The Ramsey theory of the universal homogeneous triangle-free graph

Abstract

The universal homogeneous triangle-free graph, constructed by Henson and denoted H3, is the triangle-free analogue of the Rado graph. While the Ramsey theory of the Rado graph has been completely established, beginning with Erdos-Hajnal-Pos\'a and culminating in work of Sauer and Laflamme-Sauer-Vuksanovic, the Ramsey theory of H3 had only progressed to bounds for vertex colorings (Komj\'ath-R\"odl) and edge colorings (Sauer). This was due to a lack of broadscale techniques. We solve this problem in general: For each finite triangle-free graph G, there is a finite number T(G) such that for any coloring of all copies of G in H3 into finitely many colors, there is a subgraph of H3 which is again universal homogeneous triangle-free in which the coloring takes no more than T(G) colors. This is the first such result for a homogeneous structure omitting copies of some non-trivial finite structure. The proof entails developments of new broadscale techniques, including a flexible method for constructing trees which code H3 and the development of their Ramsey theory.