Extended Double Covers and Homomorphism Bounds of Signed Graphs

IF 0.7 4区 数学 Q2 MATHEMATICS
Florent Foucaud, Reza Naserasr, Rongxing Xu
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引用次数: 0

Abstract

A signed graph $(G, \sigma)$ is a graph $G$ together with an assignment $\sigma:E(G) \rightarrow \{+,-\}$. The notion of homomorphisms of signed graphs is a relatively new development which allows to strengthen the connection between the theories of minors and colorings of graphs. Following this thread of thoughts, we investigate this connection through the notion of Extended Double Covers of signed graphs, which was recently introduced by Naserasr, Sopena and Zaslavsky. More precisely, we say that a signed graph $(B, \pi)$ is planar-complete if any signed planar graph $(G, \sigma)$ which verifies the conditions of a basic no-homomorphism lemma with respect to $(B,\pi)$ admits a homomorphism to $(B, \pi)$. Our conjecture then is that: if $(B, \pi)$ is a connected signed graph with no positive odd closed walk which is planar-complete, then its Extended Double Cover ${\rm EDC}(B,\pi)$ is also planar-complete. We observe that this conjecture largely extends the Four-Color Theorem and is strongly connected to a number of conjectures in extension of this famous theorem. A given (signed) graph $(B,\pi)$ bounds a class of (signed) graphs if every (signed) graph in the class admits a homomorphism to $(B,\pi)$.In this work, and in support of our conjecture, we prove it for the subclass of signed $K_4$-minor free graphs. Inspired by this development, we then investigate the problem of finding optimal homomorphism bounds for subclasses of signed $K_4$-minor-free graphs with restrictions on their girth and we present nearly optimal solutions. Our work furthermore leads to the development of weighted signed graphs.
符号图的扩展双盖与同态界
签名图$(G, \sigma)$是一个图$G$和一个赋值$\sigma:E(G) \rightarrow \{+,-\}$。符号图的同态概念是一个相对较新的发展,它可以加强图的小次性理论与图的着色之间的联系。沿着这条思路,我们通过最近由Naserasr, Sopena和Zaslavsky引入的符号图的扩展双覆盖的概念来研究这种联系。更准确地说,如果任何一个验证了关于$(B,\pi)$的基本非同态引理的条件的有符号图$(G, \sigma)$承认$(B, \pi)$的同态,我们就说一个有符号图$(B, \pi)$是平面完全的。那么我们的猜想是:如果$(B, \pi)$是一个无正奇闭行走的连通符号图,并且是平面完全的,那么它的扩展双盖${\rm EDC}(B,\pi)$也是平面完全的。我们观察到这个猜想在很大程度上扩展了四色定理,并且与这个著名定理的一些扩展猜想密切相关。一个给定的(有符号)图$(B,\pi)$是一类(有符号)图的边界,如果该类中的每一个(有符号)图都承认与$(B,\pi)$同态。在本工作中,为了支持我们的猜想,我们证明了有符号$K_4$ -小自由图的子类。在此基础上,我们研究了带周长限制的有符号$K_4$ -次无图的子类的最优同态界问题,并给出了近似最优解。我们的工作进一步导致了加权符号图的发展。
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
CiteScore
1.30
自引率
14.30%
发文量
212
审稿时长
3-6 weeks
期刊介绍: The Electronic Journal of Combinatorics (E-JC) is a fully-refereed electronic journal with very high standards, publishing papers of substantial content and interest in all branches of discrete mathematics, including combinatorics, graph theory, and algorithms for combinatorial problems.
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