论四临界定向图中的最小弧数

Pub Date : 2024-07-29 DOI:10.1002/jgt.23159

Frédéric Havet, Lucas Picasarri-Arrieta, Clément Rambaud

{"title":"论四临界定向图中的最小弧数","authors":"Frédéric Havet, Lucas Picasarri-Arrieta, Clément Rambaud","doi":"10.1002/jgt.23159","DOIUrl":null,"url":null,"abstract":"The dichromatic number <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mover>\n <mi>χ</mi>\n \n <mo>→</mo>\n </mover>\n \n <mrow>\n <mo>(</mo>\n \n <mi>D</mi>\n \n <mo>)</mo>\n </mrow>\n </mrow>\n </mrow>\n <annotation> $\\overrightarrow{\\chi }(D)$</annotation>\n </semantics></math> of a digraph <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>D</mi>\n </mrow>\n </mrow>\n <annotation> $D$</annotation>\n </semantics></math> is the minimum number of colours needed to colour the vertices of a digraph such that each colour class induces an acyclic subdigraph. A digraph <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>D</mi>\n </mrow>\n </mrow>\n <annotation> $D$</annotation>\n </semantics></math> is <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>k</mi>\n </mrow>\n </mrow>\n <annotation> $k$</annotation>\n </semantics></math>-dicritical if <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mover>\n <mi>χ</mi>\n \n <mo>→</mo>\n </mover>\n \n <mrow>\n <mo>(</mo>\n \n <mi>D</mi>\n \n <mo>)</mo>\n </mrow>\n \n <mo>=</mo>\n \n <mi>k</mi>\n </mrow>\n </mrow>\n <annotation> $\\overrightarrow{\\chi }(D)=k$</annotation>\n </semantics></math> and each proper subdigraph <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>H</mi>\n </mrow>\n </mrow>\n <annotation> $H$</annotation>\n </semantics></math> of <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>D</mi>\n </mrow>\n </mrow>\n <annotation> $D$</annotation>\n </semantics></math> satisfies <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mover>\n <mi>χ</mi>\n \n <mo>→</mo>\n </mover>\n \n <mrow>\n <mo>(</mo>\n \n <mi>H</mi>\n \n <mo>)</mo>\n </mrow>\n \n <mo><</mo>\n \n <mi>k</mi>\n </mrow>\n </mrow>\n <annotation> $\\overrightarrow{\\chi }(H)\\lt k$</annotation>\n </semantics></math>. For integers <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>k</mi>\n </mrow>\n </mrow>\n <annotation> $k$</annotation>\n </semantics></math> and <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>n</mi>\n </mrow>\n </mrow>\n <annotation> $n$</annotation>\n </semantics></math>, we define <math>\n <semantics>\n <mrow>\n \n <mrow>\n <msub>\n <mi>d</mi>\n \n <mi>k</mi>\n </msub>\n \n <mrow>\n <mo>(</mo>\n \n <mi>n</mi>\n \n <mo>)</mo>\n </mrow>\n </mrow>\n </mrow>\n <annotation> ${d}_{k}(n)$</annotation>\n </semantics></math> (resp., <math>\n <semantics>\n <mrow>\n \n <mrow>\n <msub>\n <mi>o</mi>\n \n <mi>k</mi>\n </msub>\n \n <mrow>\n <mo>(</mo>\n \n <mi>n</mi>\n \n <mo>)</mo>\n </mrow>\n </mrow>\n </mrow>\n <annotation> ${o}_{k}(n)$</annotation>\n </semantics></math>) as the minimum number of arcs possible in a <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>k</mi>\n </mrow>\n </mrow>\n <annotation> $k$</annotation>\n </semantics></math>-dicritical digraph (resp., oriented graph). Kostochka and Stiebitz have shown that <math>\n <semantics>\n <mrow>\n \n <mrow>\n <msub>\n <mi>d</mi>\n \n <mn>4</mn>\n </msub>\n \n <mrow>\n <mo>(</mo>\n \n <mi>n</mi>\n \n <mo>)</mo>\n </mrow>\n \n <mo>⩾</mo>\n \n <mfrac>\n <mn>10</mn>\n \n <mn>3</mn>\n </mfrac>\n \n <mi>n</mi>\n \n <mo>−</mo>\n \n <mfrac>\n <mn>4</mn>\n \n <mn>3</mn>\n </mfrac>\n </mrow>\n </mrow>\n <annotation> ${d}_{4}(n)\\geqslant \\frac{10}{3}n-\\frac{4}{3}$</annotation>\n </semantics></math>. They also conjectured that there is a constant <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>c</mi>\n </mrow>\n </mrow>\n <annotation> $c$</annotation>\n </semantics></math> such that <math>\n <semantics>\n <mrow>\n \n <mrow>\n <msub>\n <mi>o</mi>\n \n <mi>k</mi>\n </msub>\n \n <mrow>\n <mo>(</mo>\n \n <mi>n</mi>\n \n <mo>)</mo>\n </mrow>\n \n <mo>⩾</mo>\n \n <mi>c</mi>\n \n <msub>\n <mi>d</mi>\n \n <mi>k</mi>\n </msub>\n \n <mrow>\n <mo>(</mo>\n \n <mi>n</mi>\n \n <mo>)</mo>\n </mrow>\n </mrow>\n </mrow>\n <annotation> ${o}_{k}(n)\\geqslant c{d}_{k}(n)$</annotation>\n </semantics></math> for <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>k</mi>\n \n <mo>⩾</mo>\n \n <mn>3</mn>\n </mrow>\n </mrow>\n <annotation> $k\\geqslant 3$</annotation>\n </semantics></math> and <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>n</mi>\n </mrow>\n </mrow>\n <annotation> $n$</annotation>\n </semantics></math> large