Tara Abrishami , Maria Chudnovsky , Sepehr Hajebi , Sophie Spirkl
{"title":"诱导子图和树分解 VI.带 2 切集的图","authors":"Tara Abrishami , Maria Chudnovsky , Sepehr Hajebi , Sophie Spirkl","doi":"10.1016/j.disc.2024.114195","DOIUrl":null,"url":null,"abstract":"<div><p>This paper continues a series of papers investigating the following question: which hereditary graph classes have bounded treewidth? We call a graph <em>t-clean</em> if it does not contain as an induced subgraph the complete graph <span><math><msub><mrow><mi>K</mi></mrow><mrow><mi>t</mi></mrow></msub></math></span>, the complete bipartite graph <span><math><msub><mrow><mi>K</mi></mrow><mrow><mi>t</mi><mo>,</mo><mi>t</mi></mrow></msub></math></span>, subdivisions of a <span><math><mo>(</mo><mi>t</mi><mo>×</mo><mi>t</mi><mo>)</mo></math></span>-wall, and line graphs of subdivisions of a <span><math><mo>(</mo><mi>t</mi><mo>×</mo><mi>t</mi><mo>)</mo></math></span>-wall. It is known that graphs with bounded treewidth must be <em>t</em>-clean for some <em>t</em>; however, it is not true that every <em>t</em>-clean graph has bounded treewidth. In this paper, we show that three types of cutsets, namely clique cutsets, 2-cutsets, and 1-joins, interact well with treewidth and with each other, so graphs that are decomposable by these cutsets into basic classes of bounded treewidth have bounded treewidth. We apply this result to two hereditary graph classes, the class of (<span><math><mi>I</mi><mi>S</mi><msub><mrow><mi>K</mi></mrow><mrow><mn>4</mn></mrow></msub></math></span>, wheel)-free graphs and the class of graphs with no cycle with a unique chord. These classes were previously studied and decomposition theorems were obtained for both classes. Our main results are that <em>t</em>-clean (<span><math><mi>I</mi><mi>S</mi><msub><mrow><mi>K</mi></mrow><mrow><mn>4</mn></mrow></msub></math></span>, wheel)-free graphs have bounded treewidth and that <em>t</em>-clean graphs with no cycle with a unique chord have bounded treewidth.</p></div>","PeriodicalId":50572,"journal":{"name":"Discrete Mathematics","volume":"348 1","pages":"Article 114195"},"PeriodicalIF":0.7000,"publicationDate":"2024-09-02","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"https://www.sciencedirect.com/science/article/pii/S0012365X24003261/pdfft?md5=e8262a89abc8297f51785b66fc0ac9c4&pid=1-s2.0-S0012365X24003261-main.pdf","citationCount":"0","resultStr":"{\"title\":\"Induced subgraphs and tree decompositions VI. Graphs with 2-cutsets\",\"authors\":\"Tara Abrishami , Maria Chudnovsky , Sepehr Hajebi , Sophie Spirkl\",\"doi\":\"10.1016/j.disc.2024.114195\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"<div><p>This paper continues a series of papers investigating the following question: which hereditary graph classes have bounded treewidth? We call a graph <em>t-clean</em> if it does not contain as an induced subgraph the complete graph <span><math><msub><mrow><mi>K</mi></mrow><mrow><mi>t</mi></mrow></msub></math></span>, the complete bipartite graph <span><math><msub><mrow><mi>K</mi></mrow><mrow><mi>t</mi><mo>,</mo><mi>t</mi></mrow></msub></math></span>, subdivisions of a <span><math><mo>(</mo><mi>t</mi><mo>×</mo><mi>t</mi><mo>)</mo></math></span>-wall, and line graphs of subdivisions of a <span><math><mo>(</mo><mi>t</mi><mo>×</mo><mi>t</mi><mo>)</mo></math></span>-wall. It is known that graphs with bounded treewidth must be <em>t</em>-clean for some <em>t</em>; however, it is not true that every <em>t</em>-clean graph has bounded treewidth. In this paper, we show that three types of cutsets, namely clique cutsets, 2-cutsets, and 1-joins, interact well with treewidth and with each other, so graphs that are decomposable by these cutsets into basic classes of bounded treewidth have bounded treewidth. We apply this result to two hereditary graph classes, the class of (<span><math><mi>I</mi><mi>S</mi><msub><mrow><mi>K</mi></mrow><mrow><mn>4</mn></mrow></msub></math></span>, wheel)-free graphs and the class of graphs with no cycle with a unique chord. These classes were previously studied and decomposition theorems were obtained for both classes. Our main results are that <em>t</em>-clean (<span><math><mi>I</mi><mi>S</mi><msub><mrow><mi>K</mi></mrow><mrow><mn>4</mn></mrow></msub></math></span>, wheel)-free graphs have bounded treewidth and that <em>t</em>-clean graphs with no cycle with a unique chord have bounded treewidth.