Finite Three-Colourable (0,2)-Graphs Are Bipartite

Abstract

A theorem of Payan says that a cubelike graph cannot have chromatic number exactly three. A nearby question, usually discussed as Payan's finite (0,2)-graph question, asks whether a finite graph in which every two distinct vertices have either zero or two common neighbours can have chromatic number exactly three. The finite hypothesis is meaningful: infinite three-chromatic (0,2)-graphs can be constructed Payan1992. We prove that every finite three-colourable (0,2)-graph is bipartite. Thus, no finite (0,2)-graph has chromatic number exactly three.

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