Colourings of the Cartesian Product of Graphs and Multiplicative Sidon Sets

Abstract

Let F be a family of connected bipartite graphs, each with at least three vertices. A proper vertex colouring of a graph G with no bichromatic subgraph in F is -free. The F-free chromatic number (G,F) of a graph G is the minimum number of colours in an F-free colouring of G. For appropriate choices of F, several well-known types of colourings fit into this framework, including acyclic colourings, star colourings, and distance-2 colourings. This paper studies F-free colourings of the cartesian product of graphs. Let H be the cartesian product of the graphs G1,G2,...,Gd. Our main result establishes an upper bound on the F-free chromatic number of H in terms of the maximum F-free chromatic number of the Gi and the following number-theoretic concept. A set S of natural numbers is k-multiplicative Sidon if ax=by implies a=b and x=y whenever x,y∈ S and 1≤ a,b≤ k. Suppose that (Gi,F)≤ k and S is a k-multiplicative Sidon set of cardinality d. We prove that (H,F) ≤ 1+2k· S. We then prove that the maximum density of a k-multiplicative Sidon set is (1/ k). It follows that (H,F) ≤ O(dk k). We illustrate the method with numerous examples, some of which generalise or improve upon existing results in the literature.

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