</p></div>\",\"PeriodicalId\":50572,\"journal\":{\"name\":\"Discrete Mathematics\",\"volume\":\"348 1\",\"pages\":\"Article 114195\"},\"PeriodicalIF\":0.7000,\"publicationDate\":\"2024-09-02\",\"publicationTypes\":\"Journal Article\",\"fieldsOfStudy\":null,\"isOpenAccess\":false,\"openAccessPdf\":\"https://www.sciencedirect.com/science/article/pii/S0012365X24003261/pdfft?md5=e8262a89abc8297f51785b66fc0ac9c4&pid=1-s2.0-S0012365X24003261-main.pdf\",\"citationCount\":\"0\",\"resultStr\":null,\"platform\":\"Semanticscholar\",\"paperid\":null,\"PeriodicalName\":\"Discrete Mathematics\",\"FirstCategoryId\":\"100\",\"ListUrlMain\":\"https://www.sciencedirect.com/science/article/pii/S0012365X24003261\",\"RegionNum\":3,\"RegionCategory\":\"数学\",\"ArticlePicture\":[],\"TitleCN\":null,\"AbstractTextCN\":null,\"PMCID\":null,\"EPubDate\":\"\",\"PubModel\":\"\",\"JCR\":\"Q2\",\"JCRName\":\"MATHEMATICS\",\"Score\":null,\"Total\":0}","platform":"Semanticscholar","paperid":null,"PeriodicalName":"Discrete Mathematics","FirstCategoryId":"100","ListUrlMain":"https://www.sciencedirect.com/science/article/pii/S0012365X24003261","RegionNum":3,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q2","JCRName":"MATHEMATICS","Score":null,"Total":0}
引用次数: 0
摘要
本文是研究以下问题的系列论文的续篇:哪些遗传图类具有有界树宽?如果一个图的诱导子图不包含完整图 Kt、完整二方图 Kt,t、(t×t)-墙的细分图以及(t×t)-墙的细分图的线图,我们就称该图为 t-洁净图。众所周知,对于某个 t,具有有界树宽(treewidth)的图一定是 t 净图;但是,并不是每个 t 净图都具有有界树宽(treewidth)。在本文中,我们证明了三类切集(即簇切集、2-切集和 1-连接)与树宽以及它们之间的相互作用,因此可由这些切集分解为有界树宽基本类的图都具有有界树宽。我们将这一结果应用于两个遗传图类,即无(ISK4, 轮)图类和无唯一弦循环图类。以前曾对这两类图进行过研究,并得到了这两类图的分解定理。我们的主要结果是:t-clean (ISK4, wheel)-free graphs 具有有界树宽;t-clean graphs with no cycle with a unique chord 具有有界树宽。
Induced subgraphs and tree decompositions VI. Graphs with 2-cutsets
This paper continues a series of papers investigating the following question: which hereditary graph classes have bounded treewidth? We call a graph t-clean if it does not contain as an induced subgraph the complete graph , the complete bipartite graph , subdivisions of a -wall, and line graphs of subdivisions of a -wall. It is known that graphs with bounded treewidth must be t-clean for some t; however, it is not true that every t-clean graph has bounded treewidth. In this paper, we show that three types of cutsets, namely clique cutsets, 2-cutsets, and 1-joins, interact well with treewidth and with each other, so graphs that are decomposable by these cutsets into basic classes of bounded treewidth have bounded treewidth. We apply this result to two hereditary graph classes, the class of (, wheel)-free graphs and the class of graphs with no cycle with a unique chord. These classes were previously studied and decomposition theorems were obtained for both classes. Our main results are that t-clean (, wheel)-free graphs have bounded treewidth and that t-clean graphs with no cycle with a unique chord have bounded treewidth.
期刊介绍:
Discrete Mathematics provides a common forum for significant research in many areas of discrete mathematics and combinatorics. Among the fields covered by Discrete Mathematics are graph and hypergraph theory, enumeration, coding theory, block designs, the combinatorics of partially ordered sets, extremal set theory, matroid theory, algebraic combinatorics, discrete geometry, matrices, and discrete probability theory.
Items in the journal include research articles (Contributions or Notes, depending on length) and survey/expository articles (Perspectives). Efforts are made to process the submission of Notes (short articles) quickly. The Perspectives section features expository articles accessible to a broad audience that cast new light or present unifying points of view on well-known or insufficiently-known topics.