Density version of the Ramsey problem and the directed Ramsey problem

Abstract

We discuss a variant of the Ramsey and the directed Ramsey problem. First, consider a complete graph on n vertices and a two-coloring of the edges such that every edge is colored with at least one color and the number of bicolored edges |ERB| is given. The aim is to find the maximal size f of a monochromatic clique which is guaranteed by such a coloring. Analogously, in the second problem we consider semicomplete digraph on n vertices such that the number of bi-oriented edges |Ebi| is given. The aim is to bound the size F of the maximal transitive subtournament that is guaranteed by such a digraph. Applying probabilistic and analytic tools and constructive methods we show that if |ERB|=|Ebi| = pn 2, (p∈ [0,1)), then f, F < Cp(n) where Cp only depend on p, while if m=n 2 - |ERB| <n3/2 then f= (n2m+n). The latter case is strongly connected to Tur\'an-type extremal graph theory.