Criticality in Sperner's Lemma

Abstract

We answer a question posed by T. Gallai in 1969 concerning criticality in Sperner's lemma, listed as Problem 9.14 in the collection of Jensen and Toft [Graph coloring problems, John Wiley & Sons, Inc., New York, 1995]. Sperner's lemma states that if a labelling of the vertices of a triangulation of the d-simplex d with labels 1, 2, …, d+1 has the property that (i) each vertex of d receives a distinct label, and (ii) any vertex lying in a face of d has the same label as one of the vertices of that face, then there exists a rainbow facet (a facet whose vertices have pairwise distinct labels). For d≤ 2, it is not difficult to show that for every facet σ, there exists a labelling with the above properties where σ is the unique rainbow facet. For every d≥ 3, however, we construct an infinite family of examples where this is not the case, which implies the answer to Gallai's question as a corollary. The construction is based on the properties of a 4-polytope which had been used earlier to disprove a claim of T. S. Motzkin on neighbourly polytopes.