Unavoidable chromatic patterns in 2-colorings of the complete graph

Abstract

We consider unavoidable chromatic patterns in 2-colorings of the edges of the complete graph. Several such problems are explored being a junction point between Ramsey theory, extremal graph theory (Tur\'an type problems), zero-sum Ramsey theory, and interpolation theorems in graph theory. A role-model of these problems is the following: Let G be a graph with e(G) edges. We say that G is omnitonal if there exists a function ot(n,G) such that the following holds true for n sufficiently large: For any 2-coloring f: E(Kn) \red, blue \ such that there are more than ot(n,G) edges from each color, and for any pair of non-negative integers r and b with r+b = e(G), there is a copy of G in Kn with exactly r red edges and b blue edges. We give a structural characterization of omnitonal graphs from which we deduce that omnitonal graphs are, in particular, bipartite graphs, and prove further that, for an omnitonal graph G, ot(n,G) = O(n2 - 1m), where m = m(G) depends only on G. We also present a class of graphs for which ot(n,G) = ex(n,G), the celebrated Tur\'an numbers. Many more results and problems of similar flavor are presented.