@article {
author = {Pongpipat, Denpong and Nupo, Nuttawoot},
title = {Nordhaus-Gaddum type inequalities for tree covering numbers on unitary Cayley graphs of finite rings},
journal = {Transactions on Combinatorics},
volume = {11},
number = {2},
pages = {111-122},
year = {2022},
publisher = {University of Isfahan},
issn = {2251-8657},
eissn = {2251-8665},
doi = {10.22108/toc.2021.126721.1802},
abstract = {The unitary Cayley graph $\Gamma_n$ of a finite ring $\mathbb{Z}_n$ is the graph with vertex set $\mathbb{Z}_n$ and two vertices $x$ and $y$ are adjacent if and only if $x-y$ is a unit in $\mathbb{Z}_n$. A family $\mathcal{F}$ of mutually edge disjoint trees in $\Gamma_n$ is called a tree cover of $\Gamma_n$ if for each edge $e\in E(\Gamma_n)$, there exists a tree $T\in\mathcal{F}$ in which $e\in E(T)$. The minimum cardinality among tree covers of $\Gamma_n$ is called a tree covering number and denoted by $\tau(\Gamma_n)$. In this paper, we prove that, for a positive integer $ n\geq 3 $, the tree covering number of $ \Gamma_n $ is $ \displaystyle\frac{\varphi(n)}{2}+1 $ and the tree covering number of $ \overline{\Gamma}_n $ is at most $ n-p $ where $ p $ is the least prime divisor of $n$. Furthermore, we introduce the Nordhaus-Gaddum type inequalities for tree covering numbers on unitary Cayley graphs of rings $\mathbb{Z}_n$.},
keywords = {Nordhaus-Gaddum type inequalities,Unitary Cayley graph,Tree cover,Tree covering number},
url = {https://toc.ui.ac.ir/article_26053.html},
eprint = {https://toc.ui.ac.ir/article_26053_1faba403cd1999945cf2ce36fbe484ef.pdf}
}