Circular flows in mono-directed signed graphs

Pub Date : 2024-03-19 DOI:10.1002/jgt.23092

Jiaao Li, Reza Naserasr, Zhouningxin Wang, Xuding Zhu

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That is a pair <math>\n <semantics>\n <mrow>\n <mrow>\n <mo>(</mo>\n <mrow>\n <mi>D</mi>\n <mo>,</mo>\n <mi>f</mi>\n </mrow>\n <mo>)</mo>\n </mrow>\n </mrow>\n <annotation> $(D,f)$</annotation>\n </semantics></math>, where <math>\n <semantics>\n <mrow>\n <mi>D</mi>\n </mrow>\n <annotation> $D$</annotation>\n </semantics></math> is an orientation on <math>\n <semantics>\n <mrow>\n <mi>G</mi>\n </mrow>\n <annotation> $G$</annotation>\n </semantics></math> and <math>\n <semantics>\n <mrow>\n <mi>f</mi>\n <mo>:</mo>\n <mi>E</mi>\n <mrow>\n <mo>(</mo>\n <mi>G</mi>\n <mo>)</mo>\n </mrow>\n <mo>→</mo>\n <mrow>\n <mo>(</mo>\n <mrow>\n <mo>−</mo>\n <mi>r</mi>\n <mo>,</mo>\n <mi>r</mi>\n </mrow>\n <mo>)</mo>\n </mrow>\n </mrow>\n <annotation> $f:E(G)\\to (-r,r)$</annotation>\n </semantics></math> satisfies that <math>\n <semantics>\n <mrow>\n <mo>∣</mo>\n <mi>f</mi>\n <mrow>\n <mo>(</mo>\n <mi>e</mi>\n <mo>)</mo>\n </mrow>\n <mo>∣</mo>\n <mo>∈</mo>\n <mrow>\n <mo>[</mo>\n <mrow>\n <mn>1</mn>\n <mo>,</mo>\n <mi>r</mi>\n <mo>−</mo>\n <mn>1</mn>\n </mrow>\n <mo>]</mo>\n </mrow>\n </mrow>\n <annotation> $| f(e)| \\in [1,r-1]$</annotation>\n </semantics></math> for each positive edge <math>\n <semantics>\n <mrow>\n <mi>e</mi>\n </mrow>\n <annotation> $e$</annotation>\n </semantics></math> and <math>\n <semantics>\n <mrow>\n <mo>∣</mo>\n <mi>f</mi>\n <mrow>\n <mo>(</mo>\n <mi>e</mi>\n <mo>)</mo>\n </mrow>\n <mo>∣</mo>\n <mo>∈</mo>\n <mrow>\n <mo>[</mo>\n <mrow>\n <mn>0</mn>\n <mo>,</mo>\n <mfrac>\n <mi>r</mi>\n <mn>2</mn>\n </mfrac>\n <mo>−</mo>\n <mn>1</mn>\n </mrow>\n <mo>]</mo>\n </mrow>\n <mo>∪</mo>\n <mrow>\n <mo>[</mo>\n <mrow>\n <mfrac>\n <mi>r</mi>\n <mn>2</mn>\n </mfrac>\n <mo>+</mo>\n <mn>1</mn>\n <mo>,</mo>\n <mi>r</mi>\n </mrow>\n <mo>)</mo>\n </mrow>\n </mrow>\n <annotation> $| f(e)| \\in [0,\\frac{r}{2}-1]\\cup [\\frac{r}{2}+1,r)$</annotation>\n </semantics></math> for each negative edge <math>\n <semantics>\n <mrow>\n <mi>e</mi>\n </mrow>\n <annotation> $e$</annotation>\n </semantics></math>, and the total in-flow equals the total out-flow at each vertex. This is the dual notion of circular colorings of signed graphs and is distinct from the concept of circular flows in bi-directed graphs associated with signed graphs studied in the literature. We first explore the connection between circular <math>\n <semantics>\n <mrow>\n <mfrac>\n <mrow>\n <mn>2</mn>\n <mi>k</mi>\n </mrow>\n <mrow>\n <mi>k</mi>\n <mo>−</mo>\n <mn>1</mn>\n </mrow>\n </mfrac>\n </mrow>\n <annotation> $\\frac{2k}{k-1}$</annotation>\n </semantics></math>-flows and modulo <math>\n <semantics>\n <mrow>\n <mi>k</mi>\n </mrow>\n <annotation> $k$</annotation>\n </semantics></math>-orientations in signed graphs. Then we focus on the upper bounds for the circular flow indices of signed graphs in terms of the edge-connectivity, where the circular flow index of a signed graph is the minimum value <math>\n <semantics>\n <mrow>\n <mi>r</mi>\n </mrow>\n <annotation> $r$</annotation>\n </semantics></math> such that it admits a circular <math>\n <semantics>\n <mrow>\n <mi>r</mi>\n </mrow>\n <annotation> $r$</annotation>\n </semantics></math>-flow. We prove that every 3-edge-connected signed graph admits a circular 6-flow and every 4-edge-connected signed graph admits a circular 4-flow. More generally, for <math>\n <semantics>\n <mrow>\n <mi>k</mi>\n <mo>≥</mo>\n <mn>2</mn>\n </mrow>\n <annotation> $k\\ge 2$</annotation>\n </semantics></math>, we show that every <math>\n <semantics>\n <mrow>\n <mrow>\n <mo>(</mo>\n <mrow>\n <mn>3</mn>\n <mi>k</mi>\n <mo>−</mo>\n <mn>1</mn>\n </mrow>\n <mo>)</mo>\n </mrow>\n </mrow>\n <annotation> $(3k-1)$</annotation>\n </semantics></math>-edge-connected signed graph admits a circular <math>\n <semantics>\n <mrow>\n <mfrac>\n <mrow>\n <mn>2</mn>\n <mi>k</mi>\n </mrow>\n <mrow>\n <mi>k</mi>\n <mo>−</mo>\n <mn>1</mn>\n </mrow>\n </mfrac>\n </mrow>\n <annotation> $\\frac{2k}{k-1}$</annotation>\n </semantics></math>-flow, every <math>\n <semantics>\n <mrow>\n <mn>3</mn>\n <mi>k</mi>\n </mrow>\n <annotation> $3k$</annotation>\n </semantics></math>-edge-connected signed graph has a circular <math>\n <semantics>\n <mrow>\n <mi>r</mi>\n </mrow>\n <annotation> $r$</annotation>\n </semantics></math>-flow with <math>\n <semantics>\n <mrow>\n <mi>r</mi>\n <mo><</mo>\n <mfrac>\n <mrow>\n <mn>2</mn>\n <mi>k</mi>\n </mrow>\n <mrow>\n <mi>k</mi>\n <mo>−</mo>\n <mn>1</mn>\n </mrow>\n </mfrac>\n </mrow>\n <annotation> $r\\lt \\frac{2k}{k-1}$</annotation>\n </semantics></math>, and every <math>\n <semantics>\n <mrow>\n <mrow>\n <mo>(</mo>\n <mrow>\n <mn>3</mn>\n <mi>k</mi>\n <mo>+</mo>\n <mn>1</mn>\n </mrow>\n <mo>)</mo>\n </mrow>\n </mrow>\n <annotation> $(3k+1)$</annotation>\n </semantics></math>-edge-connected signed graph admits a circular <math>\n <semantics>\n <mrow>\n <mfrac>\n <mrow>\n <mn>4</mn>\n <mi>k</mi>\n <mo>+</mo>\n <mn>2</mn>\n </mrow>\n <mrow>\n <mn>2</mn>\n <mi>k</mi>\n <mo>−</mo>\n <mn>1</mn>\n </mrow>\n </mfrac>\n </mrow>\n <annotation> $\\frac{4k+2}{2k-1}$</annotation>\n </semantics></math>-flow. Moreover, the <math>\n <semantics>\n <mrow>\n <mrow>\n <mo>(</mo>\n <mrow>\n <mn>6</mn>\n <mi>k</mi>\n <mo>−</mo>\n <mn>2</mn>\n </mrow>\n <mo>)</mo>\n </mrow>\n </mrow>\n <annotation> $(6k-2)$</annotation>\n </semantics></math>-edge-connectivity condition is shown to be sufficient for a signed Eulerian graph to admit a circular <math>\n <semantics>\n <mrow>\n <mfrac>\n <mrow>\n <mn>4</mn>\n <mi>k</mi>\n </mrow>\n <mrow>\n <mn>2</mn>\n <mi>k</mi>\n <mo>−</mo>\n <mn>1</mn>\n </mrow>\n </mfrac>\n </mrow>\n <annotation> $\\frac{4k}{2k-1}$</annotation>\n </semantics></math>-flow, and applying this result to planar graphs, we conclude that every signed bipartite planar graph of negative girth at least <math>\n <semantics>\n <mrow>\n <mn>6</mn>\n <mi>k</mi>\n <mo>−</mo>\n <mn>2</mn>\n </mrow>\n <annotation> $6k-2$</annotation>\n </semantics></math> admits a homomorphism to the negative even cycles <math>\n <semantics>\n <mrow>\n <msub>\n <mi>C</mi>\n <mrow>\n <mo>−</mo>\n <mn>2</mn>\n <mi>k</mi>\n </mrow>\n </msub>\n </mrow>\n <annotation> ${C}_{-2k}$</annotation>\n </semantics></math>.","PeriodicalId":0,"journal":{"name":"","volume":null,"pages":null},"PeriodicalIF":0.0,"publicationDate":"2024-03-19","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.23092","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}

