+1≤ f(n,4,5) and for all even n 1 3, f(n,4,5)≤ n-1 . For a complete bipartite graph G=Kn,n, we show an n-color construction to color the edges of G so that every C4⊂eq G$ is colored by at least three colors. This improves the best known upper bound of M. Axenovich, Z. F\"uredi, and D. Mubayi.