Canonical Ramsey theorem for graphs with clean intersections

Abstract

Extending earlier results of Nešetřil and Rödl [Selective graphs and hypergraphs, Ann. Discrete Math. 3 (1978), 181--189], we show that for every ordered graph F there exist an ordered graph H and a system HF of induced copies of F such that every colouring of the edges of H yields a canonically coloured copy of F from HF and any two copies from HF intersect either in a vertex or an edge or not at all. As a consequence, this allows us to construct, for any given ordered graph F, canonical Ramsey graphs H enjoying additional structural properties. In particular, H can have the same clique number as F and, provided F is not bipartite, the same odd girth. Moreover, if F is connected, then the copies of F from HF are not only induced, but their pairs of vertices also have the same distances in H as in F.