enough. This conjecture is known to be true for <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>k</mi>\n \n <mo>=</mo>\n \n <mn>3</mn>\n </mrow>\n </mrow>\n <annotation> $k=3$</annotation>\n </semantics></math>. In this work, we prove that every 4-dicritical oriented graph on <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>n</mi>\n </mrow>\n </mrow>\n <annotation> $n$</annotation>\n </semantics></math> vertices has at least <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mrow>\n <mo>(</mo>\n \n <mrow>\n <mfrac>\n <mn>10</mn>\n \n <mn>3</mn>\n </mfrac>\n \n <mo>+</mo>\n \n <mfrac>\n <mn>1</mn>\n \n <mn>51</mn>\n </mfrac>\n </mrow>\n \n <mo>)</mo>\n </mrow>\n \n <mi>n</mi>\n \n <mo>−</mo>\n \n <mn>1</mn>\n </mrow>\n </mrow>\n <annotation> $(\\frac{10}{3}+\\frac{1}{51})n-1$</annotation>\n </semantics></math> arcs, showing the conjecture for <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>k</mi>\n \n <mo>=</mo>\n \n <mn>4</mn>\n </mrow>\n </mrow>\n <annotation> $k=4$</annotation>\n </semantics></math>. We also characterise exactly the 4-dicritical digraphs on <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mi>n</mi>\n </mrow>\n </mrow>\n <annotation> $n$</annotation>\n </semantics></math> vertices with exactly <math>\n <semantics>\n <mrow>\n \n <mrow>\n <mfrac>\n <mn>10</mn>\n \n <mn>3</mn>\n </mfrac>\n \n <mi>n</mi>\n \n <mo>−</mo>\n \n <mfrac>\n <mn>4</mn>\n \n <mn>3</mn>\n </mfrac>\n </mrow>\n </mrow>\n <annotation> $\\frac{10}{3}n-\\frac{4}{3}$</annotation>\n </semantics></math> arcs.","PeriodicalId":0,"journal":{"name":"","volume":null,"pages":null},"PeriodicalIF":0.0,"publicationDate":"2024-07-29","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":"{\"title\":\"On the minimum number of arcs in 4-dicritical oriented graphs\",\"authors\":\"Frédéric Havet, Lucas Picasarri-Arrieta, Clément Rambaud\",\"doi\":\"10.1002/jgt.23159\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"The dichromatic number <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mover>\\n <mi>χ</mi>\\n \\n <mo>→</mo>\\n </mover>\\n \\n <mrow>\\n <mo>(</mo>\\n \\n <mi>D</mi>\\n \\n <mo>)</mo>\\n </mrow>\\n </mrow>\\n </mrow>\\n <annotation> $\\\\overrightarrow{\\\\chi }(D)$</annotation>\\n </semantics></math> of a digraph <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>D</mi>\\n </mrow>\\n </mrow>\\n <annotation> $D$</annotation>\\n </semantics></math> is the minimum number of colours needed to colour the vertices of a digraph such that each colour class induces an acyclic subdigraph. A digraph <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>D</mi>\\n </mrow>\\n </mrow>\\n <annotation> $D$</annotation>\\n </semantics></math> is <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>k</mi>\\n </mrow>\\n </mrow>\\n <annotation> $k$</annotation>\\n </semantics></math>-dicritical if <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mover>\\n <mi>χ</mi>\\n \\n <mo>→</mo>\\n </mover>\\n \\n <mrow>\\n <mo>(</mo>\\n \\n <mi>D</mi>\\n \\n <mo>)</mo>\\n </mrow>\\n \\n <mo>=</mo>\\n \\n <mi>k</mi>\\n </mrow>\\n </mrow>\\n <annotation> $\\\\overrightarrow{\\\\chi }(D)=k$</annotation>\\n </semantics></math> and each proper subdigraph <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>H</mi>\\n </mrow>\\n </mrow>\\n <annotation> $H$</annotation>\\n </semantics></math> of <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>D</mi>\\n </mrow>\\n </mrow>\\n <annotation> $D$</annotation>\\n </semantics></math> satisfies <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mover>\\n <mi>χ</mi>\\n \\n <mo>→</mo>\\n </mover>\\n \\n <mrow>\\n <mo>(</mo>\\n \\n <mi>H</mi>\\n \\n <mo>)</mo>\\n </mrow>\\n \\n <mo><</mo>\\n \\n <mi>k</mi>\\n </mrow>\\n </mrow>\\n <annotation> $\\\\overrightarrow{\\\\chi }(H)\\\\lt k$</annotation>\\n </semantics></math>. For integers <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>k</mi>\\n </mrow>\\n </mrow>\\n <annotation> $k$</annotation>\\n </semantics></math> and <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>n</mi>\\n </mrow>\\n </mrow>\\n <annotation> $n$</annotation>\\n </semantics></math>, we define <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <msub>\\n <mi>d</mi>\\n \\n <mi>k</mi>\\n </msub>\\n \\n <mrow>\\n <mo>(</mo>\\n \\n <mi>n</mi>\\n \\n <mo>)</mo>\\n </mrow>\\n </mrow>\\n </mrow>\\n <annotation> ${d}_{k}(n)$</annotation>\\n </semantics></math> (resp., <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <msub>\\n <mi>o</mi>\\n \\n <mi>k</mi>\\n </msub>\\n \\n <mrow>\\n <mo>(</mo>\\n \\n <mi>n</mi>\\n \\n <mo>)</mo>\\n </mrow>\\n </mrow>\\n </mrow>\\n <annotation> ${o}_{k}(n)$</annotation>\\n </semantics></math>) as the minimum number of arcs possible in a <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>k</mi>\\n </mrow>\\n </mrow>\\n <annotation> $k$</annotation>\\n </semantics></math>-dicritical digraph (resp., oriented graph). Kostochka and Stiebitz have shown that <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <msub>\\n <mi>d</mi>\\n \\n <mn>4</mn>\\n </msub>\\n \\n <mrow>\\n <mo>(</mo>\\n \\n <mi>n</mi>\\n \\n <mo>)</mo>\\n </mrow>\\n \\n <mo>⩾</mo>\\n \\n <mfrac>\\n <mn>10</mn>\\n \\n <mn>3</mn>\\n </mfrac>\\n \\n <mi>n</mi>\\n \\n <mo>−</mo>\\n \\n <mfrac>\\n <mn>4</mn>\\n \\n <mn>3</mn>\\n </mfrac>\\n </mrow>\\n </mrow>\\n <annotation> ${d}_{4}(n)\\\\geqslant \\\\frac{10}{3}n-\\\\frac{4}{3}$</annotation>\\n </semantics></math>. They also conjectured that there is a constant <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>c</mi>\\n </mrow>\\n </mrow>\\n <annotation> $c$</annotation>\\n </semantics></math> such that <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <msub>\\n <mi>o</mi>\\n \\n <mi>k</mi>\\n </msub>\\n \\n <mrow>\\n <mo>(</mo>\\n \\n <mi>n</mi>\\n \\n <mo>)</mo>\\n </mrow>\\n \\n <mo>⩾</mo>\\n \\n <mi>c</mi>\\n \\n <msub>\\n <mi>d</mi>\\n \\n <mi>k</mi>\\n </msub>\\n \\n <mrow>\\n <mo>(</mo>\\n \\n <mi>n</mi>\\n \\n <mo>)</mo>\\n </mrow>\\n </mrow>\\n </mrow>\\n <annotation> ${o}_{k}(n)\\\\geqslant c{d}_{k}(n)$</annotation>\\n </semantics></math> for <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>k</mi>\\n \\n <mo>⩾</mo>\\n \\n <mn>3</mn>\\n </mrow>\\n </mrow>\\n <annotation> $k\\\\geqslant 3$</annotation>\\n </semantics></math> and <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>n</mi>\\n </mrow>\\n </mrow>\\n <annotation> $n$</annotation>\\n </semantics></math> large enough. This conjecture is known to be true for <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>k</mi>\\n \\n <mo>=</mo>\\n \\n <mn>3</mn>\\n </mrow>\\n </mrow>\\n <annotation> $k=3$</annotation>\\n </semantics></math>. In this work, we prove that every 4-dicritical oriented graph on <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>n</mi>\\n </mrow>\\n </mrow>\\n <annotation> $n$</annotation>\\n </semantics></math> vertices has at least <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mrow>\\n <mo>(</mo>\\n \\n <mrow>\\n <mfrac>\\n <mn>10</mn>\\n \\n <mn>3</mn>\\n </mfrac>\\n \\n <mo>+</mo>\\n \\n <mfrac>\\n <mn>1</mn>\\n \\n <mn>51</mn>\\n </mfrac>\\n </mrow>\\n \\n <mo>)</mo>\\n </mrow>\\n \\n <mi>n</mi>\\n \\n <mo>−</mo>\\n \\n <mn>1</mn>\\n </mrow>\\n </mrow>\\n <annotation> $(\\\\frac{10}{3}+\\\\frac{1}{51})n-1$</annotation>\\n </semantics></math> arcs, showing the conjecture for <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>k</mi>\\n \\n <mo>=</mo>\\n \\n <mn>4</mn>\\n </mrow>\\n </mrow>\\n <annotation> $k=4$</annotation>\\n </semantics></math>. We also characterise exactly the 4-dicritical digraphs on <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mi>n</mi>\\n </mrow>\\n </mrow>\\n <annotation> $n$</annotation>\\n </semantics></math> vertices with exactly <math>\\n <semantics>\\n <mrow>\\n \\n <mrow>\\n <mfrac>\\n <mn>10</mn>\\n \\n <mn>3</mn>\\n </mfrac>\\n \\n <mi>n</mi>\\n \\n <mo>−</mo>\\n \\n <mfrac>\\n <mn>4</mn>\\n \\n <mn>3</mn>\\n </mfrac>\\n </mrow>\\n </mrow>\\n <annotation> $\\\\frac{10}{3}n-\\\\frac{4}{3}$</annotation>\\n </semantics></math> arcs.\",\"PeriodicalId\":0,\"journal\":{\"name\":\"\",\"volume\":null,\"pages\":null},\"PeriodicalIF\":0.0,\"publicationDate\":\"2024-07-29\",\"publicationTypes\":\"Journal Article\",\"fieldsOfStudy\":null,\"isOpenAccess\":false,\"openAccessPdf\":\"\",\"citationCount\":\"0\",\"resultStr\":null,\"platform\":\"Semanticscholar\",\"paperid\":null,\"PeriodicalName\":\"\",\"FirstCategoryId\":\"100\",\"ListUrlMain\":\"https://onlinelibrary.wiley.com/doi/10.1002/jgt.23159\",\"RegionNum\":0,\"RegionCategory\":null,\"ArticlePicture\":[],\"TitleCN\":null,\"AbstractTextCN\":null,\"PMCID\":null,\"EPubDate\":\"\",\"PubModel\":\"\",\"JCR\":\"\",\"JCRName\":\"\",\"Score\":null,\"Total\":0}","platform":"Semanticscholar","paperid":null,"PeriodicalName":"","FirstCategoryId":"100","ListUrlMain":"https://onlinelibrary.wiley.com/doi/10.1002/jgt.23159","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}

