Tight Ramsey Bounds for Multiple Copies of a Graph

Q2 Mathematics

Advances in Combinatorics Pub Date : 2021-08-26 DOI:10.19086/aic.2023.1

Matija Bucić, B. Sudakov

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引用次数: 3

Abstract

The Ramsey number r(G) of a graph G is the smallest integer n such that any 2 colouring of the edges of a clique on n vertices contains a monochromatic copy of G. Determining the Ramsey number of G is a central problem of Ramsey theory with long and illustrious history. Despite this there are precious few classes of graphs G for which the value of r(G) is known exactly. One such family consists of large vertex disjoint unions of a fixed graph H, we denote such a graph, consisting of n copies of H by nH. This classical result was proved by Burr, Erd˝os and Spencer in 1975, who showed r(nH) = (2jHj􀀀a(H))n+c, for some c = c(H), provided n is large enough. Since it did not follow from their arguments, Burr, Erd˝os and Spencer further asked to determine the number of copies we need to take in order to see this long term behaviour and the value of c. More than 30 years ago Burr gave a way of determining c(H), which only applies when the number of copies n is triple exponential in jHj. In this paper we give an essentially tight answer to this very old problem of Burr, Erd˝os and Spencer by showing that the long term behaviour occurs already when the number of copies is single exponential.

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图的多个副本的紧拉姆齐边界

图G的拉姆齐数r（G）是最小的整数n，使得团在n个顶点上的边的任意2着色都包含G的单色副本。确定G的拉姆齐数是拉姆齐理论的一个中心问题，具有悠久而辉煌的历史。尽管如此，仍有极少数几类图G的r（G）的值是精确已知的。一个这样的族由固定图H的大顶点不相交并集组成，我们表示这样的图，由H的n个副本乘以nH组成。这一经典结果在1975年被Burr、Erdõos和Spencer证明，他们证明了r（nH）=（2jHj􀀀a（H））n+c，对于某些c＝c（H），条件是n足够大。由于这与他们的论点不符，Burr、Erdõos和Spencer进一步要求确定我们需要获得的拷贝数，以了解这种长期行为和c的值。30多年前，Burr给出了一种确定c（H）的方法，该方法仅适用于jHj中拷贝数n为三指数的情况。在本文中，我们通过证明当拷贝数为单指数时，长期行为已经发生，对Burr、Erdõos和Spencer这一非常古老的问题给出了一个基本上严密的答案。

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

Advances in Combinatorics Mathematics-Discrete Mathematics and Combinatorics

CiteScore

3.10

自引率

0.00%

发文量