Density of rainbow triangles and properly colored K4's

Abstract

We establish a sharp upper bound on the number of properly 3-edge-colored K4's in graphs with R red, G green and B blue edges. We give a computer-free flag-algebra proof of this bound, and we also convert our proof into a classical counting proof and an entropy proof. Additionally, for every k 4, for a fixed rainbow coloring F of a complete graph Kk, we give a sharp upper bound on the number copies of F in a k2-edge-colored graph. Our proof of this result relies on a new flag-algebra version of Hölder's inequality. We also give a computer-free flag-algebra proof of the fact that a graph with R red, G green, and B blue edges has at most 2 RGB rainbow triangles, which was originally proven by T.-W. Chao and H.-H. H. Yu using the entropy method. We also provide an even shorter entropy proof of their result.