Forcing monochromatic induced subgraphs

Abstract

We prove that for all c∈ N and nonnull graphs H1,…,Ht, there exists n∈ N such that if G is a c-edge-colored complete graph with no monochromatic induced copy of the complete join of H1,…,Ht, then V(G) is the union of n sets V1,…,Vn such that within each set Vj with |Vj|≠ 1, the edges of some color form a graph that excludes at least one of H1,…,Ht as an induced subgraph. In fact, the same holds even if the colors overlap, and with a different list of graphs H1,…,Ht assigned to each color. When H1,…,Ht each have a single vertex, this is Ramsey's theorem, and when c=2, this is the "excluding pairs of graphs" theorem of Chudnovsky, Scott, and Seymour.