Chromatic number is Ramsey distinguishing

Abstract

A graph G is Ramsey for a graph H if every colouring of the edges of G in two colours contains a monochromatic copy of H. Two graphs H1 and H2 are Ramsey equivalent if any graph G is Ramsey for H1 if and only if it is Ramsey for H2. A graph parameter s is Ramsey distinguishing if s(H1)≠ s(H2) implies that H1 and H2 are not Ramsey equivalent. In this paper we show that the chromatic number is a Ramsey distinguishing parameter. We also extend this to the multi-colour case and use a similar idea to find another graph parameter which is Ramsey distinguishing.