Tur\'an and Ramsey-type results for unavoidable subgraphs

Abstract

We study Tur\'an and Ramsey-type problems on edge-colored graphs. An edge-colored graph is called -balanced if each color class contains at least an -proportion of its edges. Given a family F of edge-colored graphs, the Ramsey function R(, F) is the smallest n for which any -balanced Kn must contain a copy of an F∈F, and the Tur\'an function ex(, n, F) is the maximum number of edges in an n-vertex -balanced graph which avoids all of F. In this paper, we consider this Tur\'an function for several classes of edge-colored graphs, we show that the Ramsey function is linear for bounded degree graphs, and we prove a theorem that gives a relationship between the two parameters.