Criticality in Sperner’s Lemma

IF 1 2区数学 Q1 MATHEMATICS

Combinatorica Pub Date : 2024-05-14 DOI:10.1007/s00493-024-00104-4

Tomáš Kaiser, Matěj Stehlík, Riste Škrekovski

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Abstract

We answer a question posed by Gallai in 1969 concerning criticality in Sperner’s lemma, listed as Problem 9.14 in the collection of Jensen and Toft (Graph coloring problems, Wiley, New York, 1995). Sperner’s lemma states that if a labelling of the vertices of a triangulation of the d-simplex \(\Delta ^d\) with labels \(1, 2, \ldots , d+1\) has the property that (i) each vertex of \(\Delta ^d\) receives a distinct label, and (ii) any vertex lying in a face of \(\Delta ^d\) 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 \(d\le 2\), it is not difficult to show that for every facet \(\sigma \), there exists a labelling with the above properties where \(\sigma \) is the unique rainbow facet. For every \(d\ge 3\), 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 Motzkin on neighbourly polytopes.

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斯佩尔纳定理中的临界点

我们回答了加莱在 1969 年提出的一个关于斯佩尔纳 Lemma 临界性的问题，该问题被列为詹森和托夫特文集（《图形着色问题》，威利，纽约，1995 年）中的问题 9.14。Sperner's(斯佩尔纳)∞指出，如果d-复数\(\Δ ^d\)的三角形顶点的标签为\(1, 2, \ldots , d+1\)，那么(i)\(\Δ ^d\)的每个顶点都会收到一个不同的标签，(ii)位于\(\Δ ^d\)顶点上的任何顶点都会收到一个不同的标签、(ii) 位于 \(\Delta ^d\)的一个面中的任何顶点都与该面的一个顶点有相同的标签，那么就存在一个彩虹面（其顶点有成对的不同标签的面）。对于 \(d\le 2\) 来说，不难证明对于每一个面 \(\sigma \)，都存在一个具有上述性质的标签，其中 \(\sigma \)是唯一的彩虹面。然而，对于每一个 \(d\ge 3\), 我们都会构造出一个无限的例子族，在这个例子族中情况并非如此，这就意味着加莱问题的答案是一个推论。这个构造是基于一个 4 多面体的性质，而这个性质早先曾被用来推翻莫茨金（Motzkin）关于邻接多面体的一个说法。

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来源期刊

Combinatorica 数学-数学

CiteScore

1.90

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： COMBINATORICA publishes research papers in English in a variety of areas of combinatorics and the theory of computing, with particular emphasis on general techniques and unifying principles. Typical but not exclusive topics covered by COMBINATORICA are - Combinatorial structures (graphs, hypergraphs, matroids, designs, permutation groups). - Combinatorial optimization. - Combinatorial aspects of geometry and number theory. - Algorithms in combinatorics and related fields. - Computational complexity theory. - Randomization and explicit construction in combinatorics and algorithms.