面完全图目录

arXiv - MATH - Combinatorics Pub Date : 2024-09-17 DOI:arxiv-2409.11249

James Tilley, Stan Wagon, Eric Weisstein

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引用次数: 0

摘要

当地图中的区域有非空交点时，就认为它们是相邻的（而不是传统的要求在线段上有交点的观点），这就产生了面完全图的概念：当位于一个面上的每两个顶点之间都添加了边时，平面图就变得完全了。在此，我们列出了面完全图的完整目录：它们可分为七种类型。一个结果是，如果 q 是面完全平面图 G 中最大面的大小，那么 G 至少有 Floor[3/2 q] 个顶点。这个约束是已知的，但我们的证明与陈，格里尼和帕帕季米特留 1998 年的方法完全不同。我们的方法还得出了具有 n 个顶点的 2 连接面完整图的数量。我们还证明了，如果一个平面图最多有两个大小为 4 的面，而没有更大的面，那么在每个 4 面上加上两条对角线，就能得到一个可 5 色的图。

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A Catalog of Facially Complete Graphs

Considering regions in a map to be adjacent when they have nonempty intersection (as opposed to the traditional view requiring intersection in a linear segment) leads to the concept of a facially complete graph: a plane graph that becomes complete when edges are added between every two vertices that lie on a face. Here we present a complete catalog of facially complete graphs: they fall into seven types. A consequence is that if q is the size of the largest face in a plane graph G that is facially complete, then G has at most Floor[3/2 q] vertices. This bound was known, but our proof is completely different from the 1998 approach of Chen, Grigni, and Papadimitriou. Our method also yields a count of the 2-connected facially complete graphs with n vertices. We also show that if a plane graph has at most two faces of size 4 and no larger face, then the addition of both diagonals to each 4-face leads to a graph that is 5-colorable.

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arXiv - MATH - Combinatorics

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