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Abstract

In this paper, the concept of circular $r$ -flow in a mono-directed signed graph $(G, σ)$ is introduced. That is a pair $(D, f)$ , where $D$ is an orientation on $G$ and $f : E (G) \to (- r, r)$ satisfies that $∣ f (e) ∣ \in [1, r - 1]$ for each positive edge $e$ and $∣ f (e) ∣ \in [0, \frac{r}{2} - 1] \cup [\frac{r}{2} + 1, r)$ for each negative edge $e$ , and the total in-flow equals the total out-flow at each vertex. This is the dual notion of circular colorings of signed graphs and is distinct from the concept of circular flows in bi-directed graphs associated with signed graphs studied in the literature. We first explore the connection between circular $\frac{2 k}{k - 1}$ -flows and modulo $k$ -orientations in signed graphs. Then we focus on the upper bounds for the circular flow indices of signed graphs in terms of the edge-connectivity, where the circular flow index of a signed graph is the minimum value $r$ such that it admits a circular $r$ -flow. We prove that every 3-edge-connected signed graph admits a circular 6-flow and every 4-edge-connected signed graph admits a circular 4-flow. More generally, for $k \geq 2$ , we show that every $(3 k - 1)$ -edge-connected signed graph admits a circular $\frac{2 k}{k - 1}$ -flow, every $3 k$ -edge-connected signed graph has a circular $r$ -flow with $r < \frac{2 k}{k - 1}$ , and every $(3 k + 1)$ -edge-connected signed graph admits a circular $\frac{4 k + 2}{2 k - 1}$ -flow. Moreover, the $(6 k - 2)$ -edge-connectivity condition is shown to be sufficient for a signed Eulerian graph to admit a circular $\frac{4 k}{2 k - 1}$ -flow, and applying this result to planar graphs, we conclude that every signed bipartite planar graph of negative girth at least $6 k - 2$ admits a homomorphism to the negative even cycles $C_{- 2 k}$ .

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单向有符号图中的循环流动

本文引入了单向有符号图（G,σ）$(G,\sigma )$中循环 r$r$ 流的概念。即一对 (D,f)$(D,f)$，其中 D$D$ 是 G$G$ 上的方向，f:E(G)→(-r,r)$f：E(G)\to(-r,r)$满足∣f(e)∣∈[1,r-1]$| f(e)| \in [1,r-1]$ for each positive edge e$e$ and ∣f(e)∣∈[0,r2-1]∪[r2+1、r)$|f(e)|\in[0,\frac{r}{2}-1]\cup [\frac{r}{2}+1,r)$对于每条负边 e$e$，总流入等于每个顶点的总流出。这就是有符号图的循环着色的对偶概念，有别于文献中研究的与有符号图相关的双向图中的循环流概念。我们首先探讨了有符号图中循环 2kk-1$\frac{2k}{k-1}$ 流与 modulo k$k$-orientation 之间的联系。有符号图的循环流指数是允许循环 r$r$ 流的最小值 r$r$。我们证明了每一个 3 边连接的有符号图都允许循环 6 流，每一个 4 边连接的有符号图都允许循环 4 流。更一般地说，对于 k≥2$k\ge 2$，我们证明每一个 (3k-1)$(3k-1)$ 边连接的有符号图都有一个环形 2kk-1$frac{2k}{k-1}$ 流，每一个 3k$3k$ 边连接的有符号图都有一个环形 r$r$ 流，r<；2kk-1$r\lt \frac{2k}{k-1}$，而每个 (3k+1)$(3k+1)$ 边连接的有符号图都有一个循环的 4k+22k-1$frac{4k+2}{2k-1}$ 流。此外，(6k-2)$(6k-2)$-边连接条件被证明足以让有符号欧拉图接纳循环 4k2k-1$/frac{4k}{2k-1}$-流，将这一结果应用于平面图，我们得出结论：每个负周长至少为 6k-2$6k-2$ 的有符号双方平面图都接纳与负偶数循环 C-2k${C}_{-2k}$ 的同构。

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