Local Distance Antimagic Vertex Coloring of Graphs
A bijective function $f:V\rightarrow\left\{1,2,3,...,|V| \right\}$ is said to be a local distance antimagic labeling of a graph $G=(V,E)$, if $w(u)\neq w(v)$ for any two adjacent vertices $u, v$ where the weight $w(v)=\sum_{z\in N(v)}f(z)$. The local distance antimagic labeling of $G$ induces a prop...
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| Zusammenfassung: | A bijective function $f:V\rightarrow\left\{1,2,3,...,|V| \right\}$ is said to
be a local distance antimagic labeling of a graph $G=(V,E)$, if $w(u)\neq w(v)$
for any two adjacent vertices $u, v$ where the weight $w(v)=\sum_{z\in
N(v)}f(z)$. The local distance antimagic labeling of $G$ induces a proper
coloring in $G$, called local distance antimagic chromatic number denoted by
$\chi_{ld}(G)$. In this article, we introduce the parameter $\chi_{ld}(G)$ and
compute the local distance antimagic chromatic number of graphs.
Keywords: Distance antimagic labeling, Local distance antimagic labeling,
Local distance antimagic chromatic number. |
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| DOI: | 10.48550/arxiv.2106.01833 |