Crux, space constraints and subdivisions

IF 1.2 1区数学 Q1 MATHEMATICS Journal of Combinatorial Theory Series B Pub Date : 2024-09-19 DOI:10.1016/j.jctb.2024.08.005

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引用次数: 0

Abstract

For a given graph H, its subdivisions carry the same topological structure. The existence of H-subdivisions within a graph G has deep connections with topological, structural and extremal properties of G. One prominent example of such a connection, due to Bollobás and Thomason and independently Komlós and Szemerédi, asserts that the average degree of G being d ensures a $K_{Ω (\sqrt{d})}$ -subdivision in G. Although this square-root bound is best possible, various results showed that much larger clique subdivisions can be found in a graph for many natural classes. We investigate the connection between crux, a notion capturing the essential order of a graph, and the existence of large clique subdivisions. This reveals the unifying cause underpinning all those improvements for various classes of graphs studied. Roughly speaking, when embedding subdivisions, natural space constraints arise; and such space constraints can be measured via crux.

Our main result gives an asymptotically optimal bound on the size of a largest clique subdivision in a generic graph G, which is determined by both its average degree and its crux size. As corollaries, we obtain

•
a characterization of extremal graphs for which the square-root bound above is tight: they are essentially disjoint unions of graphs having crux size linear in d;
•
a unifying approach to find a clique subdivision of almost optimal size in graphs which do not contain a fixed bipartite graph as a subgraph;
•
and that the clique subdivision size in random graphs $G (n, p)$ witnesses a dichotomy: when $p = ω (n^{- 1 / 2})$ , the barrier is the space, while when $p = o (n^{- 1 / 2})$ , the bottleneck is the density.

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核心、空间限制和分区

对于给定的图 H，其细分图具有相同的拓扑结构。图 G 中 H 细分的存在与 G 的拓扑、结构和极值特性有着深刻的联系。这种联系的一个突出例子是由 Bollobás 和 Thomason 以及 Komlós 和 Szemerédi 提出的，他们断言 G 的平均度数为 d 可以确保 G 中存在 KΩ(d)-细分。我们研究了crux（一种捕捉图的基本顺序的概念）与大簇细分的存在之间的联系。这揭示了所研究的各类图中所有这些改进的统一原因。我们的主要结果给出了通用图 G 中最大簇细分大小的渐近最优约束，该约束由其平均度和簇大小共同决定。作为推论，我们得到了极值图的特征，对于这些极值图，上述平方根约束是紧密的：它们本质上是轴心大小与 d 成线性关系的图的不相交联合体；- 在不包含固定二方图作为子图的图中找到几乎最优大小的簇细分的统一方法；- 随机图 G(n,p) 中的簇细分大小呈现二分法：当 p=ω(n-1/2) 时，障碍是空间，而当 p=o(n-1/2) 时，瓶颈是密度。

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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来源期刊

Journal of Combinatorial Theory Series B 数学-数学

CiteScore

2.70

自引率

14.30%

发文量

审稿时长

6-12 weeks

期刊介绍： The Journal of Combinatorial Theory publishes original mathematical research dealing with theoretical and physical aspects of the study of finite and discrete structures in all branches of science. Series B is concerned primarily with graph theory and matroid theory and is a valuable tool for mathematicians and computer scientists.

期刊最新文献

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