An extension of the rainbow Erdos-Rothschild problem

Abstract

Given integers r ≥ 2, k ≥ 3 and 2 ≤ s ≤ k2, and a graph G, we consider r-edge-colorings of G with no copy of a complete graph Kk on k vertices where s or more colors appear, which are called Pk,s-free r-colorings. We show that, for large n and r ≥ r0(k,s), the (k-1)-partite Tur\'an graph Tk-1(n) on n vertices yields the largest number of Pk,s-free r-colorings among all n-vertex graphs, and that it is the unique graph with this property.