引用次数: 0

摘要

数图的二色数是指为数图顶点着色所需的最少颜色数，使得每个颜色类都能诱导出一个无环子数图。如果且的每个适当的子图均满足，则一个数图是无色的。对于整数和，我们定义（respect.科斯托奇卡和斯蒂比茨证明了。他们还猜想存在一个常数，对于和足够大。众所周知，这一猜想对于 .在本研究中，我们证明了每一个顶点上的 4-临界定向图都至少有弧，从而证明了对 ...的猜想。我们还精确地描述了顶点上具有精确弧的 4-dicritical 数字图的特征。

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On the minimum number of arcs in 4-dicritical oriented graphs

The dichromatic number $\vec{χ} (D)$ of a digraph $D$ is the minimum number of colours needed to colour the vertices of a digraph such that each colour class induces an acyclic subdigraph. A digraph $D$ is $k$ -dicritical if $\vec{χ} (D) = k$ and each proper subdigraph $H$ of $D$ satisfies $\vec{χ} (H) < k$ . For integers $k$ and $n$ , we define $d_{k} (n)$ (resp., $o_{k} (n)$ ) as the minimum number of arcs possible in a $k$ -dicritical digraph (resp., oriented graph). Kostochka and Stiebitz have shown that $d_{4} (n) ⩾ \frac{10}{3} n - \frac{4}{3}$ . They also conjectured that there is a constant $c$ such that $o_{k} (n) ⩾ c d_{k} (n)$ for $k ⩾ 3$ and $n$ large enough. This conjecture is known to be true for $k = 3$ . In this work, we prove that every 4-dicritical oriented graph on $n$ vertices has at least $(\frac{10}{3} + \frac{1}{51}) n - 1$ arcs, showing the conjecture for $k = 4$ . We also characterise exactly the 4-dicritical digraphs on $n$ vertices with exactly $\frac{10}{3} n - \frac{4}{3}$ arcs.

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