Coloring squares of planar graphs with small maximum degree
For a graph $G$, by $\chi_2(G)$ we denote the minimum integer $k$, such that there is a $k$-coloring of the vertices of $G$ in which vertices at distance at most 2 receive distinct colors. Equivalently, $\chi_2(G)$ is the chromatic number of the square of $G$. In 1977 Wegner conjectured that if $G$...
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| Main Authors | , , |
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| Format | Journal Article |
| Language | English |
| Published |
24.05.2021
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| Subjects | |
| Online Access | Get full text |
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| Summary: | For a graph $G$, by $\chi_2(G)$ we denote the minimum integer $k$, such that
there is a $k$-coloring of the vertices of $G$ in which vertices at distance at
most 2 receive distinct colors. Equivalently, $\chi_2(G)$ is the chromatic
number of the square of $G$. In 1977 Wegner conjectured that if $G$ is planar
and has maximum degree $\Delta$, then $\chi_2(G) \leq 7$ if $\Delta \leq 3$,
$\chi_2(G) \leq \Delta+5$ if $4 \leq \Delta \leq 7$, and $\lfloor 3\Delta/2
\rfloor +1$ if $\Delta \geq 8$. Despite extensive work, the known upper bounds
are quite far from the conjectured ones, especially for small values of
$\Delta$. In this work we show that for every planar graph $G$ with maximum
degree $\Delta$ it holds that $\chi_2(G) \leq 3\Delta+4$. This result provides
the best known upper bound for $6 \leq \Delta \leq 14$. |
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| DOI: | 10.48550/arxiv.2105.11235 |