Growth rates of the bipartite Erdős–Gyárfás function

Pub Date : 2024-07-11 DOI:10.1002/jgt.23149
Xihe Li, Hajo Broersma, Ligong Wang
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The bipartite Erdős–Gyárfás function <span></span><math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>r</mi>\n \n <mrow>\n <mo>(</mo>\n \n <mrow>\n <msub>\n <mi>K</mi>\n \n <mrow>\n <mi>n</mi>\n \n <mo>,</mo>\n \n <mi>n</mi>\n </mrow>\n </msub>\n \n <mo>,</mo>\n \n <msub>\n <mi>K</mi>\n \n <mrow>\n <mi>s</mi>\n \n <mo>,</mo>\n \n <mi>t</mi>\n </mrow>\n </msub>\n \n <mo>,</mo>\n \n <mi>q</mi>\n </mrow>\n \n <mo>)</mo>\n </mrow>\n </mrow>\n </mrow>\n <annotation> $r({K}_{n,n},{K}_{s,t},q)$</annotation>\n </semantics></math> is defined to be the minimum number of colors needed for <span></span><math>\n <semantics>\n <mrow>\n \n <mrow>\n <msub>\n <mi>K</mi>\n \n <mrow>\n <mi>n</mi>\n \n <mo>,</mo>\n \n <mi>n</mi>\n </mrow>\n </msub>\n </mrow>\n </mrow>\n <annotation> ${K}_{n,n}$</annotation>\n </semantics></math> to have a <span></span><math>\n <semantics>\n <mrow>\n \n <mrow>\n <mrow>\n <mo>(</mo>\n \n <mrow>\n <msub>\n <mi>K</mi>\n \n <mrow>\n <mi>s</mi>\n \n <mo>,</mo>\n \n <mi>t</mi>\n </mrow>\n </msub>\n \n <mo>,</mo>\n \n <mi>q</mi>\n </mrow>\n \n <mo>)</mo>\n </mrow>\n </mrow>\n </mrow>\n <annotation> $({K}_{s,t},q)$</annotation>\n </semantics></math>-coloring. For balanced complete bipartite graphs <span></span><math>\n <semantics>\n <mrow>\n \n <mrow>\n <msub>\n <mi>K</mi>\n \n <mrow>\n <mi>p</mi>\n \n <mo>,</mo>\n \n <mi>p</mi>\n </mrow>\n </msub>\n </mrow>\n </mrow>\n <annotation> ${K}_{p,p}$</annotation>\n </semantics></math>, the function <span></span><math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>r</mi>\n \n <mrow>\n <mo>(</mo>\n \n <mrow>\n <msub>\n <mi>K</mi>\n \n <mrow>\n <mi>n</mi>\n \n <mo>,</mo>\n \n <mi>n</mi>\n </mrow>\n </msub>\n \n <mo>,</mo>\n \n <msub>\n <mi>K</mi>\n \n <mrow>\n <mi>p</mi>\n \n <mo>,</mo>\n \n <mi>p</mi>\n </mrow>\n </msub>\n \n <mo>,</mo>\n \n <mi>q</mi>\n </mrow>\n \n <mo>)</mo>\n </mrow>\n </mrow>\n </mrow>\n <annotation> $r({K}_{n,n},{K}_{p,p},q)$</annotation>\n </semantics></math> was studied systematically in Axenovich et al. In this paper, we study the asymptotic behavior of this function for complete bipartite graphs <span></span><math>\n <semantics>\n <mrow>\n \n <mrow>\n <msub>\n <mi>K</mi>\n \n <mrow>\n <mi>s</mi>\n \n <mo>,</mo>\n \n <mi>t</mi>\n </mrow>\n </msub>\n </mrow>\n </mrow>\n <annotation> ${K}_{s,t}$</annotation>\n </semantics></math> that are not necessarily balanced. Our main results deal with thresholds and lower and upper bounds for the growth rate of this function, in particular for (sub)linear and (sub)quadratic growth. We also obtain new lower bounds for the balanced bipartite case, and improve several results given by Axenovich, Füredi and Mubayi. Our proof techniques are based on an extension to bipartite graphs of the recently developed Color Energy Method by Pohoata and Sheffer and its refinements, and a generalization of an old result due to Corrádi.</p>","PeriodicalId":0,"journal":{"name":"","volume":null,"pages":null},"PeriodicalIF":0.0,"publicationDate":"2024-07-11","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"https://onlinelibrary.wiley.com/doi/epdf/10.1002/jgt.23149","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"","FirstCategoryId":"100","ListUrlMain":"https://onlinelibrary.wiley.com/doi/10.1002/jgt.23149","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}
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Abstract

Given two graphs G , H $G,H$ and a positive integer q $q$ , an ( H , q ) $(H,q)$ -coloring of G $G$ is an edge-coloring of G $G$ such that every copy of H $H$ in G $G$ receives at least q $q$ distinct colors. The bipartite Erdős–Gyárfás function r ( K n , n , K s , t , q ) $r({K}_{n,n},{K}_{s,t},q)$ is defined to be the minimum number of colors needed for K n , n ${K}_{n,n}$ to have a ( K s , t , q ) $({K}_{s,t},q)$ -coloring. For balanced complete bipartite graphs K p , p ${K}_{p,p}$ , the function r ( K n , n , K p , p , q ) $r({K}_{n,n},{K}_{p,p},q)$ was studied systematically in Axenovich et al. In this paper, we study the asymptotic behavior of this function for complete bipartite graphs K s , t ${K}_{s,t}$ that are not necessarily balanced. Our main results deal with thresholds and lower and upper bounds for the growth rate of this function, in particular for (sub)linear and (sub)quadratic growth. We also obtain new lower bounds for the balanced bipartite case, and improve several results given by Axenovich, Füredi and Mubayi. Our proof techniques are based on an extension to bipartite graphs of the recently developed Color Energy Method by Pohoata and Sheffer and its refinements, and a generalization of an old result due to Corrádi.

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双向厄尔多斯-京法斯函数的增长率
给定两个图和一个正整数 , 的-着色是一个边着色,使得 in 的每一个副本都得到至少不同的颜色。双向厄尔多斯-雅尔法函数的定义是,要有一个-着色所需的最少颜色数。在本文中,我们将研究该函数在不一定平衡的完整双方图中的渐近行为。我们的主要结果涉及该函数增长率的阈值、下限和上限,特别是(亚)线性增长和(亚)二次增长。我们还获得了平衡两方情况下的新下限,并改进了阿克森诺维奇、富雷迪和穆巴伊给出的几个结果。我们的证明技术是基于 Pohoata 和 Sheffer 最近开发的彩色能量法及其改进版,以及对 Corrádi 提出的一个旧结果的推广。
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