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Autores principales: Wang, Laochao Wang Xiaolin, Yu, Guangmiao
Formato: Preprint
Publicado: 2026
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Acceso en línea:https://arxiv.org/abs/2604.14670
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author Wang, Laochao Wang Xiaolin
Yu, Guangmiao
author_facet Wang, Laochao Wang Xiaolin
Yu, Guangmiao
contents The proper orientation number $\vecχ(G)$ of an undirected graph $G$ is the minimum $k$ such that there exists an orientation of $G$ with all out-degrees at most $k$ and with different out-degrees for any two adjacent vertices. Chen, Mohar and Wu (JCTB, 2023) proved that if $G$ is a $r$-partite graph, then $\vecχ(G) \leq \frac{1}{2} \text{Mad}(G)+r^{1+o(1)}$, where $\text{Mad}(G)$ is the maximum average degree of $G$. Moreover, if $G$ is a bipartite graph, then $ \vecχ(G) \leq \lceil \frac{1}{2} \text{Mad}(G)\rceil +3$ and this bound is tight. They also asked whether $\vecχ(G)-\lceil \frac{1}{2} \text{Mad}(G)\rceil$ can be bounded by a linear function of $r$. In this paper, we first construct somewhat involved $r$-partite graphs with $\vecχ(G)\geq\lceil \frac{1}{2} \text{Mad}(G)\rceil +\lfloor\frac{5}{2}r\rfloor-2$, showing that a linear dependence on \(r\) is unavoidable. We also prove that $ \vecχ(G) \leq\lceil \frac{1}{2} \text{Mad}(G)\rceil +7$ for every 3-partite graph $G$. This implies \(\vecχ(G)\le 10\) for \(3\)-colorable planar graphs and \(\vecχ(G)\le 9\) for outerplanar graphs, improving the corresponding bounds of Chen, Mohar, and Wu.
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institution arXiv
publishDate 2026
record_format arxiv
spellingShingle New results on proper orientation number of graphs
Wang, Laochao Wang Xiaolin
Yu, Guangmiao
Combinatorics
The proper orientation number $\vecχ(G)$ of an undirected graph $G$ is the minimum $k$ such that there exists an orientation of $G$ with all out-degrees at most $k$ and with different out-degrees for any two adjacent vertices. Chen, Mohar and Wu (JCTB, 2023) proved that if $G$ is a $r$-partite graph, then $\vecχ(G) \leq \frac{1}{2} \text{Mad}(G)+r^{1+o(1)}$, where $\text{Mad}(G)$ is the maximum average degree of $G$. Moreover, if $G$ is a bipartite graph, then $ \vecχ(G) \leq \lceil \frac{1}{2} \text{Mad}(G)\rceil +3$ and this bound is tight. They also asked whether $\vecχ(G)-\lceil \frac{1}{2} \text{Mad}(G)\rceil$ can be bounded by a linear function of $r$. In this paper, we first construct somewhat involved $r$-partite graphs with $\vecχ(G)\geq\lceil \frac{1}{2} \text{Mad}(G)\rceil +\lfloor\frac{5}{2}r\rfloor-2$, showing that a linear dependence on \(r\) is unavoidable. We also prove that $ \vecχ(G) \leq\lceil \frac{1}{2} \text{Mad}(G)\rceil +7$ for every 3-partite graph $G$. This implies \(\vecχ(G)\le 10\) for \(3\)-colorable planar graphs and \(\vecχ(G)\le 9\) for outerplanar graphs, improving the corresponding bounds of Chen, Mohar, and Wu.
title New results on proper orientation number of graphs
topic Combinatorics
url https://arxiv.org/abs/2604.14670