A Systematic Approach to Crossing Numbers of Cartesian Products with Paths

arXiv - MATH - Combinatorics Pub Date : 2024-09-10 DOI:arxiv-2409.06755

Zayed Asiri, Ryan Burdett, Markus Chimani, Michael Haythorpe, Alex Newcombe, Mirko H. Wagner

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Abstract

Determining the crossing numbers of Cartesian products of small graphs with arbitrarily large paths has been an ongoing topic of research since the 1970s. Doing so requires the establishment of coincident upper and lower bounds; the former is usually demonstrated by providing a suitable drawing procedure, while the latter often requires substantial theoretical arguments. Many such papers have been published, which typically focus on just one or two small graphs at a time, and use ad hoc arguments specific to those graphs. We propose a general approach which, when successful, establishes the required lower bound. This approach can be applied to the Cartesian product of any graph with arbitrarily large paths, and in each case involves solving a modified version of the crossing number problem on a finite number (typically only two or three) of small graphs. We demonstrate the potency of this approach by applying it to Cartesian products involving all 133 graphs $G$ of orders five or six, and show that it is successful in 128 cases. This includes 60 cases which a recent survey listed as either undetermined, or determined only in journals without adequate peer review.

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直角坐标积与路径交叉数的系统方法

自 20 世纪 70 年代以来，确定具有任意大路径的小型图的笛卡尔积的交叉数一直是一个持续的研究课题。要做到这一点，需要建立重合的上限和下限；前者通常通过提供合适的绘制过程来证明，而后者通常需要大量的理论论证。已发表的许多此类论文通常同时只关注一两个小图形，并使用针对这些图形的特别论证。我们提出了一种通用方法，一旦成功，就能建立所需的下界。这种方法可以应用于任何具有任意大路径的图的笛卡尔积，并且在每种情况下都涉及在有限数量（通常只有两到三个）的小图上求解修正版的交叉数问题。我们将这种方法应用于涉及所有 133 个五阶或六阶图 $G$ 的笛卡尔积，证明了它的威力，并证明它在 128 个案例中取得了成功。其中有 60 个案例在最近的调查中被列为未确定或仅在未经同行充分评议的期刊中确定。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - MATH - Combinatorics

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